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DIN 1055 -4:2005-03 Windlasten - Ruhr-Universität
DIN 1055-4:2005-03 Windlasten 1. Anlass und Gründe für die Neufassung der DIN 1055-4 - Windlasten Zu Beginn dieses Jahres ist die neue Windlastnorm DIN 1055-4:2005
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DIN 1052 Timber Checks - InfoGraph
The timber checks according to DIN 1052:2008 can be used for buildings and engineering constructions made of the following materials: • C14
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DIN 1045 -1 Design - InfoGraph
The reinforced concrete and prestressed concrete design according to DIN 1045-1 can be used for all engineering structures that need not be checked according to the
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Din 1055 Download
Related 10 Posts
Foreword
7
1
scope
8
2
references to other standards
10
3
terms and symbols
11
3.1
terms
11
3.2
symbols
15
3.2.1 General
15
3.2.3 Latin letters, capital
15
3.2.3 Latin letters, small
17
3.2.4 Greek letters, capital
20
3.2.5 Greek letters, small
20
4
illustration and classification of actions
21
4.1
illustration of action in silos
21
5.6
principles of calculations for explosions
30
6
bulk material parameters
31
6.1
general
31
6.2
bulk material parameters
32
6.2.1 General
32
6.2.2 Determination of bulk material parameters
34
6.2.3 Simplified procedure
35
6.3
35
measurement of bulk material parameters in tests
6.3.1 Experimental determination 6.3.2 Bulk material density,
γ
35 36
6.3.3 Coefficients of wall friction µ
36
6.3.4 Angle of inner friction, ϕ i
36
6.3.5 Horizontal load ration,K
37
1
DIN 1055-6:2005-03 6.3.6 Cohesiveness, C
37
6.3.7 Bulk material correction value for the reference-surface load C op
37
7
loads on vertical silo walls
38
7.1
general
38
7.2
slim silos
39
7.2.1 Fill loads on vertical silo walls
39
7.2.2 Discharge loads on vertical walls
44
7.2.3 Uniform increase of loads in place of reference-surface loads for fills and discharges of the load-types for circular silos
49
7.2.4 Discharge loads for circular silos with large eccentricities during discharge 50 7.3
low silos and silos of medium slimness
55
7.3.1 Fill loads on the vertical walls 7.3.2 Discharge loads on the vertical walls
57
7.3.3 Large eccentricities for filling in of circular low silos and circular silos of medium slimness
59
7.3.4 large discharge eccentricities for filling in of circular low silos and 7.4
Circular silos of medium slimness
60
silos with braced walls
61
7.4.1 Fill loads on vertical walls
61
7.4.2 Discharge loads on vertical walls
62
7.5
62
silos with fluidized bulk material
7.5.1 General
62
7.5.2 Loads in silos for storage of fluidized bulk material
62
7.6
63
temperature differences between bulk material and silo structure
7.6.1 general
63
7.6.2 loads due to a decrease in the surrounding atmospheric temperature
64
7.6.3 loads due to filling-in of hot bulk materials
64
7.7
65
loads in rectangular silos
7.7.1 Rectangular silos
65
7.7.2 Silos with internal braces
65
8
65
loads in silo hoppers and silo bottoms
2
DIN 1055-6:2005-03 8.1
general
65
8.1.1 Physical parameters
65
8.1.2 General rules
67
8.2
69
horizontal silo bottoms
8.2.1 Vertical loads on horizontal silo bottoms in slim silos
69
8.2.2 Vertical loads on level silo bottoms in low silos and silos of 8.3
Medium slimness
69
steep hoppers
71
8.3.1 Mobilized friction
71
8.3.2 Fill loads
71
8.3.3 Discharge loads
71
8.4
72
flat hoppers
8.4.1 Mobilized friction
72
8.4.2 Fill loads
73
8.4.3 Discharge loads
73
8.5
hopper loads in silos with air-injection equipment
73
9
loads on tanks
74
9.1
general
74
9.2
loads due to stored fluids
74
9.3
parameters for fluids
74
9.4
suction loads due to insufficient aeration
74
Annex A (informative) Basis for the Planning of Structures – Rules that complement DIN 1055-100 for silos and tanks
75
A.1
general
75
A.2
border limit for load capacity
75
A.2.1 part-safety correction value
75
A.2.2 Actions on structures - Actions in silos and tanks correction value 75 A.4
conditions for calculation and action-combinations for the Requirement categories 2 and 3
76
3
DIN 1055-6:2005-03 A.5
action-combinations for the Requirement category 1
77
Annex B (normative) Actions, Part-Safety Factors and Composite Correction Values for the actions on tanks
78
B.1
general
78
B.2
actions
78
B.2.1 loads from stored fluids
78
B.2.2 loads from internal pressures
78
B.2.3 loads from temperature changes
78
B.2.4 intrinsic loads
78
B.2.5 loads from insulation
78
B.2.6 distributed working loads
79
B.2.7 concentric working loads
79
B.2.8 snow
79
B.2.9 wind
79
B.2.10 low pressure due to insufficient aeration
81
B.2.11 seismic loads
81
B.2.12 loads due to connecting structures
81
B.2.13 loads due to non-uniform settlement
81
B.2.14 catastrophic loads
81
B.3
part-safety correction values for actions
81
B.4
combination of actions
81
Annex C (normative) measurement of bulk material parameters for Determination of silo loads
82
C.1
general
82
C.2
application
82
C.3
symbols
82
C.4
terms
83
C.5
taking of specimens and their preparation
83
4
DIN 1055-6:2005-03 C.6
determination of bulk material density γ
84
C.6.1 short description
84
C.6.2 test apparatus
84
C.6.3 process / procedure
85
C.7
85
wall friction
C.7.1 general
85
C.7.2 co-efficient of wall friction µm for the determination of loads
86
C.7.3 angle of wall friction ϕwh for examining the flow behaviour
87
C.8
88
horizontal load ratio K
C.8.1 direct measurement
88
C.8.2 indirect measurement
89
C.9
stability parameters: cohesiveness c and angle of internal friction ϕi 89
C.9.1 direct measurement
89
C.9.2 indirect measurement
91
C.10 effective elasticity module Es
93
C.10.1 direct measurement
93
C.10.2 indirect measurement
95
C.11 determination of the upper and lower characteristic values for the bulk Material parameters and the determination of the conversion factor a
96
C.11.1 testing principle
96
C.11.2 assessment methods
97
Annex D (normative) assessment of bulk material parameters for determination Of silo loads
99
D.1
goal
99
D.2
assessment of the wall friction co-efficient for a corrugated wall
99
D.3
internal friction and wall friction of a coarse-grained bulk material Without fine particles
Annex E (normative)
details of bulk material parameters
100 101
5
DIN 1055-6:2005-03 Annex F (normative) determination of the flow profile, mass flow And core flow
102
Annex G (normative) seismic actions
103
G.1
general
103
G.2
symbols
103
G.3
conditions for calculation
103
G.4
seismic actions
104
G.4.1 silo bottom and foundations
104
G.4.2 silo walls
104
Annex H (normative) alternative rules for determination of hopper loads
106
H.1
general
106
H.2
terms
106
H.3
symbols
106
H.4
conditions for calculation
106
H.5
loads on hopper walls
107
H.6
determination of connecting forces at the hopper junction
108
H.7
alternative equations for the hopper load correction values Fe for The load discharge
108
Annex I (normative) action due to dust explosions
109
I.1
general
109
I.2
application
109
I.3
additional standards, guidelines and rules
109
I.4
dusts of explosive nature and their parameters
109
I.5
ignition sources
110
I.6
protective measures
110
I.7
calculation of components
111
I.8
calculation of explosive overpressure
111
I.9
calculation of negative pressure
111
6
DIN 1055-6:2005-03 I.10
securing the closing element of the discharge opening
111
I.11
recoil forces due to pressure release
111
Diagrams Diagram 1
illustration of silo bins with nomenclature of geometric Parameters and loads
9
Diagram 2
basic flow profile
26
Diagram 3
flow profile with pipe flow
27
Diagram 4
flow profile with mixed bulk material flows
28
Diagram 5
effects of slimness (height to diameter ratio) on the mixed bulk material flows and the pipe flows
28
Diagram 6
customized arrangements for fill and discharge
29
Diagram 7
conditions under which pressures due to mass flow arise
32
Diagram 8
symmetric discharge loads around the vertical silo walls
40
Diagram 9
longitudinal and cross-sectional illustrations of the load diagrams of reference-surface loads
42
Diagram 11 longitudinal and cross-sectional illustrations of the load diagrams of reference-surface loads during discharge
47
Diagram 12 flow channels and pressure distribution during discharge with large eccentricities
52
Diagram 13 loads in low silos or silos with medium slimness after the fill (fill loads) Diagram 14 fill pressures during eccentric filled low silos or silos with
56 59
medium slimness Diagram 15 fill pressures in a braced-wall silo
62
Diagram 16 boundaries between steep and flat hoppers
66
Diagram 17 distribution of the fill pressures in a steep and flat hopper
67
Diagram 18 bottom loads in low silos and in silos with medium slimness
70
Diagram 19 discharge pressures in a hopper with a steep and a flat inclination 72 Diagram B.1 coefficients of pressure for wind loads in circular cylindrical tanks
80
7
DIN 1055-6:2005-03 Diagram C.1 equipment for determination of γ
85
Diagram C.2 test procedure for determination of the coefficients of wall friction
87
Diagram C.3 test procedure for determination of Ko
88
Diagram C.4 test procedure for determination of the angle of the internal Friction ϕi and ϕc and the cohesiveness based upon the tension Created by pre-compression
90
Diagram C.5 test procedure for determination of the elasticity module during loading and unloading
94
Diagram D.1 measurement of the profiling of the wall surface
100
Diagram F.1 demarcation of mass and core flow conditions in conical and cuneiform hoppers
102
Diagram G.1 possible rearrangements oat the bulk material surface due to Seismic actions
103
Diagram G.2 seismic actions on the substructure (e.g. braces)
104
Diagram G.3 cross-section through the vertical silo shaft with details of the additional horizontal loads due to seismic actions Diagram H.1 alternative rules for the hoppers
105 108
Tables Table 1
classification of conditions for calculation
23
Table 2
relevant parameters for different load estimates
25
Table 3
categories of wall surfaces
34
Table A.1
composite correction values
77
Table C.1
test parameters
91
Table C.2
typical values for the coefficients of variation for the bulk
Table E.1
Material parameters
98
bulk material parameters
101
8
DIN 1055-6:2005-03
Foreword This standard was compiled in the NABau-AA 00.20.00 “Actions on Buildings” (Spiegelausschuss zu CEN/TC/ 250/SC 1). This standard is part of the new series DIN 1055 Actions on Structures, which consists of the following parts: Part 1: Part 2: Part 3: Part 4: Part 5; Part 6; Part 7: Part 8: Part 9: Part 10: Part 100:
9
DIN 1055-6:2005-03
References to standards belonging to the series DIN 1055, contained in this standard, refer exclusively to the above-mentioned new series DIN 1055. This standard was developed by the Work Committee NABau 00.20.00 on the basis of DIN V ENV 1991-4 and conforms largely to the draft manuscript prEN 1991-4. Any deviations of this standard from the above-mentioned manuscript prEN 1991-4 conform by and large with possible commitments to the national safety standards so that, in the case of an eventual ratification of EN 1991-4, this standard can be compatible in the national context.
Revisions Vis-à-vis DIN 1055-6:1987-05 the following revisions have been made: a) structural adaptation in line with the EN 1991-4 b) terminology adaptation in line with the EN 1991-4 c) adaptation of the calculation and safety concepts in line with the EN 1991-4 d) incorporation of regulations for actions due to dust-explosions e) incorporation of regulations for actions due to earthquakes f) incorporation of regulations for actions due to bulk material properties
Earlier Editions DIN 1055-6: 1964-11, 1987-05
10
DIN 1055-6:2005-03
1. Scope 1) This standard contains general principles and information relating to the influences for the design and calculations of silos for storage of bulk materials and for tanks. It is to be applied in association with the other parts of the series DIN 1055. 2) This standard also contains stipulations for actions on silos and tanks which extend beyond the direct action caused by the stored bulk material or fluids (e.g. effects of temperature differences). 3) While applying the rules for calculations made for silo bins and silo structures the following geometric limitations should be kept in mind: --- The cross-sections of the silo bins are limited to the instances shown in diagram 1d. Smaller deviations are allowed under the condition that the possible effects on the silo structures due to the pressure changes resulting from these deviations will be taken into account. --- The foll. Limits will apply for the geometric measurements:
hb < 10 dc
hb < 100m d c < 60m --- The transition from the vertical silo shaft into the hopper takes place in a simple horizontal plane (also possible in several steps) (see diagram 1a).
11
DIN 1055-6:2005-03 --- The influences on the silo pressures due to inbuilt things or customized restrictions and inbuilt things such as discharge cones, discharge girders, consoles and spots, etc., are not covered (apart fro discharge hoppers). 4) While applying the rules for calculations made for silo bins and silo structures the following limits should be kept in mind with regard to the stored bulk material: --- The calculation for a particular property of the bulk material has to be made for every single silo. --- The bulk material is free flowing or it can be ensured that in special cases it behaves as free flowing material (see 3.1.12 and Annex C). --- The maximum grain size of the bulk material is not more than 0.03d c (see diagram 1d). NOTE
If the bulk material particles are large in comparison with the thickness of
the silo wall, the effects of the contact of individual large particles with the wall are to be regarded as a form of a deposit of individual loads. 5) While applying the rules for calculations made for silo bins and silo structures the following limits should be kept in mind with regard to the operational conditions during filling and discharging: --- During filling the action of the forces of inertia and impact are very slight and may be ignored --- in case of use of discharge aids (e.g. transporting equipment (feeders) or central well with absorption opening), the bulk material flow is uniform, undisturbed and central.
12
DIN 1055-6:2005-03
φr
hw
2
ho
3 Z
*
ef
f
4
φdca
hc
hb
e* β
1
hh
β α
(a) Geometry eo (b) Eccentricity Legend: 1 Junction 2 Equivalent bulk material surface 3 Surface contours in filled silo 4 central axis of silo
Figure 1: DIAGRAM OF SILO BINS WITH DESCRIPTION OF THE GEOMETRIC AND CHARACTERISTIC SIZES AND LOADS
13
DIN 1055-6:2005-03
A
U
=r
A
2
U
=a
4
φdc
ph
a
Pw Pv
φdc
A
U
=
(h 2 ) 2r (1 + b ) a
Pn
φdc
b
Pf
a (c) Loads a φdc
A
U
( 4) =
= 3a
dO
r
φdc
A
U
( 4) = d
= 3a
O
4
4
A
U
=
dO
4
(d) Cross sectional shape (form)
14
DIN 1055-6:2005-03 6) The given load deposits on silo hoppers are applicable only for conical (generally axial symmetric shape or pyramid shape with quadratic or rectangular crosssections) and cuneiform (generally with vertical walls at the front and the reverse sides) hoppers. Hoppers that deviate from this or hoppers with inbuilt things require specialized and greater attention. 7) Silos with symmetric axes of the geometrical horizontal projection type which change along the vertical axis are not covered by this standard. For example, silos with a hopper which blends from a cylindrical shape into a cuneiform shape fall in this category. 8) The rules for calculation for tanks apply only for fluids under normal atmospheric pressure. 9) Loads on the roofs of silos and tanks are subject to the relevant standards DIN 1055-3, DIN 1055-4, E DIN 1055-5, DIN 1055-9 and DIN 1055-10. 10) The calculations for silos with rotary operation are not within the scope of this standard. 11) The calculations for silos against dynamic stresses, which can appear during discharge, such as silo tremors, jolts, hooting and silo knocking, are not within the scope of this standard. NOTE
These phenomena remain unexplained to date. Thus, in terms of the
applicability of this standard, one can neither rule out their occurrence nor ensure that the silo structure is sufficiently dimensioned for the stresses they cause.
15
DIN 1055-6:2005-03
2
REFERENCES TO OTHER STANDARDS
The documents mentioned below are required for using this standard. In case of dated references, only the edition mentioned is applicable. In case of undated references the latest edition of the document mentioned is applicable (inclusive of all revisions). DIN 1045-1
Plain concrete, reinforced and prestressed concrete structures - Part 1: design and construction
DIN 1055-1
Actions on structures – part 1: specific gravity and surface loads of building materials, building components and storage materials
DIN 1055-3
Actions on structures – part 3: self loads and superimposed loads for high buildings
DIN 1055-4
Actions on structures – part 4: wind loads
DIN 1055-5
Actions on structures – part 5: snow and ice loads
DIN 1055-7
Actions on structures – part 7: temperature actions
DIN 1055-9
Actions on structures – part 9: unusual actions
DIN 1055-10
Actions on structures – part 10: actions due to cranes and machines
DIN 1055-100
Actions on structures – part 100: bases of structural planning: security concepts and rules for design calculations
16
DIN 1055-6:2005-03 DIN EN 26184-1
Explosion protection systems – part 1: determination of explosion indices of combustible dust in air
DIN EN 1127-1
Explosive atmospheres – explosion protection – part 1: basic concepts and methodology
DIN EN 50014
Electrical equipment for areas with explosion hazard – general specifications
ISO 3898:1997
Bases for design of structures – notations, general symbols
VDI 2263
Dust fires and dust explosions; dangers, evaluation and protective measures
VDI 3673 Sheet 1
Pressure relief of dust explosions
3
DEFINITIONS AND SYMBOLS
3.1
Definitions
The definitions given below as well as those given in DIN 1055-100 are applicable to this standard.
3.1.1 Aerated silo bottom A silo bottom in which grooves (aeration channels) have been provided, through which air is injected in order to activate the bulk material flow in the area above the silo bottom (see figure 6b).
17
DIN 1055-6:2005-03
3.1.2 Internal diameter of a silo cross-section dc The diameter of the largest inscribed circle of the inner cross-section of a silo bin (see figure 1d).
3.1.3 Circular silo A silo whose ground plan or shaft cross-section shows a circular form (see figure 1 d)
3.1.4 Cohesion Shear strength of the bulk material when direct stress does not act in the plane of breach
3.1.5 Conical hopper A hopper in which the inclined side-surfaces converge at a point, which can – as a rule – ensure an axially symmetric flow of bulk material
3.1.6 Eccentric discharge A flow profile in the bulk material in which the distribution of the moving bulk material is unsymmetrical with relation to the vertical central axis. This is usually due to an eccentrically placed outlet opening (see figures 3c and 3d, 4b and 4c). It can, however, also happen due to other phenomena which lead to non-symmetry (see figure 5d).
18
DIN 1055-6:2005-03 3.1.7 Eccentric filling A situation during or after the filling of the silo, in which the peak of the banked-up bulk material surface (peak of the banked-up cone) is no longer centered in the vertical central axis of the silo (see figure 1b).
3.1.8 Equivalent bulk material surface Height of the envisaged leveled (horizontal) bulk material surface, which is the result of the volume balance between the envisaged and the actual pattern of the surface shape (see figure 1a)
3.1.9 Hopper for “expanded flow” A hopper in which the side surfaces in the lower part of the hopper are steep enough to create a mass flow, while the side surfaces in the upper part of the hopper have a more gradual inclination so that a core flow can be expected there (see figure 6d). This arrangement reduces the height of the hopper and at the same time ensures a reliable discharge.
3.1.10 Horizontal (silo) bottom The inner bottom surface of the silo with an inclination that is less than 5o
3.1.11 Flow profile The geometric form of the bulk material that is flowing out, when the flow is fully developed (see figures 2 to 5). The silo is in this case is almost completely filled-up (state of maximum fill).
19
DIN 1055-6:2005-03 3.1.12 Fluidized bulk material That state of a stored powdery bulk material in which it contains a large proportion of air pockets with a pressure gradient which acts against the weight of the particles and counterbalances the same. The air can either be drawn in by means of specific ventilation or be introduced through the filling process. A bulk material is designated as fluidized even if only a part of the weight of the bulk material is counterbalanced by the air pockets.
3.1.13 Free-flowing granular material Granular bulk material in which the flow pattern is not noticeably influenced by cohesion
3.1.14 Fully filled state A silo is in the fully filled state when the surface of the bulk material has achieved the highest position that it can possibly acquire within the service life of the structure while the silo is in operation. NOTE:
This is taken as the ruling condition for design calculations of silos.
3.1.15 Core flow Flow profile, in which a flow channel develops in the bulk material above the outlet opening, while the bulk material remains undisturbed in the area between the flow channel and the silo wall (see figure 2) NOTE:
The flow channel can, in such case, come into contact with the vertical silo wall – one
would then term it “mixed flow” – or it can stretch right up to the surface without any point of contact whatsoever with the silo wall, in which case the term “ funnel flow” or “shaft flow” is used to describe it.
20
DIN 1055-6:2005-03 3.1.16 Granular material Material which is composed of separate and individual grains of specific particles, with the particles having more or less equal dimensions and where the air between the individual grains plays only a marginal role in the determination of the loads and has only a marginal influence on the bulk material flow.
3.1.17 High fill speed That condition in a silo, in which the speed of the filling leads to an intake of air of such an order that it would affect the pressure ratios at the wall.
3.1.18 Homogenizing silos Silos in which the bulk material is homogenized with the help of fluidization, i.e. homogenized by means of mixing.
3.1.19 Hopper Silo bottom with inclined walls
3.1.20 Hopper load ratio value F A value which specifies the relationship between the normal load pn on the inclined hopper walls and the mean vertical load pv at this position in the bulk material. 3.1.21 Silo of medium slimness A silo whose ratio of height to diameter lies between 1.0 < hc / dc < 2.0 NOTE:
exceptions are defined in 5.3.
3.1.22
21
DIN 1055-6:2005-03 Internal funnel flow Flow profile with funnel flow in which the flow channel limit stretches up to the surface of the bulk material without the flow area coming into contact with the silo wall in the process (see figures 2 and 3).
3.1.23 Horizontal load ratio K A value which specifies the relationship between the mean horizontal load pn acting on the vertical silo walls, and the mean vertical load pv at this position in the bulk material. 3.1.24 Marginal cohesion A bulk material sample shows a marginal cohesion when the cohesion c is smaller than 4% of the pre-consolidation stress σr NOTE
a process for the determination of cohesion is given in C.9
3.1.25 Mass flow Flow profile in which all the bulk material particles in the silo are simultaneously in motion during discharge (see figure 2a)
3.1.26 Mixed flow Core flow profile in which the flow channel, which is still beneath the bulk material surface, comes into contact with the vertical silo walls (see figures 2c and 4)
3.1.27 Non-circular silo A silo, wherein the cross-section is not a circle (see figure 1)
22
DIN 1055-6:2005-03 3.1.28 Bulk material A term used to describe a granular material ranging from a dust-like to a large-grained variety with and without cohesion, which contains pores in addition to and in-between the individual solid material particles that may be filled with air or moisture.
3.1.29 Reference surface load Local load perpendicular to the vertical silo wall to be placed at any chosen height in a specific portion of its surface.
3.1.30 Funnel flow Flow profile in which the bulk material is in motion above the outlet opening in a vertical or almost vertical flow channel, but is in a state of rest next to the flow channel (see figures 2 and 3). NOTE
If the outlet opening is placed eccentrically (see figures 3c and d) or if due to certain factors
the flow channel deviates from the vertical axis above the discharge (see figure 5), the flow of the bulk material can appear against the wall.
3.1.31 Level flow Flow profile in a silo with a rectangular or a quadratic cross-section and a slit-shaped outlet opening. The discharge slit runs parallel to two silo walls. Its length corresponds to the length of both these silo walls.
3.1.32 Powdery bulk material A bulk material whose mean particle size is smaller than 0.05 mm
23
DIN 1055-6:2005-03 3.1.33 Silo with braced wall Silo with a horizontal bottom and and a height to diameter ratio of hc / dc < 0.4 3.1.34 Flat hopper A hopper in which the full amount of wall friction is not mobilized
3.1.35 Silo A structure for storage of bulk material
3.1.36 Slim silo A silo with a height-diameter ratio of hc / dc > 2.0, or one which fulfills the additional conditions given in 5.3
3.1.37 Slimness Ratio of the height to diameter hc / dc of the vertical portion of the silo 3.1.38 Low silo A silo with a height-diameter ratio of 0.4 < hc / dc < 1.0 or one in which the additional conditions as per 5.3 are fulfilled. NOTE
In case of a height-diameter ratio of hc / dc < 0.4, and if the silo contains a hopper, the silo
will fall into the category of a low silo. Otherwise – in case of a flat silo bottom – it falls into the braced-wall silo category.
24
DIN 1055-6:2005-03 3.1.39 Steep hopper A hopper in which the full wall friction is mobilized after the filling 3.1.40 Stress in the bulk material Force per unit area within the stored bulk material
3.1.41 Tank A structure for storage of fluids
3.1.42 A thick-walled silo A silo with a diameter-to-wall thickness ratio which is less than dc /t = 200 3.1.43 A thin-walled silo A silo with a diameter-to-wall thickness ratio which is greater than dc /t = 200 3.1.44 Wall friction Force per unit area along the silo wall (vertical or inclined) on account of friction between the bulk material and the silo wall.
3.1.45 Hopper junction The section between the hopper and the vertical silo wall, i.e. the transition from the vertical part of the silo into the hopper
25
DIN 1055-6:2005-03 3.1.46 Vertical Silo shaft The part of the silo which comprises of the vertical walls
3.1.47 Wedge-shaped hopper A hopper in which the surfaces converge at a slit for ensuring an even flow of the bulk material; the walls of each of the other two hoppers run vertically
3.2
Symbols
3.2.1 General A list of basic symbols (letter symbols) is given in DIN 1055-100. The additional letter symbols for this part of the standard are given below. The symbols used are based on the conventions of ISO 3898:1997.
3.2.2 Latin letters, capital A
cross-section of the vertical shaft
Ac
cross-section of the flow channel in case of eccentric discharge (large
eccentricities) B
depth parameter in case of eccentrically filled low silos
C
load augmentation factor
Co
discharge factor (load augmentation factor during discharge) for the bulk material
Cop
bulk material parameter for the reference surface load (load augmentation factor)
26
DIN 1055-6:2005-03 Cb
load augmentation factor for the bottom loads
Ch
load augmentation factor for the horizontal discharge loads
Cpe
load augmentation factor for the reference surface loads during discharge
Cpf
load augmentation factor for the reference surface loads in case of fill loads
CS
correction value for slimness in a silo with medium slimness
CT
load augmentation factor for making allowance for temperature differences or changes
Cw
correction value for discharge for the wall friction loads (load augmentation factor)
E
ratio of eccentricity (during fill and discharge) to silo radius
Es
effective elasticity modulus of the stored bulk material at the relevant stress level
Ew
elasticity modulus of the silo wall
F
relationship between the vertical loads on the silo wall and the mean vertical load in the bulk material at this point
Fe
load ratio in the hopper during the discharge (relationship between loads perpendicular to the silo wall and mean vertical loads in the bulk material)
Ff
load ratio in the hopper after the filling (relationship between loads perpendicular to the silo wall and mean vertical loads in the bulk material)
27
DIN 1055-6:2005-03 Fpe
integral of the horizontal reference surface load for thin walled circular silos in the case of discharge loads
Fpf
integral of the horizontal reference surface load for thin walled circular silos in the case of filling loads
G
ratio of the radius of the flow channel to the radius of the internal cross-section of a circular silo
K
characteristic value of the horizontal load ratio
Km
mean value of the horizontal load ratio
Ko
value of K when horizontal elongation as well as principal stresses that run or are aligned horizontally and vertically are ruled out
Pwe
characteristic value of the sum total of the wall friction loads for each running meter in the circumferential direction of the vertical silo wall in the case of discharge loads
Pwf
characteristic value of the sum total of the wall friction loads for each running meter in the circumferential direction of the vertical silo wall in the case of fill loads
PzSk
characteristic value of the wall loads for each running meter in the circumferential direction of the vertical silo wall for low silos and large filling eccentricities
S
geometry factors for the hopper loads (= 2 in the case of cone shaped hoppers, =1 in the case of wedge shaped hoppers)
U
inner circumference of the cross-section of the vertical silo shaft
28
DIN 1055-6:2005-03
Usc
(inner) circumferential length of the flow channel in the contact zone up till the non flow zone of the bulk material during discharge with large eccentricities
Uwc
(inner) circumferential length of the flow channel in the contact area with the silo wall during discharge with large eccentricities
Y
depth variation function: function for the description of the increase in load with increasing depth in the silo
YJ
depth variation function of the theory acc. to Janssen
YR
depth variation function for small silos
3.2.3 Latin letters, small a
side length of a silo with a rectangular or a hexagonal cross-section (see figure 1d)
ax
divergence-coefficient (-factor) or conversion factor for calculating the upper and lower characteristic bulk material parameters from the mean values
aK
divergence-coefficient or conversion factor for the horizontal load ratio
aγ
divergence-coefficient or conversion factor for the bulk material specific gravity
aφ
divergence-coefficient or conversion factor for the angle of the internal friction
aµ
divergence-coefficient (-factor) or conversion factor for the coefficients of wall friction
29
DIN 1055-6:2005-03 b
width of a rectangular silo (see figure 1d)
b
empirical coefficient for the hopper loads
c
cohesion of the bulk material
dc
characteristic dimensions for the inner cross-section of the silo (see diagram 1d)
e
the larger value of the eccentricities ef and eo
ec
eccentricities of the central axis of the flow channel during discharge with large eccentricities (see figure 11)
ef
largest eccentricity of the bulk cone at the bulk material surface during filling (see figure 1b)
ef,cr
largest fill eccentricity for which the simplified rules for the allowance for marginal eccentricities can be used (ef,cr = 0.25dc )
eo
eccentricities of the centre point of the outlet opening (see figure 1b)
eo,cr
largest eccentricity of the outlet opening for which the simplified rules for the allowance for eccentricities can be used (eo,cr = 0.25dc )
et
eccentricities of the peak of the fill-up cone at the bulk material surface when the silo is filled up (see figure 1b)
et,,cr
largest eccentricity of the fill-up cone at the bulk material surface for which the simplified rules for the allowance for eccentricities can be used (et,,cr = 0.25dc )
30
DIN 1055-6:2005-03 hb
overall height of a silo with hopper, measured from the envisaged hopper peak, up to the equivalent bulk material surface (see figure 1a)
hc
height of the vertical silo shaft, measured from the hopper junction up to the equivalent bulk material surface (see figure 1a)
hh
height of the hopper measured from the envisaged hopper top up to the hopper junction
ho
distance between the equivalent bulk material surface and the lowest point at the base of the bulk material cone (at the lowermost point of the silo wall which is not in contact with the stored bulk material when the latter has been filled to the specified extent)(see fig 1, 13 and 17)
htp
total height of the back-filled cone at the bulk material surface (vertical distance from the lowest point of the silo wall up to the tip of filled-up cone when the bulk material, which is filled to the specified extent, is not in contact with the silo wall)(see figures 1a and 17)
n
parameters in the conditional equations of the hopper loads
p
load as force per unit area
ph
horizontal load from the stored bulk material (see figure 1c)
phae
horizontal load in the area where the bulk material is at rest next to the flow channel, during a discharge with large eccentricities
phce
horizontal load in the flow channel during a discharge with large eccentricities
31
DIN 1055-6:2005-03 phco
asymptomatic horizontal load at a great depth in the flow channel during a discharge with large eccentricities
phe
horizontal load during discharge
phe,u
horizontal load during discharge and use of the simplified calculating method
phf
horizontal load after the filling
phfb
horizontal loads after the filling at the lower end of the vertical shaft
phf,u
horizontal loads after the filling using the simplified calculating material
pho
asymptomatic horizontal loads at a great depth from the stored bulk material
phse
horizontal loads in the bulk material (which is in a state of rest) at a great distance from the flow channel during a discharge with large eccentricities
phT
increase of horizontal loads as a result of temperature differences or changes
pn
loads from the stored bulk material, that are perpendicular to the hopper walls (see figure 1c)
pne
loads during discharge that are perpendicular l to the hopper walls
pnf
loads after the fill that are perpendicular to the hopper walls
pp
reference surface loads
ppe
basic value of the reference surface loads during discharge
32
DIN 1055-6:2005-03
ppei
complementary reference surface loads during discharge
ppe.nc strip shaped reference surface load for silos with non-circular cross-sections during discharge ppf
basic value of the reference surface loads after the filling
ppfi
complementary reference surface loads after the filling
ppe,nc strip shaped reference surface load for silos with non-circular cross-sections after the filling ppes
reference surface load at the cylinder ordinate θ for thin walled circular silos during discharge
ppfs
reference surface load at the cylinder ordinate θ for thin walled circular silos after the filling
pt
friction load in the hopper (see figure 1c)
pte
friction load in the hopper during discharge
ptf
friction load in the hopper after the fill
pv
vertical load in the bulk material (see figure 1c)
pvb
vertical load at the bottom of a low silo
pvf
vertical load in the bulk material after the filling
33
DIN 1055-6:2005-03 pvft
vertical load at the hopper junction after the filling (foot of the vertical silo shaft)
pvho
vertical load at the foot of the filled cone at the bulk material surface according to equation (86) and with the bulk material depth being z = ho
pvsq
vertical load on the horizontal bottom of a low silo or a silo of medium slimness
pvtp
geostatic vertical load at the foot of the filled cone at the bulk material surface
pw
wall friction load along the vertical wall (shear force per unit area due to friction) (see figure 1c)
pwae
wall friction loads in the bulk material which is in a state of rest right next to the flow channel during the discharge with large eccentricities (at the transition from stationary to flowing bulk material)
pwce
wall friction loads in the flow channel during discharge with large eccentricities
pwe
wall friction loads during discharge
pwe,u
wall friction loads during discharge using the simplified calculation method
pwf
wall friction loads after the filling
pwf,u
wall friction loads after the filling using the simplified calculation method
pwse
wall friction loads in the bulk material which is at rest at a large distance from the flow channel during discharge with large eccentricities
r
equivalent silo radius (r = 0.5dc)
34
DIN 1055-6:2005-03 rc
radius of the eccentric flow channel during discharge with large eccentricities
s
dimensions of the area subject to the reference surface load (s = π dc
/16 =
0.2dc) t
thickness of the silo wall
x
vertical coordinate in the hopper with origin in the hopper peak (see figure 16)
z
depth beneath the equivalent bulk material surface in the filled state (see figure 1a)
zo
characteristic depth according to the theory of Janssen
zoc
characteristic depth according to the theory of Janssen for the flow channel during discharge with large eccentricities
zp
depth of the mid-point of the reference surface load beneath the equivalent bulk material surface in a thin-walled silo
zs
depth beneath the highest point of contact between the bulk material and the silo wall (see figures 13 and 14)
zV
unit of measurement of the depth for determining the vertical loads in low silos
3.2.4 Greek letters, capital ∆
Horizontal displacement of the upper part of a shear bin
∆
Operator for incremental sizes (see symbols given below)
35
DIN 1055-6:2005-03 ∆T
Temperature differences between the stored bulk material and the silo walls
∆v
Incremental vertical displacements measured during the material examination
∆σ
Incremental stress placed upon a specimen during material examination
3.2.5 Greek letters, small α
Mean angle of inclination of the hopper walls with reference to the horizontal
αw
Coefficient of thermal elongation of the silo wall
β
Angle of inclination of the hopper wall with ref. to the vertical (see figures 1a and 1b) or the angle of the steepest hopper walls in a quadratic or rectangular hopper
γ
Characteristic value for the specific gravity of the stored fluid or the stored bulk material
γl
Specific gravity of the bulk material in fluidized state
γu
Upper characteristic values of the specific gravity of the stored fluid or the stored bulk material
δ
Standard deviation of a parameter
θ
Cylindrical coordinate: angle in direction of the circumference
θc
Angle at circumference of the flow channel during discharge with large eccentricities (see figure 11) with ref to the central axis of the silo shaft
36
DIN 1055-6:2005-03
ψ
Wall contact angle of the eccentric flow channel with reference to the central axis of the flow channel
µ
Characteristic value of the wall friction angle at the vertical silo wall
µheff
Effective or mobilized wall friction coefficient in a flat hopper
µh
Wall friction coefficient in the hopper
µm
Mean value of the wall friction coefficients between bulk material and silo wall
ν
Poissons number for the bulk material
φc
Characteristic value of the angle of internal friction of a precompressed bulk material in case of relief (i.e. inclusive of the portion from cohesion)
φi
Characteristic value of the angle of internal friction of a bulk material in case of equivalent load (i.e. without the portion from cohesion)
φim
Mean value of the angle of internal friction
φr
Angle of slope of a bulk material (conical bulk heap) (see figure 1a)
φw
Wall friction angle (arc tan µ) between bulk material and hopper wall
φwh
Wall friction angle in the hopper (arc tan µh) between bulk material and hopper wall
σr
Reference stress for the tests for determination of the bulk material parameters
37
DIN 1055-6:2005-03
4
DESCRIPTION AND CLASSIFICATION OF SILOS
4.1
Description of Actions in Silos (1)
The actions on silos are to be estimated with regard to the silo structure, the properties of the stored bulk material and the flow profiles that arise during emptying of the silo.
(2)
Ambiguities related to the flow profiles, the influence of the fill and discharge eccentricities on the fill and discharge processes, the influence of the silo shape and size on the type of the flow profile and those that are related to the time-dependant discharge and fill pressures are all to be taken into consideration
NOTE 1
The magnitude and the distribution of the rated loads depend upon the silo structure, the
material parameters of the bulk materials and the flow profiles which build up during emptying. The inherent differences in the properties of the different bulk materials that are stored and the simplifications in the load models lead to variations between the silo loads that actually appear and the design loads (calculated loads) according to sections 6 and 7. Thus, to quote an example, the distribution of discharge pressures along the silo wall changes with time. An exact prediction of the prevailing mean pressure, its divergence and its temporal variability is not possible, given the present level of knowledge.
(3)
Allowance should be made for loads on the vertical walls of the silo when it is filled and while it is emptying, with fill- and discharge- eccentricities being marginal; this is to be done using a symmetric load component and an unsymmetric reference surface load. In case of large eccentricities the loads are to be described using a pressure distribution curve.
38
DIN 1055-6:2005-03 (4)
Should the chosen form of the silo structure show a sensitive reaction to changes of the estimated load-guidelines, allowance has to be made for this through appropriate investigations
(5)
The symmetric loads on the silo walls are to be estimated as follows: a) by means of horizontal load components ph upon the inner surface of the vertical silo wall; b) by means of loads pn that act perpendicular to inclined walls; c) by means of frictional loads pw and pt that act in the tangential direction of the wall; and d) by means of vertical load components pv in the stored bulk material (see figure 1c)
(6)
The unsymmetric loads on the vertical silo walls in case of marginal eccentricities during fill and discharge have to be taken into account by using a reference surface load. These reference surface loads consist of horizontal pressures ph that act upon the inner surface of the silo wall locally.
(7)
The unsymmetric loads on the vertical silo walls in case of large eccentricities during fill and discharge are to be additionally registered using a unsymmetric distribution of horizontal pressures ph and friction loads pw
(8)
Unplanned and unaccounted load influences are to be registered using the load augmentation factor C.
(9)
The load augmentation factors C for silo cells in categories 2 and 3 (see 4.5) register unaccounted additional load influences alone, which arise due to the bulk material flow during emptying of the silo.
(10)
The load augmentation factors C for silo bins in category 1 (see 4.5) register additional influences during emptying that are caused by the bulk material movement as well as the influences due to the deviation of the bulk material parameters.
39
DIN 1055-6:2005-03
NOTE 2
The load augmentation factors C are intended to cover the ambiguities related to the flow
profile, the influences of eccentricities during filling and emptying, the influence of the shape of the silo on the manner of the flow profile and proximity influences which arise when allowance is not made for the presence of fill and discharge pressures that are time dependant. For category 1 silos (see 4.5) the load augmentation factor also takes into account the deviation of the material properties of the bulk material. In silos of categories 2 and 3, allowance for the deviation of the material parameters influenced by the loads is not made by a load augmentation factor C but by the formulation of the appropriate characteristic calculation values for the bulk material parameters γ, µ, K and φi.
(11)
In silos of category 1 (see 4.5) the allowance for unsymmetric loads is made by means of an increase of the symmetric loads by applying a load augmentation factor for the discharge loads C.
(12)
In silos of categories 2 and 3 (see 4.5) allowance for the unsymmetric reference surface loads can be made alternatively by a substitute augmentation of the symmetric loads.
4.2
Description of Action on Tanks (1) Allowance for loads on tanks as a consequence of filling them up is made by hydrostatic load formulations
4.3
Classification of actions on silo bins (1) Loads due to bulk materials stored in the silo bins are to be classified as variable actions in accordance with DIN 1055-100. (2) Symmetric loads on silos are to be classified as variable stationary actions in accordance with DIN 1055-100.
40
DIN 1055-6:2005-03
(3) Reference surface loads for making allowances for the filling and discharge processes in silo bins are to be classified as variable free actions in accordance with DIN 1055-100. (4) Eccentric loads for making allowances for the eccentric filling and discharge processes in silo bins are to be classified as variable stationary actions. (5) Loads arising from air or gas pressures in connection with pneumatic conveyor systems are to be regarded as variable stationary actions. (6) Loads due to dust explosions are to be classified as extraordinary actions as defined by DIN 1055-100.
4.4
CLASSIFICATION OF THE INFLUENCES ON TANKS
Loads on tanks that arise due to the filling up of the tanks can be classified as variable stationary influences acc. to DIN 1055-100.
4.5
STANDARDISED CATEGORIES
(1) Based upon the design of the silo structure and its susceptibility to different types of malfunctions, various accuracy standards are used in the process of determining the influences on silo structures. (2) The silo influences should be determined in accordance with one of the following standardized categories specified in this standard (see Table 1).
41
DIN 1055-6:2005-03
TABLE 1 – CLASSIFICATION OF THE DIMENSIONING CONDITIONS
STANDARDISED
DESCRIPTION
CATEGORIES standardized
Silos with a capacity of more than 10 000 tonnes
category 3
Silos with a capacity of more than 10 000 tonnes, in which one of the foll. calculating conditions is present a) eccentric discharge with
eo
dc
> 0.25 (see fig 1b)
b) low silos with an eccentric filling of more than
eo
dt
> 0.25
standardized
all silos which are covered by this load standard and do not fall in the
category 2
other two categories
standardized category 1
NOTE
silos with a capacity of less than 100 tonnes
The differences amongst the categories listed in Table 1 have been determined
taking into account the shortfalls of an exact estimation of the influences. The rules for small silos are simple and conservative on the safer side, as they have a robustness of their own and high costs of an estimation of bulk material parameters for example, are not justified.
(3) A higher category for a silo than that which is required as per Table 1 can always be chosen. For any part of the procedures (computation of loads) described in this standard, a higher category than that in Table 1 can be taken as a basis, if required. (4)
In case several silos are connected to one another, the suitable category for each
bin should be individually determined, and not for the set of silos as a whole.
42
DIN 1055-6:2005-03
5.
CALCULATING CONDITIONS
5.1
GENERAL
(1)
The influences on silos and tanks, for each of the relevant calculating conditions,
are to be determined in compliance with the general specifications contained in DIN 1055-100. (2)
It is important that the relevant calculating conditions be observed and the critical
load types are determined. (3)
The combination rules depend on each of the verifications and are to be chosen in
accordance with DIN 1055-100. NOTE The relevant combination rules are given in Annex A. (4)
Influences on account of the adjacent building structures are to be taken into
account. (5)
Influences of transporting equipment and pouring equipment are to be taken into
account. Special care is requested in case of permanently installed transporting equipment. They can transmit loads to the silo structure across the stored bulk materials. (6)
Depending on the circumstances, the following extraordinary influences and
situations are to be taken into account: -
Influences caused by explosions
-
Influences caused by vehicular impact
-
Influences caused by earthquakes
-
Influences caused by fire-load
43
DIN 1055-6:2005-03
5.2
CALCULATING CONDITIONS CAUSED BY “BULK MATERIAL” STORED IN
SILOS (1)
Loads on silos caused by stored bulk materials are to be ascertained for the
maximum possible state of fullness. (2)
The loads estimates for filling and for discharge can be used as evidence for
supporting safety as well as performance capability. (3)
The dimensioning for filling and for discharge of bulk materials has to comply with
the principal load-types which can lead to differing boundary states for the structure: -
Max loads perpendicular to the vertical silo wall (horizontal loads)
-
Max vertical wall friction loads on the vertical silo wall
-
Max vertical loads on the silo bottom
-
Max loads on the silo hoppers
(4)
For determination of loads, the upper characteristic values of the bulk material
specific gravity γ are to be used always.
(5)
The determination of the loads of a load type should always be made for a specific
combination of matching parameters µ , K and ϕ i , so that every boundary state is assigned a specific defined condition of the bulk material. (6)
For each of these load types its extreme value is attained when each of the bulk
material characteristic values µ , K and ϕ i acquires differing extreme values within the variance range of their characteristic bulk material parameters. In order to ensure adequate safety for all boundary states during dimensioning, differing combinations of the extreme values of these parameters have to be examined. Table 2 gives the extreme values of the bulk material parameters which are to be used for each load types that are to be examined. 44
DIN 1055-6:2005-03
TABLE 2 - VITAL PARAMETERS FOR THE DIFFERENT LOAD CALCULATIONS CHARACTERISITC VALUE TO BE CALCULATED OF
HORIZONTAL
WALL FRICTION
RATIO
FRICTION
µ
K
ϕi
Lower limit value
Upper limit value
Lower limit value
Upper limit value
Upper limit value
Lower limit value
Lower limit value
Lower limit value
Upper limit value
Coefficient of wall friction
Load ratio in the hopper
µ
F
Maximum hopper loads in the
Lower limit value for the
Lower limit value
Lower limit value
filled state
hopper
Maximum hopper loads during
Lower limit value for the
upper limit value
upper limit value
discharge
hopper
TYPE OF LOAD EXAMINED
LOAD
ANGLE
COEFFICIENT OF
INTERNAL
SECTION OF VERTICAL WALL Max.
horizontal
load
ratio
perpendicular to the vertical wall Max. wall friction loads on the vertical walls Max. vertical loads on the hopper or the silo bottom Type of load examined
Angle of internal friction
ϕi
HOPPER WALLS
NOTE 1
It is to be noted that the wall friction angle is always smaller or same as the angle of internal friction of the
stored bulk material (i.e.ϕ wh ≤ ϕ i ) . Otherwise, when transverse stresses recorded at the wall contact surface are larger than those due to the internal friction of the bulk material itself, a slide surface develops within the bulk material. This means that in all cases the coefficient of wall friction should not be taken as larger than tan
NOTE 2
ϕ i (µ = tan ϕ w ≤ tan ϕ i )
The loads that are perpendicular to the hopper walls p n are as a rule largest when the wall friction in the
hopper is small, because thereby a smaller portion of the loads in the hopper are take away are removed through friction. It is to be observed which maximum parameters become decisive for the individual dimensioning exercises (i.e. it is the malfunctioning that is being examined, which determines whether the wall friction loads or loads that are perpendicular to the hopper wall are to be calculated as maximum)
45
DIN 1055-6:2005-03 (7)
The above table notwithstanding, silos of category 1 can be dimensioned using the
mean values of the bulk material parameters, namely the mean value of the coefficient of wall friction µ m , the mean value of the horizontal load ratio K m and the mean value of the angle of internal friction ϕ im . (8)
The fundamental equations for calculating the silo loads are given in sections 7
and 8. These are to be taken as the basis for the calculation of the following characteristic loads: -
Filling loads on vertical wall sections (see section 7)
-
Discharge loads on vertical wall sections (see section 7)
-
fill and discharge loads on horizontal bottoms (see section 8)
-
Fill loads on hoppers (see section 8)
-
Discharge loads on hoppers (see section 8)
5.3
CALCULATING
CONDITIONS
CAUSED
BY
DIFFERING
GEOMETRIC
DESIGNS OF THE SILO GEOMETRY (1)
Differences in slimness of silos (ratio of height to diameter), hopper geometries and arrangements of vents lead to differences in calculating conditions and these have to be observed.
(2)
In a silo that has been filled-up, the trajectory of the filling stream of the filled up bulk material may at times cause the build-up of an eccentric back-fill cone at the bulk material surface (see fig 1b) and when this happens different storage densities can arise in different parts of the silo which lead to un-symmetric loads. While calculating the size of these loads, the largest possible eccentricity of the filling stream is to be taken as a basis (see 7.2.1.2 and 7.3.1.2)
46
DIN 1055-6:2005-03 (3)
While dimensioning, the effects of the flow profiles are to be observed which can be divided into the following Categories (see fig. 2): -- Mass flow -- funnel flow -- mixed flow
2
2
1 3 5
3 4 4
a) MASS FLOW
4
4
b) CORE FLOW
C)CORE FLOW
(FUNNEL FLOW)
(MIXED FLOW)
Legend 1
Entire bulk material in motion
4 Bulk material at rest
2
flow
5 Effective passages
3
Limits of flow channel
6 Effective hopper
Figure 2 – BASIC FLOW PROFILES
47
DIN 1055-6:2005-03
(4)
If it can be additionally ensured during funnel flow that the flow channel is always
located within the bulk material without coming into contact with the silo wall (see figures 3a and 3b), the emptying pressures can be ignored. Low silos with concentric discharge aided by gravity and silos with a mechanical discharge system located at the bulk material surface which ensures a build-up of funnel flow (see fig. 5a, 5b and 6a) fulfill these conditions (see fig. 7.1 (9) and 7.3.2.1(2) and (4)). NOTE
A suitably designed central tube with lateral vents (“anti dynamic tube”) can
also ensure that this condition - i.e. building up an internal funnel flow - is fulfilled. (5)
In case of symmetric mass flow or a mixed flow (see fig. 2), the un-symmetric loads that usually occur are to be taken into account during the dimensioning (see 7.2.2.2 and 7.3.2.2).
(6)
In case of flow profiles with core flow (see fig 2) and partial contact of the moving bulk material mass with the silo wall, other un-symmetric load components – which may arise specifically in this case – are to be taken into account during dimensioning (see fig 3c and 3d as well as fig 4b and 4c) (see 7.2.4).
(7)
For silos with several vents and presuming a state of maximum fullness, one has to take into account that during operation either all the vents may be opened simultaneously or a single vent alone may be open.
(8)
For silos with several vents, provisions of the combination of active vents for the operation are to be regarded as normal calculating conditions. Other openings which are not part of the planned operation are to be regarded as extraordinary calculating conditions.
48
DIN 1055-6:2005-03
(9)
h In case of an eccentrically filled very slim silo ⎛⎜ i.e. c > 4 ⎞⎟ , the effects of mixed d c ⎝ ⎠
flow in different areas could lead to either differing packing densities or cohesion of the bulk material. In such cases the asymmetric alignment of the bulk material particles can set off a un- symmetric core flow (see fig. 5d). This creates zones in the silo where the bulk material flows along the silo wall and thereby gives rise to un-symmetric loads. For such cases special load computations are to be used (see 7.2.4.1 (2)).
1
1
1
2
2
2
2
4
4 3
INTERNAL PARALLEL
Funnel flow
3
3
3
INTERNAL CONVERGENT
1
ECCENTRIC PARALLEL
funnel flow
funnel flow
ECCENTRIC CONVERGENT
funnel flow
Legend 1
flow
2
flow channel limits
3
flowing funnel
4
bulk material at rest
Figure 3 – FLOW PROFILES WITH FUNNEL FLOW
49
DIN 1055-6:2005-03
6
6
4 2
3
1
3
5 1
5
3
1
(A)
(B)
(C)
a) Concentric mixed flow b) Fully eccentric mixed flow c) Partially eccentric mixed flow Legend 1
At rest
2
Effective hopper
3
Limits of flow channel
4
Effective passage
5
Flow zone
6
Effective passage varies in the silo’s circumferential direction
Figure 4 – FLOW PROFILE WITH MIXED FLOW OF BULK MATERIAL
50
DIN 1055-6:2005-03
5
4
5
2 4 2 5 3
1 1
2
] 1 1
a) Braced wall silo
b) Low silo
c) Slim silo
d) Very slim silo
Legend 1
Bulk material at rest
2
Flow channel limits
3
Effective hopper
4
Effective passage
5
Flow
Figure 5 – EFFECTS OF THE SLIMNESS (RATIO OF HEIGHT TO DIAMETER) ON THE MIXED FLOW OF THE BULK MATERIAL AND THE FUNNEL FLOW
51
DIN 1055-6:2005-03
(10)
For silos with pneumatically conveyed powdery bulk materials two calculating conditions, both at maximum fullness, are to be considered:
-
The bulk material filled in can develop a cone, as is the case with other bulk materials.
-
It is to be taken into account that the bulk material surface, independent of the gradient of slope and the filling eccentricities, could possibly also be of even shape (see fig 6c). In this case the eccentricities e f and et can be fixed at zero.
(11)
In case of silos for storage of powdery bulk material where air-injection is used as a discharge aid in the bottom area, (see fig 6b), the entire bulk material zone near the bottom can become fluidized, which can generate an effective mass flow even in low silos. Such silos are to be computed in accordance with the procedure for slim silos, regardless of their actual slimness
(12)
hc
dc
.
In case of silos for storage of powdery bulk material where air-injection is used as a discharge aid in the bottom area, (see fig 6b), just a part of the bulk material zone near the bottom can become fluidized. This can generate an eccentric mass flow (see fig 4b), which is to be taken into account while dimensioning. The eccentricity of the resultant flow channel and the resultant value of the eccentricity
e0 that is to be computed are to be derived keeping in mind the fluidized zone, in addition to the position of the vent. (13)
The vertical silo walls with a discharge hopper which causes an expanded flow (see fig 6d), can form the basis of the conditions for a mixed bulk material flow. This can lead to un-symmetric discharge loads. In this type of silo the ratio
hb
dc
can be fixed for slimness instead of
hc
dc
(see fig 1a).
52
DIN 1055-6:2005-03 (14)
A silo with a slimness of
hc
dc
smaller than 0.4 and with a funnel hopper is to be
graded as a low silo. In case of a horizontal silo bottom this silo is to be graded as a braced wall silo.
a) Mechanically aided discharge e.g. with a rotating space arm
b) Air injection and air vents generate mass flow
c) Pneumatic filling of powdery bulk material generally results in a level bulk material surface
d) “Expanded flow” hoppers lead to mass flow at least in the lower hopper
Figure 6 - SPECIAL FILLING AND SICHARGE ARRANGEMENTS
53
DIN 1055-6:2005-03 5.4
CALCULATING CONDITIONS CAUSED BY SPECIFIC STRUCTURAL SHAPES OF SILOS
(1)
In case of dimensioning of silos fro usability, the size of fissures is to be limited to suitable dimensions. The inspection of fissure size has to comply with the fissure size limitation specified in DIN 1045-1 subject to the exposition categories based on the ambient conditions of the silo.
(2)
For metal silos which mainly consist of nuts and bolts, the specifications for unsymmetric load values (reference surface loads) are to be complied with.
(3)
For metal silos with rectangular cross-sections that contain beam ties within the silo shaft for reducing the wall’s bending moment, the specifications in 7.7 are to be followed.
(4)
The effects of fatigue in silos and tanks are to be taken into account if they are exposed to a load cycle more than once a day on an average. A load cycle is equivalent to a complete filling and emptying cycle of a silo or, in the case of a airinjection silo, a complete process conclusion (rotation) of the sectors subjected to air-injection. Fatigue effects are also to be taken into consideration in silos which are exposed to the influence of vibrating machines/equipment components.
(5)
Prefabricated silos are to be dimensioned for the influences related to manufacture, transport and assembly.
(6)
In case of slip openings or observation holes in the silo or hopper walls, the loads on the stopper covers are to be taken into account using double the value of the maximum load-values upon the adjacent wall sections. These loads are to be computed only for the dimensioning of the stopper cover and its support or attachment structures.
54
DIN 1055-6:2005-03
(7)
If the silo roof has to bear loads imposed by dust filtering equipment, cyclones or mechanical transporting equipment, then these loads are to be treated as live loads.
(8)
If pneumatic transport systems are used for filling and emptying of silos, then loads resulting from differences in air-pressure are to be taken into account.
NOTE
These loads normally amount to <10kPa as a rule, but higher sub
pressures (generally 40kpa ≈ 0.4 bar) may also arise as a result of defective dimensioning of specific transporting equipment or in case of an operational fault. Silos must therefore be equipped with suitable pressure-relief devices for unforeseen occurrences, if the designing engineer cannot otherwise rule out the same. (9)
If vibrating equipment, air guns or rotary extraction arms on the silo bottom have been used, the load changes caused by these have to be examined with respect to the boundary state of fatigue, vibrations due to pneumatic transporting equipment are likewise to be taken into consideration.
(10)
In case of reconditioning of existing silos by putting a lining on the silo walls, the effects of
modified wall friction on silo dimensioning are to be considered,
including the possible effects of a flow profile that may have undergone a change.
5.5
DIMENSIONING CONDITIONS CAUSED BUY FLUIDS STORED IN TANKS
Loads on tanks caused by the fluids stored therein are to be calculated for the state of maximum fullness.
55
DIN 1055-6:2005-03 5.6
PRINCIPLES OF DIMENSIONING FOR EXPLOSIONS
(1)
As the liquids or bulk material stored in tanks or silos respectively may have a tendency to explode, the potential damage could be limited or avoided by means of the following measures:
--
Arrangement of adequate pressure relief areas
--
Arrangement of adequate explosion suppression systems
--
designing/dimensioning the structure for absorbing the explosive pressures
(2)
A few bulk materials which are prone to explosions are listed in Annex I.
(3)
The instructions given in Annex I for the explosion loads are to be followed. Further instructions including rules for dimensioning for dust explosions can be taken from DIN-Fachbericht 140.
(4)
The effects of silo structure dust explosions upon the surrounding structures or structural parts are to be taken into account.
6
BULK MATERIAL PARAMETERS
6.1
General (1)
For the estimation of silo loads the following influences have to be taken into account: the divergences from the bulk material parameters the fluctuations of the wall friction at the silo wall the silo geometry the filling and emptying processes
56
DIN 1055-6:2005-03
(2)
Influences which have a favourable impact upon the bulk material stiffness may not be taken into account while determining the loads and examining the stability of the wall. A positive impact of a wall deformation upon the pressures which develop in the bulk material may not be estimated, except if a reasonable and verified method of calculation can be proved.
(3)
If required, the manner of the flow profile (mass or core flow) is to be determined from figure 7. Figure 7 may be used on the grounds of simplifying hypotheses that have been taken as a basis - for example, the influence of internal friction is ignored – but may not be used for technical layout of silos.
NOTE
The layout of the silo geometry for a mass flow is beyond the scope of this standard. The
Co-efficient of wall friction in the hopper µh
methods and procedures specific to bulk material technology have to be used for this purpose.
(a) conical hopper 1.2 1
1
0.8
Series1
0.6 0.4
2
0.2 0 0°
20°
24°
40°
60°
Angle of inclination of hopper β
57
Co-efficient of wall friction in the hopper µh
DIN 1055-6:2005-03
(b) cuneiform hopper 1.2 1
1
0.8
2
0.6
Series1
0.4 0.2 0 0
20
40
60
80
Angle of inclination of hopper β
Legend 1
area with core flow
2
areas with the possibility of mass flow
Figure 7 – CONDITIONS UNDER WHICH PRESSURES CAUSED BY MASS FLOW ARISE 6.2
Bulk Material Parameters
6.2.1 General (1)
The material properties of the bulk material stored in the silos, which are to be
quantified for calculating the loads, are to be derived or obtained either as test results or as data in any other suitable form. (2)
While using values from test results and other sources of data, the same are to be
evaluated in a suitable manner keeping in mind the type of load in question in each case.
58
DIN 1055-6:2005-03 (3)
It should be kept in mind that there may be significant differences between the
material parameters measured in tests and the parameters that are determined by the actual behaviour of the bulk material in the silo. (4)
While evaluating the differences in bulk material parameters mentioned in (3), the
following are some of the factors that must be kept in mind: a lot of parameters are not constant, and may be dependant upon the stress level and the background of load application Influences on account of particle shape, sizes and distribution of grain size can have a strong impact on the test and the silo in a variety of ways. temporal influences fluctuations of the moisture content influences of dynamic actions brittleness or ductility of the tested bulk material the manner of putting-in the bulk material in the silo and in the testing apparatus (5)
While evaluating the differences in bulk material parameters mentioned in (3) with
ref. to the coefficients of wall friction, the following factors must be kept in mind: corrosion and chemical reaction of the bulk material particles, dampness and the wall abrasion and wear which can roughen or smoothen the wall of the silo
59
DIN 1055-6:2005-03
polishing of the wall surface accumulation of fat deposits on the wall particles which get impressed in the wall surface (usually an influence which leads to the roughening of the wall surface) (6)
While determining the values for the material parameters the following is to be
kept in mind: the facts regarding the application of the relevant tests should be wellpublicised and common knowledge a comparison of the values of the individual parameters which have been measured in the tests with the corresponding published parameters, taking into account the experimental values the deviation of the parameters relevant to the calculations the results obtained from the large scale measurements on silos of similar styles correlation of results from different types of tests perceptible changes in the material parameters during the period when the silo is in use (7)
The choice of the characteristic material parameters has to be made on the basis of values the have been determined through laboratory tests, with due regard for know-how acquired through experience.
60
DIN 1055-6:2005-03 (8)
The characteristic value of a material is to be chosen after a careful evaluation of
the value which has influenced the occurrence of the load.
CATEGORY
DESCRIPTION OF WALLSURFACE
TYPES OF MATERIAL Cold-rolled stainless steel Scarred stainless steel
D1
Polished
Polished stainless steel Galvanized carbon steel Aluminium Extruded high-density polyethylene Carbon steel with slight surface corrosion Coated carbon steel
D2
Smooth
Cast high-density polyethylene Smooth ceramic plates Concrete surface manufactured with steel shell Rough shell concrete Scarred carbon steel
D3
Rough
Steel silos with bolts on the inside surface of the wall Roughly polished ceramic plates Horizontal corrugated wall
D4
Corrugated
Contoured sheet metal with horizontal notches Non-standardised walls with large deviations
The effect of wrinkling in these surfaces has to be very carefully examined by means of the particles embedded in the wall surface. NOTE
The classification and description given in Table 3 refers to the friction
rather than the roughness. The main reason for this is that there is only a small correlation between the degree of roughness and the measured amount of wall friction caused by the bulk material that slides along the wall surface.
61
DIN 1055-6:2005-03
6.2.2 Determination of the Bulk Material Parameter (1)
The material parameters to be used for the design calculation may have deviations due to the changes in the structure, the production procedure, the grain size distribution, moisture content, age and electrical charging during handling; these need to be taken into account.
(2)
The bulk material parameters are to be determined either according to the simplified procedure laid down in 6.2.3 or by means of test measurements in accordance with 6.3.
(3)
Bulk materials parameters which are not contained in Table E.1 are to be obtained by means of test measurements in accordance with 6.3.
(4)
The calculated correction values for the coefficient of wall friction µ of the bulk materials should take into account the roughness of the wall surface along which they glide. In Table 3 the different classes of wall surfaces are defined for use in this standard.
(5)
For silos with wall surfaces belonging to the class (category) D4 according to Table 3, the effective wall friction coefficients should be determined according to the procedure described in D.2.
(6)
The bulk material correction value Cop for the reference surface loads is to be taken from Table E.1 or calculated according to the equation (8).
6.2.3 Simplified Procedure (1)
The parameters of commonly known bulk materials are to be taken from the Table E.1. The values given there for the specific gravity γ correspond to the upper
62
DIN 1055-6:2005-03 characteristic value, while the parameters for the wall friction µm, for the horizontal load ratio Km and for the angle of the internal friction φim represent mean values of these characteristic quantities. (2)
If individual bulk materials cannot be clearly classified under the bulk material categories listed in Table E.1, then their parameters are to be determined experimentally in accordance with the procedure described under 6.3
(3)
For determining the characteristic parameters of µ, K and φi, the listed values of µm, Km and φim are to be multiplied or divided by the so called conversion factor. The conversion factors ax are given in the table E.1 for the bulk materials listed therein. For calculating the maximum loads, the following combinations are to be used: Upper characteristic value of K = a k K m Lower characteristic value of K =
Km
ak
Upper characteristic value of µ = a µ µ m Lower characteristic value of µ =
µm
aµ
Upper characteristic value of ϕ i = aϕ ϕ im Lower characteristic value of ϕ i =
(4)
ϕ im
aϕ
(1) (2) (3) (4) (5) (6)
For determining the effect of action on silos of the requirement category 1, the
mean values µm, Km and φim may be used instead of the upper and lower characteristic values.
63
DIN 1055-6:2005-03
6.3
Measurement of Bulk Material Parameters in Tests
6.3.1 Experimental Determination (Measuring System) (1)
The experimental determination of the parameters is to be executed with
representative bulk material specimens. For every bulk material property a mean value of the relevant parameter is to be determined keeping in mind the deviation of its relevant so-called secondary influence parameter such as bulk material structure, filtering curve, moisture content, temperature, age and the possibility of electrical charging during operation or manufacture. (2)
The characteristic values are derived from the experimentally determined mean
values with the aid of equations (1) to (6) and the corresponding conversion factors ax. (3)
Each conversion factor ax is to be carefully determined. While determining the
same one should take into account the fact that the bulk material parameters can undergo a change during the service life of the silo. Likewise, the possible consequences of the sedimentation phenomena in the silo and the inaccuracies during processing of the material specimens are to be taken into account. (4)
If the test data is there, the conversion factors ax are to be ascertained acc. to
C.11 in order to determine the standard deviation of the parameters. (5)
The span between the mean value and the characteristic value of the bulk material
parameter is expressed by the conversion factor ax. If a secondary influence parameter is by itself responsible for more than 75% of the conversion factor ax, it has to be raised by a factor of 1.10. NOTE
The above-mentioned specifications serve to ensure that the values of xx adequately
represent the probability of occurrence for the derived loads.
64
DIN 1055-6:2005-03 6.3.2 Specific Gravity γ of the Bulk Material (1)
The specific gravity of the bulk material is to be determined for such a packing
density of the bulk material particles and at such a pressure-level, which corresponds to the packing density or the pressure level that is present in the zone of maximum vertical fill-pressure bzw in the silo. The vertical pressure Pvft can be determined from the equations (11) or (86) for the depth of the bulk material at the lower end of the silo shaft. (2)
For measuring the specific gravity γ the test procedures acc. to C.6 should be
used. (3)
The conversion factor for deriving the characteristic value from the measured
value is to be determined in accordance with the procedure described in C.11. The conversion factor aγ may not be less than aγ = 1.10, except when a smaller value can be separately established through tests or a suitable estimation (see C.11). 6.3.3 Coefficient of Wall Friction µ (1)
The experimental determination of the coefficients of wall friction µ for the
estimation of loads is to be determined for such a packing density of the bulk material particles and at such a pressure-level, which corresponds to the packing density or the pressure level that is present in the zone of maximum horizontal fill-pressure Phfb in the silo. The pressure level Phfb can be determined from the equations (9) or (78) for the depth of the bulk material at the lower end of the zone with vertical walls.
(2)
For measuring the coefficients of wall friction µ the test procedures acc. to C.7
should be used. (3)
The mean value µm of the coefficients of wall friction and its standard deviation are
to be determined and derived through tests. If only one mean value can be ascertained from the data material, the standard deviation is to be estimated in accordance with the method described in C.11. 65
DIN 1055-6:2005-03
(4)
The conversion factor for deriving the characteristic value from the measured
value is to be determined in accordance with the procedure described in C.11. The conversion factor may not be less than aµ = 1.10, except when a smaller value can be separately established through tests or a suitable estimation (see C.11). 6.3.4 Angle of Internal Friction ϕi (1)
The angle of internal friction ϕi for the calculation of loads is to be determined – as
arc tangents from the ratio of the shear force to the normal force at the break under equivalent load - for such a packing density of the bulk material particles and at such a pressure-level, which corresponds to the packing density or the pressure level that is present in the zone of maximum vertical fill-pressure Pvf. The pressure level Pvf can be determined from the equations (11) or (86) for the depth of the bulk material at the lower end of the zone with vertical walls. (2)
For measuring the angle of internal friction ϕi the test procedures acc. to C.9
should be used. (3)
The mean value ϕim of the angle of internal friction and its standard deviation δ are
to be determined and derived through tests. If only one mean value can be ascertained from the data material, the standard deviation is to be estimated in accordance with the method described in C.11. (4)
The conversion factor for deriving the characteristic value from the measured
value is to be determined in accordance with the procedure described in C.11. The conversion factor aϕ may not be less than aϕ = 1.10, except when a smaller value can be separately established through tests or a suitable estimation (see C.11).
66
DIN 1055-6:2005-03
6.3.5 Horizontal Load Ratio K (1)
The horizontal load ratio K for the estimation of loads (the ratio of mean horizontal
pressure to mean vertical pressure) is to be determined for such a packing density of the bulk material particles and at such a pressure-level, which corresponds to the packing density or the pressure level that is present in the zone of maximum vertical fill-pressure. The pressure level pvft can be determined from the equations (11) or (86) for the depth of the bulk material at the lower end of the zone with vertical walls. (2)
For measuring the horizontal load ratio K the test procedures acc. to C.8 should be
used. (3)
The mean value Km of the horizontal load ratio and its standard deviation are to be
determined and derived through tests. If only one mean value can be ascertained from the data material, the standard deviation is to be estimated in accordance with the method described in C.11. (4)
An approximate value for Km can be alternatively calculated according to the foll.
Equation (7) from the mean value of the angle of internal friction for first load application
ϕ im determined through tests (see 6.3.4) Km = 1.1 (1- sin ϕim) NOTE
(7)
The factor 1.1 in equation (7) is used in order to ensure an appropriate derivative
unit of measure for making allowance for the difference between a value of K (= Ko ) that was measured under virtually absent wall-friction influences and a value of K that was measured in the presence of wall friction influences (see also 6.2.2 (5)).
67
DIN 1055-6:2005-03
(5)
The conversion factor for deriving the characteristic value from the measured
value is to be determined in accordance with the procedure described in C.11. The conversion factor aK may not be less than aK = 1.10, except when a smaller value can be separately established through tests or a suitable estimation (see C.11).
6.3.6 Cohesion c (1)
The cohesion of bulk material varies with the consolidation stress to which the
specimen is subjected. It is to be determined for such a packing density of the bulk material particles and at such a pressure-level, which corresponds to the packing density or the pressure level that is present in the zone of maximum vertical fill-pressure Pvf. The pressure level Pvf can be determined from the equations (11) or (86) for the bulk material depth at the lower end of the zone with vertical walls. (2)
For measuring the cohesion c the test procedures acc. to C.9 should be used.
NOTE
Alternatively the cohesion can be estimated by means of results of tests in the shear cells
of Janike. A method for calculating the cohesion from test results is to be taken from C.9.
6.3.7 Bulk material Correction Value for the Reference Surface Load Cop (1)
The bulk material correction value for the reference surface load Cop is to be
estimated on the basis of suitable test data. NOTE 1
The discharge factors C make allowances for a host of phenomena which arise during the
emptying of silos. The symmetric increase of pressures is relatively independent of the stored bulk material, yet the unsymmetric components are greatly dependant upon the material. The material-dependency of the unsymmetric components is represented by the bulk material correction value Cop . This parameter is not easy to determine with the help of experimental test procedures.
68
DIN 1055-6:2005-03 NOTE 2
A suitable experimental test procedure for the parameter Cop has not so far been
developed. This factor is therefore based on evaluations of tests on silos and on experimental values of silos with conventional filling and discharge systems, which were established within the usual structural tolerances.
(2)
Values for the bulk material correction values for the reference surface load Cop of
commonly known bulk materials are to be taken from Table E.1. (3)
For materials which are not listed in Table E.1, the bulk material correction value
for the reference surface load can be estimated from the divergence factors for the horizontal load ratio aK and the wall friction correction value aµ acc. to equation (8): Cop = 3.5 aµ = 2.5 aK – 6.2 Where aµ
divergence factor for the coefficients of wall friction µ;
aK
divergence factor for the horizontal load ratio K of the bulk Material.
(4)
For special silos or special bulk materials (in the individual case) the suitable bulk
material correction value for the reference surface load Cop can be estimated by means of large scale experimental investigations in silos with designs that are comparable.
7
LOADS ON VERTICAL SILO WALLS
7.1
General
(1)
For the filling and the emptying types of loads, the characteristic values of the
loads described in this section have to be fixed. For this purpose the loads are differentiated as follows:
69
DIN 1055-6:2005-03 slim silos silos of medium slimness low silos braced walls silos (silos consisting of braced walls) silos for the storage of bulk materials air pockets between the bulk material particles (for example, due to pneumatic discharge aids and homogenizing silos) silo hoppers and silo bottoms (2)
The loads on the vertical silo walls are to be determined in accordance with the
following criteria pertaining to the slimness of the silos: slim silos, with 2.0 < hc / dc (with exceptions acc. to 5.3) silos with medium slimness, with 1.0 < hc / dc < 2.0 (with exceptions acc. to 5.3) low silos, with, 0.4 < hc / dc < 1.0 (with exceptions acc. to 5.3) braced wall silos (silos consisting of braced walls) with horizontal bottoms and hc / dc < 0.4 silos for bulk materials with air pockets between the bulk material particles (3)
A silo with an aerated bottom is to be handled – independent of its actual slimness
hc/ dc -- like a slim silo. (4)
The loads on the vertical walls are made up of a stationary load component, the
symmetrical loads and a free load component, the reference surface loads. Both the components are to be assessed as acting simultaneously. (5)
Special types of loads are to be taken into account for large fill and discharge
eccentricities. These are not to be placed simultaneously with the symmetrical and reference surface loads; each represents a separate and clearly defined load category.
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DIN 1055-6:2005-03
(6)
Detailed guidelines for the calculation of fill and discharge loads are given within
the context of silo slimness in sections 7.2, 7.3 and 7.4. (7)
Rules for the additional types of loads for special types of silos and special design
conditions are given in 7.5 till 7.7: see 7.5 for silos with air injection equipment for complete or partial fluidization of bulk material see 7.6 for loads due to hot-filled bulk materials see 7.7 for loads in rectangular silos (8)
For circular silos with large fill and discharge eccentricities, load estimates are
given in 7.2.4. For non-circular silo bins corresponding load estimates should be derived from these load estimates, if they are found to be suitable for design calculations. (9)
If
funnel flow can be ensured within the bulk material without contact points
between the flow zone and the silo walls (see 5.3 (4)), the calculations can be limited to the estimates of the filling loads, in which case the reference surface loads are to be taken into account along with these, if required.
7.2
Slim Silos
7.2.1 Fill Loads on Vertical Walls
7.2.1.1 (1)
Symmetric Fill Loads
The symmetric fill loads (see figure 8) are to be calculated acc. to the equations
(9) to (14).
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DIN 1055-6:2005-03
(2) After the filling is done and during the storage of the bulk material, the horizontal loads Phf, the wall friction loads Pwf and the vertical loads Pvf are to be estimated as follows:
Phf (z) = PhoYj (z)
(9)
Pwf (z) = µPhoYj (z)
(10)
Pvf ( z ) =
Pho Y j (z ) K
(11)
With
Pho = γKzo
(12)
1 A Kµ U
(13)
zo =
−z
Yj (z) =1 − e
zo
(14)
Where
γ
The characteristic value of the bulk material specific gravity
µ
The characteristic value for the coefficients of wall friction for the bulk material at the vertical silo walls
72
DIN 1055-6:2005-03 K
The characteristic value of the horizontal load ratio
z
The depth of the silo material beneath the equivalent surface of the bulk material
(3)
A
The inner cross-sectional area of the silo
U
The circumference of the inner cross-sectional area of the silo
For the status after the filling is done, the resultant characteristic value of the wall
friction loads Pwf that have been added-up up till depth z – with the force per unit of length in the direction of the circumference e.g. [kN/M] – is calculated using:
z
[
]
Pwf = ∫ Pwf (z)dz = µPho z − zoYj (z)
(15)
0
(4)
For determining the characteristic values for the required bulk material parameters
(specific gravity (γ), correction value for wall friction µ and horizontal load ratio K), the values given in 6.2 and 6.3 are to be used.
7.2.1.2
Reference Surface Load for Filling Loads: General Requirements
(1)
For making an allowance for unplanned unsymmetrical loads due to eccentricities
and imperfections during the filling of the silos, reference surface loads or other suitable load arrangements are to be placed. (2)
For silos of category 1 the reference surface load can be ignored for the filling
loads.
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DIN 1055-6:2005-03
1
Phf
z Phf
Pvf Pwf
Pwf
hc
z1
Legend 1
equivalent bulk material surface
Figure 8 – SYMMETRIC FILLING LOADS NEAR THE VERTICAL SILO WALLS
3)
For silos in which powdery bulk material is stored and which are filled with the help
of air injection equipment, the placing of reference surface loads for the filling loads can, as a rule, be done away with. (4)
The amount of reference surface load to be placed for the filling loads Ppf is to be
estimated on the basis of the maximum possible eccentricity ef the filled cone that appears at the surface of the bulk material (see fig. 1b). (5)
The fundamental value of the reference surface load for the filling load Ppf is to be
fixed with:
Ppf = C pf Phf
(16)
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DIN 1055-6:2005-03
With: ⎛ ⎡ h ⎤ ⎞ ⎛ ⎜ −1.5 ⎢ ⎛⎜ c d ⎞⎟ ⎥ −1 ⎟ ⎞ C pf = 0.21Cop 1 + 2 E 2 ⎜1 − e⎝ ⎣ ⎝ c ⎠ ⎦ ⎠ ⎟ ⎜ ⎟ ⎝ ⎠
(
E=
)
2e f
(17)
(18)
dc
But C pf > 0
(19)
Where Is the maximum eccentricity of the filled cone which appears at the
ef
Bulk material surface during filling; Is the local value of the horizontal fill pressure acc. to equation (9) at
Phf
the position at which the reference surface load is placed Is the correction value of the bulk material for the reference surface
Cop
load (see table E.1). (6)
The height of the zone at which the reference surface load is to be placed (see figures 9 and 10) amounts to:
s=
(7)
πd c 16
≈ 0.2d c
(20)
The reference surface load consists of only a horizontally acting load component. There are no frictional forces to be taken into account as a result of these horizontal load components.
75
DIN 1055-6:2005-03 (8)
The form of the reference surface load for the filling loads depends upon the structural design of the silo. The following structural designs of silos can be distinguished with respect to the reference surface load to be placed: --
Thick walled silos with circular cross-section see figure7.2.1.3 (e.g. reinforced concrete silos);
--
thin walled silos with circular cross sections, see figure 7.2.14 (e.g. metal silos without braces);
--
Silos with non-circular cross-sections, see 7.2.1.5
Ppfs
S
θ
Ppf
Ppf1
Ppf
S
Ppf
Ppf S
Ppf b) other circular silo
a
zp
a) Thin walled circular silo
hc
h
s
hp
S b
Figure 9 - Longitudinal Section and Transverse Section Showing the Load Diagrams of the Reference Surface Loads
76
DIN 1055-6:2005-03
Ppe,nc
Ppf,nc
a
S
Ppe,nc
Ppe,nc hc
a
hc
S
Ppf,nc
ppf,nc
]
Legend a
smaller value of zo and hc/2
b
as per choice
Figure 10 – LONGITUDNAL SECTION AND TRANSVERSE SECTION SHOWING THE LOAD DIAGRAMS OF THE REFERENCE SURFACE LOADS FOR NON-CIRCULAR SILOS
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DIN 1055-6:2005-03
7.2.1.3 (1)
Reference Surface Load for Filling Loads: Thick-Walled Circular Silos For thick-walled circular silos of the categories 2 and 3, the fundamental value of
The reference surface load for the filling load Ppf is to be estimated as it acts outwards Along the opposite sides of a quadratic reference surface with the side length s (see equation (20)). The unit of measurement for the side length s should be applied to the curved surface in a suitable manner. 2)
In addition to the reference surface load Ppf that acts outwards, a complementary
Reference surface load Ppfi that is directed inwards is to be placed in the remaining portion of the silo circumference above the same wall-height (see fig. 9b):
Ppfi =
P pf 7
(21)
Where
Ppf is the fundamental value of the reference surface load acting outwards for the filling loads acc. to equation (16) NOTE
The amount and the impact area of the load Ppfi which is directed inwards are chosen such that the resultants of both the load components counterbalance each other in the middle at the position at which these are to be placed.
(3)
The reference surface load for the filling loads is to be placed at any
position on the silo wall. However it may be placed in accordance with the manner described in 7.2.1.3(4). (4)
In thick-walled circular silos of category 2, a simplified proof may be furnished.
Half the height of the vertical bin shaft may be regarded as the most unfavourable Position for placing the reference surface load. The largest percentage increase of the dimensioning sections which result from the placing of reference surface loads at this
78
DIN 1055-6:2005-03
position can be carried over to the other areas of the wall by multiplying over there the design sectional sizes with the value of the ratio between the horizontal fill pressure at the observed position and the horizontal fill pressure at the position where the reference surface load was placed.
7.2.1.4
Reference Surface Load for the Filling loads: Thin-Walled Circular Silos
(1) For thin-walled circular silos (dc/t > 200) of the categories 2 and 3 the reference surface load for the filling loads has to be placed above the height s acc. to equation (20). It changes from a maximum pressure with the quantity ppf that acts outwards at a particular point, into a maximum inwards-acting pressure with the same quantity ppf at the opposite side (see figure 9a). The progression in the circumferential direction is to be estimated with:
Ppfs = Ppf cosθ
(22)
Where
(2)
Ppf
is the reference surface load acting outwards acc. to equation (16)
θ
is the angle coordinate in the circumferential direction (see fig. 9a).
The horizontal load Fpf that results from the reference surface load of the filling
loads is to be calculated for circular silos acc. to equation (23):
Fpf =
(3)
π 2
sd c Ppf
(23)
For welded silos of category 2, the reference surface load can be placed as active
load in a depth zp beneath the bulk material surface. For zp the smaller of the following values is decisive: zp = zo Where,
and zp = 0.5 hc
(24)
hc is taken as the height of the vertical silo shaft (see fig. 1a).
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DIN 1055-6:2005-03
(4)
For silos with screw and bolt connections of category 2, the reference surface
loads the reference surface load is to be placed at any position as active load.
7.2.1.5 (1)
Reference Surface Load for Filling Loads: Non-Circular Silos
For non-circular silos of categories 2 and 3, one can make allowance for
the reference surface loads of the fill type by an increase of the symmetrical loads acc. to (2) and (3). (2)
The reference surface load in the outward direction is to be positioned at each
point and depth in the silo as a stripe-shaped band with the band width s (acc. to equation (20)) (see fig. 10a) (3)
The quantity of the uniform reference surface load Ppf , nc is to be estimated using:
Ppf , nc = 0.36 Ppf
(25)
Where Ppf represents the fundamental value of the reference surface load of the fill type acc. to equation (16). A suitable estimate for dc is to be derived from fig. 1d. NOTE
The value and the extent of the uniform load Phf , n are so chosen that the resultant
bending moments for a silo with rectangular cross-section and without internal braces will take on approximately the same order of magnitude as would result in the case of placing a local reference surface load Ppf in the middle of the wall.
80
DIN 1055-6:2005-03 7.2.2
Discharge Loads on Vertical Walls
7.2.2.1
Symmetric Discharge Loads
(1)
To make allowance for possible short-term load-increases during the discharge
process, an increase of the symmetric load components in the discharge loads is to be made. (2)
For silos of all categories the symmetric discharge loads xx and xx are to be
determined from:
Phe = Ch Phf
(26)
Pwe = Cw Pwf
(27)
Where
Ch
is the discharge factor for horizontal loads;
Cw
is the discharge factor for wall friction loads;
The emptying factors Ch and Cw are to be estimated for each case present from the equations (28) up till (32). (3)
For silos of all categories which are emptied at the surface of the bulk material
(and therefore do not show any flow within the stored bulk material), the values from xx and xx can be taken as
Ch = Cw = 1.0 (4)
(28)
For slim silos of categories 2 and 3, the discharge factors are to be estimated
using:
Ch = 1.15
(29)
Cw = 1.10
(30)
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DIN 1055-6:2005-03
(5)
For slim silos of category 1, for which the mean values of the bulk material
parameters K and µ are used for load determination, the following values are to be taken as discharge factors: Ch = 1.15 + 1.5⎛⎜1 + 0.4 e ⎞⎟Cop dc ⎠ ⎝
(31)
Cw = 1.4⎛⎜1 + 0.4 e ⎞⎟ dc ⎠ ⎝
(32)
e = max (e f , eo )
(33)
Where is the maximum eccentricity of the filled cone which appears during
ef
filling at the bulk material surface (see fig 1b);
eo
is the eccentricity of the midpoint of the discharge outlet;
Cop
is the bulk material correction value for the reference surface load (see Table E.1)
(6)
For the discharge type load the resultant characteristic value of the wall friction
loads Pwe which have been added-up up to the depth z – with the force per unit length for the circumferential direction of the wall, e.g. [kN/m] – is derived from:
z
[
]
pwe = ∫ pwe ( z )dz = Cw µPho z − zoY j ( z )
(34)
0
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DIN 1055-6:2005-03 7.2.2.2 (1)
Reference Surface Load for Discharge Loads: General Requirements Reference surface loads for the discharge loads are to be estimated in order to
make allowances for the unplanned unsymmetric loads during emptying of the silo on the one hand and the eccentricities during filling and emptying on the other (see fig. 1b). (2)
For silos of category 1, the reference surface load of the discharge type may be
ignored. (3)
For silos of categories 2 and 3 the procedures described in this section are to be
used for estimating the discharge loads. (4)
For silos of categories 2 and 3 the load estimates for slim silos (7.2.4) with large
discharge eccentricities (see 7.1 (5)) are to be used as a separate load-type, in addition to the procedures described in this section, if the following conditions apply: the eccentricity of the discharge outlet eo is larger than the critical value
eo , cr = 0.25d c (see fig. 4c); The maximum eccentricity during filling e f is larger than the critical value ⎛h ⎞ e f , cr = 0.25d c and the silo slimness is greater than the limit value ⎜⎜ c ⎟⎟ ⎝ d c ⎠lim
=4.0 (see fig. 5d). (5)
The fundamental value of the outwardly-directed reference surface load for the
discharge type load Ppe is to be fixed with:
p pe = C pe Phe
(35)
83
DIN 1055-6:2005-03 With C pe
⎛ ⎡ h ⎤⎞ ⎛ ⎜ −1.5 ⎢ ⎛⎜ c d ⎞⎟ −1⎥ ⎟ ⎞ c ⎠ ⎦⎠ ⎟ ⎣⎝ ⎝ ⎜ = 0.42Cop 1 + 2 E 1 − e ⎜ ⎟ ⎝ ⎠
E=2
But
(
2
)
e dc
(36)
(37)
⎡⎛ h ⎤ ⎞ ⎛h ⎞ C pe ≥ 0.272Cop ⎢⎜⎜ c − 1⎟⎟ + E ⎥ ≥ 0 for ⎜⎜ c ⎟⎟ ≤ 1.2 ⎠ ⎝ dc ⎠ ⎣⎝ d c ⎦
(38)
e = max (e f , eo )
(39)
Where
ef
Is the maximum eccentricity of the filled cone which appears at the bulk material surface during filling (see fig 1b);
eo
Is the eccentricity of the midpoint of the outlet opening;
Phe
Is the local value of the horizontal discharge pressure acc. to equation (26) at the position at which the reference surface load is placed
Cop
is the correction value of the bulk material for the reference surface load (see Table E.1)
(6)
The reference surface load for the discharge type load consists of only one
horizontally acting load component. Additional frictional forces due to this horizontal load are to be disregarded. (7)
The form of the reference surface load for the discharge type load depends upon
the structural style of the silo. This standard refers to the following structural styles of the silos with respect to the reference surface loads to be assessed:
84
DIN 1055-6:2005-03 Thick-walled silos with circular cross-sections see. 7.2.2.3 (reinforced concrete silos); thin-walled silos with circular cross-sections, see 7.2.2.4 (metal silos); Silos with non-circular cross-sections, see 7.2.2.5.
7.2.2.3
Reference Surface Load for Discharge Loads: Thick-Walled Circular Silos
(1)
For thick-walled circular silos, the fundamental value of
The reference surface load for the discharge type load Ppe (see equation (20)) is to be Assessed as it acts outwards along the opposing sides on a quadratic reference Surface with the side length s, in accordance with the illustration in fig. 11b (2)
In addition to the reference surface load Ppe that acts outwards, a complementary
Reference surface load Ppei that is directed inwards is to be placed in the remaining portion of the silo circumference above the same wall-height (see fig. 11b):
Ppei =
Ppe
7
(40)
Where
Ppe is the fundamental value of the reference surface load acting outwards acc. to equation (35)
NOTE
The amount and the impact area of the load Ppei which is directed inwards are chosen such that the resultants of both the load components counterbalance each other in the middle at the position at which these are to be placed.
(3)
The reference surface load for the discharge type load is to be placed at any
position on the silo wall. However this is to be laid out in the manner described in 7.2.2.3(4).
85
DIN 1055-6:2005-03 (4)
In thick-walled circular silos of category 2 a simplified proof may be furnished.
Half the height of the vertical bin shaft may be regarded as the most unfavourable position for placing the reference surface load. The percentage increase of the dimensioning sectional sizes due to the placing of reference surface loads at this position can be carried over to the other areas of the wall by multiplying over there the sectional sizes with the value of the ratio between the horizontal fill pressure at the observed position and the horizontal fill pressure at the position where the reference surface load was placed.
Ppe1 Ppes Ppe
θ
Ppe
Ppe
Ppe S
S
hc
h
a
zp
Ppe S
a) Thin walled circular silo
b
hp
S
b) other circular silo
Legend a
smaller value of Zp and ho /2
b
any
Figure 11: Longitudinal Section and Transverse Section Showing the Load Diagrams of the Reference Surface Loads during Discharge
86
DIN 1055-6:2005-03
7.2.2.4
Reference Surface Load for Discharge Loads: Thin-Walled Circular Silos
(1)
For thin-walled circular silos (
dc > 200 ) of the categories 2 and 3 the reference t
surface load for the filling loads has to be placed above the height s acc. to equation (20). It changes from a maximum pressure with the quantity Ppe that acts outwards at a particular point, into a maximum inwards-acting pressure with the same quantity Ppe at the opposite side (see figure 11a). The progression in the circumferential direction is to be estimated with:
Ppes = Ppe cosθ
(41)
Where
(2)
Ppe
Is the reference surface load acting outwards acc. to equation (35)
θ
Is the angle co-ordinate in the circumferential direction (see fig. 11a).
The horizontal load Fpe that results from the reference surface load of the filling
loads is to be calculated for circular silos acc. to equation (42):
Fpe =
(3)
π 2
(42)
sd c Ppe
For welded silos of category 2, the reference surface loads can be placed as
active load in a depth Z p beneath the bulk material surface. For Z p the smaller of the following values is to be fixed:
Z p = Zo
and
Z p = 0.5hc
(43)
Where the height of the vertical silo shaft is to be put for hc (see fig. 1a)
87
DIN 1055-6:2005-03
(4)
For silos with screw and bolt connections of category 2, the reference surface
loads the reference surface load is to be placed at any position as active load. Alternatively, the procedure in 7.2.3 can be used.
7.2.2.5
Reference Surface Load for Discharge Loads: Non-Circular Silos
(1)
For non-circular silos of categories 2 and 3, one can make allowance for
The reference surface loads of the fill type by an increase of the symmetrical loads acc. to (2) and (3) (2)
The reference surface load in the outward direction is to be positioned at each
point and depth in the silo above a height s (acc. to equation (20)) (see fig. 10b) (3)
The amount of the uniform reference surface load Ppe, nc is to be assessed using:
Ppe, nc = 0.36 Ppe
(44)
Where Ppe represents the fundamental value of the reference surface load of the discharge type acc. to equation (35). A suitable estimate for d c is to be derived from fig. 1d. NOTE
The value and the extent of the uniform load Phe , n are so chosen that the resultant bending
moments for a silo with rectangular cross-section and without beam ties will take on approximately the same order of magnitude as would result in the case of placing a local reference surface load Ppe in the middle of the wall.
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DIN 1055-6:2005-03
7.2.3 UNIFORM INCREASE OF LOADS AS REPLACEMENT FOR THE REFERENCE SURFACE LOADS – FILL LOAD AND DISCHARGE LOADS – FOR CIRCULAR SILOS (1)
In circular silos of category 2 the procedure, using reference surface loads given in 7.2.1 and 7.2.2, for taking into account the unsymmetries in case of filling and discharge can be approximately replaced by increasing the loads.
(2)
In circular silos the following processes can be used only if the vertical silos are designed such that they have adequate stiffness at their upper and lower ends to withstand horizontal deformations and an adequate lateral distribution is ensured. The upper end and the foot of the silo cylinder shell must be supported along its circumference against the roof or a ring brace with a structural joint.
(3)
For thick-walled circular silos the resulting horizontal loads in case of filling
p hf ,u and in case of emptying p he,u are to be calculated using
phf ,u = phf (1 + ςC pf )
(45)
p he,u = p he (1 + ςC pe )
(46)
ς = 0.5 + 0.01(dc t)
(47)
With
And
ς ≥ 1.0
(48)
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DIN 1055-6:2005-03
Where
p hf is the symmetrical horizontal load after filling acc to equation (9) p he is the symmetrical horizontal load during emptying acc to equation (26) C pf is the correction value for the reference surface load in case of filling acc to equation (17)
C pe is the correction value for the reference surface load in case of emptying acc to equation (36) (4)
For thin -walled circular silos the resulting horizontal loads in case of filling p hf ,u and in case of emptying p he,u and the wall friction loads p wf ,u and p we,u which result from these loads are to be calculated using
phf ,u = phf (1 + 0.5Cpf )
(49)
pwf ,u = pwf (1+ 0.5Cpf )
(50)
phe,u = phe (1 + 0.5Cpf )
(51)
pwe,u = pwe (1 + 0.5C pf )
(52)
Where
pwf is the symmetrical horizontal load in case of filling acc to equation (10) pwe is the symmetrical horizontal load in case of emptying acc to equation (27)
The parameters p hf , p he , C pf and C pe are to be calculated using the procedure given in (3).
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DIN 1055-6:2005-03
7.2.4.
DISCHARGE
LOADS
FOR
CIRCULAR
SILOS
WITH
LARGE
ECCENTRICITIES DURING DISCHARGE
7.2.4.1 (1)
General
For silos of categories 2 and 3, if the eccentricity of the outflow opening eo is larger than the critical value eo ,cr = 0.25d c , then the following procedures are to be adopted for determination of the load distribution in order that allowance can be made for an eccentric discharge in the form of a funnel flow above the outflow opening (see fig 12a)
(2)
For silos of categories 2 and 3, if the maximum eccentricity during filling e f is larger than the critical value e f ,cr = 0.25d c , and the silo slimness larger than
hc
dc
= 4.0 , then the following procedures are to be adopted for determination
of the distribution of pressure in the silo. This pressure distribution can arise as a consequence of the build-up of an external funnel flow (see figures 5d and 12 a). (3)
In case it is necessary to use the procedure given in 7.2.4.2 and 7.4.2.3, these are to be treated as separate load-types in addition to the filling and discharge loads and the estimates of the reference surface loads in 7.2.2 and 7.2.3.
(4)
The estimation of these loads is to be made using the lower characteristic value of the wall friction µ and the upper characteristic value of the angle of internal friction ϕ i .
(5)
For silos of category 2 a simplified procedure is allowed acc to 7.2.4.2. For silos of category 3, the procedures in 7.2.4.3 are to be adopted.
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DIN 1055-6:2005-03
7.2.4.2
Procedure for Silos of Category 2
7.2.4.2.1
Geometry of the Flow Canal
(1)
For silos of category 2 the calculations must be made only for that volume of the flow canal which is in contact with the silo wall. The volume of the flow zone in such case is to be determined through the value of the angle
θ C = 35 0 7.2.4.2.2 (1)
(53)
Wall Pressures during Eccentric Discharge
In the flow zone the horizontal loads on the vertical wall (see fig 12c) are to be taken as
Phce = 0 (2)
(54)
In that area in which the bulk material is at rest, the horizontal loads on the vertical silo walls at depth z (see fig 12c) are to be estimated using
Phse = Phf
(55)
Phae = 2 Phf
(56)
and the wall friction load at the wall at depth z:
Pwse = Pwf
(57)
Pwae = 2 Pwf
(58)
Where
Phf
is the horizontal load ratio in case of filling acc to equation (9)
Pwf
is the wall friction load in case of filling acc to equation (10)
NOTE
This simplified procedure corresponds to an ‘empty’ funnel and is very conservative.
(3)
Alternatively the procedures in 7.2.4.3.2 can also be used.
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DIN 1055-6:2005-03
7.2.4.3
Procedure for Silos of Category 3
7.2.4.3.1
Geometry of the Flow Canal
(1)
The geometry and the position of the flow channel are to be chosen such that adequate allowance is made for the geometry of the silo, the discharge-conditions and the bulk material properties.
(2)
If the conditions for discharge lead to the build-up of a flow channel with a clearly defined geometry and position, then the parameters which can be derived from this flow channel should be adopted for further use.
(3)
If the geometry of the flow channel cannot be directly derived from the arrangement of the outflow openings and the silo geometry, calculations must be made with at least three different flow channel radii rc , in order to make allowance for the any chance that the volume of the flow channel may change with the passage of time. The following three values should be considered:
rc = 0.5r
(59)
rc = 0.75r
(60)
rc = 0.9r
(61)
Where
r is the radius =
dc
2
of the circular silo
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DIN 1055-6:2005-03
3 1 1
4 2 2 5
a) Front view
b) cross-section
a) Flow channel and reverse distribution 3
ph r
ψ
6
phae
θc
1
θc rc
phce
θc
θ
5
ec
b) Geometry of the flow channel
Legend
1
bulk material at rest
2
flow channel
3
loads in the static zone
4
local high loads
5
loads in the flow zone
6
flow channel-margin loads
loads varying with the depth of the silo
Figure 12 – FLOW CHANNEL AND PRESSURE DISTRIBUTION IN CASE OF DISCHARGE WITH LARGE ECCENTRICITIES
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DIN 1055-6:2005-03
(4)
The eccentricity of the flow channel can be worked out by:
{
ec = r η (1 − G ) + (1 − η ) 1 − G
rc
With
G=
And
η = µ tan ϕ i
r
}
(62) (63) (64)
Where
µ
is the lower characteristic value of the coefficient of wall friction for the vertical silo wall
ϕi
is the upper characteristic value of the angle of internal friction of the stored bulk material
rc
is the dimensioning value of the flow channel radius acc to equations (59) to (61)
NOTE 1
It must be emphasized that ϕ w ≤ ϕ i is always given, because
otherwise a sliding surface would build up within the bulk material. This means that in equation (64) η ≤ 1 always.
NOTE 2
As indicated in fig 5d the eccentricity of the flow channel ec can vary. It is
not solely and exclusively dependant upon the eccentricity of the outflow opening. The given procedure intends to make allowance for all those situations which could lead to the most unfavourable ratios possible in each silo geometry and in each structural arrangement. The eccentricity of the flow channel can, in effect, therefore be smaller than the critical filling eccentricity ecf ,cr and the critical discharge eccentricity eco,cr .
NOTE 3
This estimate of the position and volume of the flow channel is based upon
the principle of minimizing the frictional resistance of the bulk material at the peripheral surface of the flow channel based on the simplistic assumption that the
95
DIN 1055-6:2005-03 circumference of the flow channel is a circular curve. Other suitable procedures for the determination of the circumference of the flow channel may also be used. (5)
Apart from the flow channel geometries mentioned in (3), in case of a hopper for
“expanded flow” (see fig 6d) one has to consider the additional possibility of a flow channel with a radius equivalent to the radius of the silo cross-section at the upper end of the hopper for “expanded flow”. (6)
The limitation of the contact surface between the flow channel and the silo wall is
defined in terms of the angle at circumference θ = ±θ c , where: cos θ c =
(7)
(r
2
+ ec − rc 2
2
)
(65)
2rec
The curve-length of the contact surface between the flow channel and the wall is:
U wc = 2θ c r
(66)
And the curve-length of the contact surface between the flow channel and the bulk material which is in a state of rest is:
U sc = 2rc (π − ψ )
(67)
r sin θ c rc
(68)
Where
sinψ =
And the two angles θ c and ψ are to be put in radian measure. (8)
The cross-section of the flow channel is to be calculated as follows:
A c = (π − ψ )rc + θ c r 2 − rr c sin (ψ − θ c ) 2
(69)
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DIN 1055-6:2005-03
7.2.4.3.2 (1)
Wall Loads during Discharge with Large Eccentricities
The horizontal loads on the vertical walls in the flow channel zone (see fig 12c) are
dependant upon the depth z beneath the equivalent bulk material surface and can be calculated in acc with: − ⎛ p hce = µ p hco ⎜ 1 − e ⎝
z
z oc
⎞ ⎟ ⎠
(70)
The wall friction loads acting upon the walls at depth z can be determined by: − z ⎛ ⎞ p wce = µ p hce = µ p hco ⎜ 1 − e z oc ⎟ ⎝ ⎠
(71)
With
p hco = γKz oc z oc =
Ac 1⎛ ⎜⎜ K ⎝ U wc µ + U sc tan ϕ i
(72) ⎞ ⎟⎟ ⎠
(73)
Where
µ
is the coefficient of wall friction in the area of the vertical wall
K
is the horizontal ratio of the bulk material.
(2)
The horizontal loads on the silo walls at depth z in the area outside the flow zone
where the bulk material is in a state of rest are to be calculated using
p hse = p hf
(74)
And the wall friction loads upon at depth z:
p wse = p wf
(75)
Where
phf
is the horizontal loads in case of filling loads in acc with equation (9)
pwf
is the wall friction loads in case of filling loads in acc with equation (10)
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DIN 1055-6:2005-03
(3)
Higher loads act directly upon the vertical silo walls (see fig 12c) in the passage
leading from the flow zone to the area where the bulk material is in a state of rest. These outward-acting horizontal loads next to the flow channel at depth z beneath the equivalent surface of the bulk material are to be estimated using:
p hae = 2 p hf − p hce
(76)
And the accompanying wall friction loads corresponding to these, upon the wall at depth z are to be estimated using:
p
7.3
wae
= µ p hae
(77)
Low Silos and Silos with Medium Slimness
7.3.1 Fill Loads on the Vertical Walls
7.3.1.1 Symmetric Fill Loads (1)
The symmetric fill loads (see figure 13) are to be calculated acc. to the equations
(78) to (87). (2)
The values for the horizontal loads Phf and the wall friction loads Pwf for the fill type loads are to be fixed at each position as follows:
Phf = PhoYR ( z )
(78)
Pwf = µPhf
(79)
With:
Pho = γKzo = γ
1 A = µU
⎡ ⎧⎛ z − h ⎞ ⎫n ⎤ o ⎟ + 1⎬ ⎥ Yr ( z ) = ⎢1 − ⎨⎜⎜ ⎢ ⎩⎝ zo − ho ⎟⎠ ⎭ ⎥ ⎦ ⎣
(80)
(81)
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DIN 1055-6:2005-03
zo =
1 A Kµ U
(82)
⎛ h ⎞ n = −(1 + tan ϕ r )⎜⎜1 − o ⎟⎟ ⎝ zo ⎠
(83)
Where
ho
is the vertical distance between the equivalent bulk material surface and the highest contact point of the stored bulk material with the wall (see fig. 1a and 13)
The quantity ho is to be measured as:
r ho = tan ϕ r 3
for a symmetrically filled circular silo
(84)
And as
ho =
dc tan ϕ for a symmetrically filled rectangular silo (85) 3
Where
γ
Characteristic value of the bulk material specific gravity
µ
Characteristic value for the coefficients of wall friction between the bulk material and the vertical silo walls
K
is the characteristic value of the horizontal load ratio of the stored bulk material
z
is the depth beneath the equivalent surface of the bulk material
A
is the inner cross-sectional area of the vertical silo
U
is the inner circumference of the cross-section of the vertical silo
ϕr
Is the gradient of slope of the bulk material (see Table E.1)
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DIN 1055-6:2005-03
(3)
The amount of the vertical load Pvf at a depth of zv is to be fixed for the fill type load
using:
Pvf = γzv
(86)
n +1 ( z − zo − 2ho ) ⎞ 1 ⎛ ⎜z −h − ⎟ zv = ho − (n + 1) ⎜⎝ o o (zo − ho )n ⎟⎠
(87)
Where
G
1
ho
z
2 3
Legend 1
equivalent bulk material surface
2
silo loads as per the rules for slim silos
3
loads for low silos
Figure 13 – LOADS IN A LOW SILO OR SILO OF MEDIUM SLIMNESS AFTER FILLING (FILL LOADS)
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DIN 1055-6:2005-03 (4)
For the fill load the resultant characteristic value of the wall friction loads Pwf which
have been added up to a bulk material depth z – with the force per unit length in the circumferential direction of the wall, e.g. [kN/m] – is calculated using:
z
Pwf = ∫ Pwf ( z )dz = µPho ( z − zv )
(88)
0
With zv acc. to equation (87)
7.3.1.2 (1)
Reference Surface Load for Fill Loads
The fill type of reference surface loads Ppf are to be fixed at each point in the
vertical projection of the silo as allowance for unplanned loads and small filling eccentricities (see figure 1b) (2)
Details for determining the form, the position and the amount of the reference
surface load for fill loads are to be taken from the regulations in 7.2.1 (3)
The reference surface load consists of only one horizontally acting load component.
There are no additional friction loads to be taken into account as a consequence of this horizontal component. (4)
For low silos
hc ≤ 1.0 of all categories, the fill type of reference surface loads need dc
not be taken into account C pf = 0 (5)
For silos with medium slimness 1.0 <
hc < 2.0 of category 1, the fill type of reference dc
surface loads need not be taken into account C pf = 0
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DIN 1055-6:2005-03
(6)
For silos with medium slimness 1.0 <
hc < 2.0 of categories 2 and 3 the reference dc
surface loads of the fill type e f are to be used acc. to 7.2.1 by way of allowance for the incidental unsymmetric loads and small eccentricities during filling up Ppf (see fig. 1b).
7.3.2
Discharge Loads on the Vertical Silo Walls
7.3.2.1
Symmetrical Discharge Loads
(1)
In the case of discharge loads an increase of the symmetric load components is to
be fixed for making allowance for the possible short term load increases during the discharge processes. (2)
⎞ ⎛h For low silos ⎜⎜ c ≤ 1.0 ⎟⎟ the symmetric discharge loads can be equalized with the ⎠ ⎝ dc
fill loads acc. to 7.3.1. ⎞ ⎛ h (3) For silos of medium slimness ⎜⎜1.0 < c < 2.0 ⎟⎟ the symmetrical discharge loads Phe and dc ⎠ ⎝
Pwe are to be calculated as follows: Phe = Ch Phf
(89)
Pwe = Cw Pwf
(90)
Where
Ch And Cw
are the discharge factors for the horizontal loads and wall friction loads acc. to the equations (91) to (96).
(4)
For silos of all categories which are emptied from the surface (whereby no friction
takes place within the stored bulk material) the values Ch and Cw zu can be taken as
Cw = Ch = 1.0
(91)
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DIN 1055-6:2005-03
(5)
For silos with medium slimness of the categories 2 and 3, the discharge factors
are to be fixed such that
Ch = 1.0 + 0.15CS
(92)
Cw = 1.0 + 0.10CS
(93)
With CS as the correction value for slimness
CS =
(6)
hc − 1.0 dc
(94)
For silos with medium slimness of category 1, the discharge factors are to be
calculated as follows if the mean values of the material parameters K and µ have been used in fixing the load:
⎧ ⎛ e ⎞ ⎫ Ch = 1.0 + ⎨0.15 + 1.5⎜⎜1 + 0.4 ⎟⎟Cop ⎬Cs dc ⎠ ⎭ ⎝ ⎩
(95)
⎛ e ⎞ Ch = 1.0 + 0.4⎜⎜1 + 1.4 ⎟⎟CS dc ⎠ ⎝
(96)
e = max (e f , eo )
(97)
Where
ef
Maximum eccentricity of the banked-up cone during the filling
eo
Eccentricity of the midpoint of the outlet opening
Cop
Bulk material correction value for the reference surface load acc. to Table E.1
Cs
Slimness correction value acc. to equation (94)
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DIN 1055-6:2005-03 (7)
For discharge load the resultant characteristic value of the wall friction loads
Pwe added up to depth z - with the force per unit length in the circumferential direction of the wall, e.g. [kN/m] to be derived from:
z
Pwe = ∫ Pwe ( z )dz = Cw µPho ( z − zv )
(97a)
0
With zv acc. to equation (87)
7.3.2.2 (1)
Reference Surface Load for Discharge Loads
The reference surface loads Ppe in case of discharge are to be fixed taking into
account unplanned loads and small filling eccentricities (see fig. 1b). (2)
Details of the form, positioning and quantity of the discharge type reference
surface load are to be taken from the regulations in 7.2.2. (3)
⎞ ⎛h For low silos ⎜⎜ c ≤ 1.0 ⎟⎟ of all categories, the formulation of a reference surface ⎠ ⎝ dc
load of the discharge type can be ignored (i.e. C pe = 0 ) in case of an eccentricity during emptying eo which is smaller than the critical value of eo , cr = 0.1d c (4)
⎞ ⎛h For low silos and silos of medium slimness ⎜⎜ c < 2.0 ⎟⎟ of category 1, the ⎠ ⎝ dc
formulation of a reference surface load of the discharge type can be ignored (i.e C pe = 0 ). (5)
⎞ ⎛h For low silos ⎜⎜ c ≤ 1.0 ⎟⎟ of category 2 and an eccentricity during emptying eo which ⎠ ⎝ dc
is greater than the critical value of eo , cr = 0.1d c , the formulations in 7.3.2.3 can be used. (6)
⎞ ⎛ h For silos with medium slimness ⎜⎜1.0 < c < 2.0 ⎟⎟ of category 2, the formulations in dc ⎠ ⎝
7.3.2.3 can be used.
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DIN 1055-6:2005-03
(7)
⎞ ⎛h For low silos ⎜⎜ c ≤ 1.0 ⎟⎟ of category 3 and an eccentricity during emptying xx which ⎠ ⎝ dc
is greater than the critical value of eo ,cr = 0.1d c , the formulations in 7.2.2.2 up to 7.2.2.5 are be used. (8)
⎞ ⎛ h For silos with medium slimness ⎜⎜1.0 < c < 2.0 ⎟⎟ of category 3, the procedures in dc ⎠ ⎝
7.2.2.2 up to 7.2.2.5 are to be used.
7.3.2.3
Uniform Increase of the Horizontal Loads as Replacement for the Reference Surface Loads of the Fill Type and the Discharge Type
(1)
For silos of category 2, the procedure for reference surface loads in 7.3.1.2 and
7.3.2.2 can, by and large, be replaced by a uniform increase of the horizontal loads in order to make allowance for the non-symmetries during fill and discharge. (2)
The procedures under 7.2.3 can be applied to the values of the reference surface
loads from 7.3.1.2 and 7.3.2.2 by using the equations (45) to (52), depending on the case at hand.
7.3.3 LARGE FILLING ECCENTRICITIES IN CIRCULAR SILOS
(1)
h In circular low silos and circular silos of medium slimness ⎛⎜ c < 2.0 ⎞⎟ that belong ⎝ dc ⎠
to category 3 and in which the eccentricity of the cone formed during filling is greater than the critical value of et ,cr = 0.25d c (see fig. 14) the effect of the unsymmetric load distribution on the vertical silo walls has to be examined. (2)
A conventional manual calculation, in which the vertical wall loads PzSk as per
equation (98) are added to the symmetric fill loads and discharge loads, can be used to
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DIN 1055-6:2005-03 meet the requirements of 7.3.3 (1). The symmetric loads are to be determined for a state of fullness with equivalent bulk material surface presuming a symmetric filling in accordance with 7.3.1.1.
ef
1
Zs
φdc=2r Legend 1
highest contact point of the bulk material with the silo
Figure 14 – FILLING PRESSURES IN CASE OF ECCENTRICALLY FILLED LOW SILOS OR SILOS WITH MEDIUM SLIMNESS (3)
The effect of the unsymmetric loads can be taken into account by increasing the
vertical forces near that wall where the filling height is the maximum. NOTE
The increase of the vertical forces arises from the global bending of
the silo. The bending occurs because the height of the material heaped along the wall opposite to side from where the material is being fed is comparatively smaller and thus the relevant horizontal loads – which maintain equilibrium – are absent. The increase of the vertical load is to be added with the wall friction loads, which are calculated using the symmetric loads (see above).
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DIN 1055-6:2005-03
(4)
The upper characteristic value of the bulk material parameters K and µ is to be
used for the calculations. (5)
The characteristic value of the resultant additional vertical wall load PzSk ( z s ) is to
be determined at a depth z beneath the highest lying contact point of the bulk material and the wall, using:
(
e PzSk = 0.04 p ho z s tan ϕ r ⎛⎜ t ⎞⎟ 6 + 7 Z − Z 2 ⎝ r ⎠
)
(98)
And the force per unit of length in the circumferential direction with:
p ho =
γ A γr = µ U 2µ
(99)
Z=
Zs B
(100)
B=
r − ho 2µK
(101)
⎡ ⎛ et ⎞ 2 ⎤ r tan ϕ r ⎢1 − ⎜ ⎟ ⎥ ⎝ r ⎠ ⎦ ⎣ ho =
3
(102)
Where
zs
is the depth beneath the highest lying contact point of the bulk material and the wall
ϕr
is the gradient of slope of the bulk material
r
is the radius of the circular silo wall
et
is the eccentricity of the peak of the fill cone (see fig 1b and 14).
(6)
The load component from equation (98) is to be added with the load component fsrom the sum total of the wall friction loads acc to equation (88).
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DIN 1055-6:2005-03 7.3.4 LARGE DISCHARGE ECCENTRICITIES IN CIRCULAR LOW SILOS AND CIRCULAR SILOS WITH MEDIUM SLIMNESS (1)
For a discharge eccentricity eo , which is greater than the critical value eo ,cr = 0.25d c the procedure as per 7.2.4 is to be used in case of low silos and silos with medium
h < 2 . 0 ⎞⎟ of categories 2 and 3. The loads described therein are to slimness ⎛⎜ c d c ⎝ ⎠ be regarded as additional loads that have to be treated as a separate category different from the symmetric loads and the reference surface loads (given in 7.3.2).
7.4
Braced Wall Silos
7.4.1 Fill Loads on Vertical Walls (1)
The effect of the geometry of the filling angle and – if required – the buckling of the
braced wall is to be taken into account for the determination of the fill loads. (2)
While determining the horizontal load ratio K, the resistance of the wall to radial
elongation should be taken into account. In case mathematical calculations show a sizeable (elastic) deformation of the braced wall (e.g. a positive displacement of the limit value acc. to DIN 4085 or DIN V 4085-100) a lower horizontal load ratio K may be taken. (3)
A characteristic value for the horizontal load Ph upon the vertical walls (see fig. 16)
is to be worked out. NOTE 1
The characteristic value of the horizontal load xx upon the vertical walls can be approximately determined in the following manner:
Ph = γK (1 + sin ϕ r )z S
(103)
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DIN 1055-6:2005-03 Where
zS
Is the depth beneath the highest contact point of the bulk material with the wall (see fig 16);
NOTE 2
γ
Is the upper characteristic value of the bulk material’s specific gravity
Κ
Is the upper characteristic value of the horizontal load ratio of the bulk material
ϕr
is the slope gradient of the stored bulk material
Equation (103) provides recognized realistic load estimates for a straight vertical wall with
fully developed wall friction contacts, subject to the condition that the angle of slope and the angle of internal friction are identical.
(4)
The characteristic value of the resultant additional vertical wall load (pressure)
Pzsk (z S ) – the force per unit of length in the circumferential direction – at any depth z S beneath the highest contact point of the bulk material and the wall, is to be determined in accordance with the load estimate under (3) taking into account the wall friction angle
µzu .
NOTE 3
The characteristic value of the resultant additional vertical wall load (pressure) Pzsk ( z S )
can be approximately determined as follows:
Pzsk = γ
µK 2
(1 + sin ϕr )z 2 S
(104)
Where
µ
(5)
The other regulations within this standard notwithstanding, the deviation of the
is the upper characteristic value of the coefficients of wall friction of the bulk material
bulk material parameters in case of braced wall silos has to be accepted by making adequate allowance for it using the upper characteristic value of the specific gravity γ and the horizontal correction value of the bulk material K .
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DIN 1055-6:2005-03
φr 1
Zs
Legend 1
load computation in a braced wall silo
Figure 15 – FILL PRESSURES IN A BRACED WALL SILO
7.4.2 Discharge Loads on Vertical Walls (1)
It can be presumed that the discharge loads on the vertical walls here are smaller
than the fill loads in 7.4.1. (2)
With reference to 7.4.2 (1) it must be taken into account that uneven distribution of
loads can occur as a result of an uneven intake of bulk material into the silo.
7.5
SILOS WITH FLUIDISED BULK MATERIAL
7.5.1 GENERAL (1)
Additional loads arising from fluidization and from air pressures caused by the injection of air are to be taken into account while dimensioning.
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DIN 1055-6:2005-03 (2)
Homogenising silos with fluidized bulk material and silos into which bulk material is poured at high speed (see 3.1.16 and 3.1.17) are to be dimensioned for both the situations:
(3)
--
fluidized bulk material
--
Non-fluidized bulk material
In the situation where the bulk material is not fluidized, the loads are to be treated in accordance with the procedure in 7.2 or 7.3.
7.5.2 LOADS IN SILOS FOR STORAGE OF FLUIDISED BULK MATERIAL (1)
In silos for storage of powdery bulk material (see 3.1.31) it is to be presumed that the stored bulk material can become fluidized in case the speed of the increasing bulk material surface exceeds 10m/h.
NOTE
The conditions under which the bulk material can fluidise depend on several factors that are not easy to define. The above-mentioned criterion is a simple means of assessing whether this type of load can have a bearing on dimensioning. If doubts still persist about a possible fluidization of the bulk material, then a specialised opinion (e.g. bulk material mechanics) is called for.
(2)
In homogenizing silos for storage of powdery bulk material (see 3.1.16) which are in continual operation, one has to take into account the fact that the bulk material could fluidise.
(3)
The horizontal loads on the silo walls ph on account of the fluidized bulk material can be computed acc to equation (105):
ph = γ 1 z
(105)
Where
γ1
is the specific gravity of a bulk material (fluidized specific gravity)
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DIN 1055-6:2005-03
(4)
The specific gravity γ 1 of a bulk material in the fluidized state can be estimated using the relationship
γ 1 = 0.8γ
(106)
Where γ is the specific gravity of the powdery bulk material acc to section 6
7.6
Temperature Differences between Bulk Material and Silo Construction
7.6.1 General (1)
Design calculations for a silo structure should take into account the effects of
temperature differences between the bulk material and the silo structure and/or between the surroundings and the silo structure. (2)
In case of a possibility of temperature differences between the stored bulk material
and parts of the silo wall or the entire silo wall, the silo is to be rated for the additional loads due to differing thermal elongations subject to acceptance of a stiff bulk material. (3)
The temperature conditions are to be fixed acc. to the regulations in DIN 1055-7.
(4)
Differing temperature deformations of the silo and the components associated with
the silo are to be taken into account. (5)
The following situations are to be watched while making calculations: decrease of the surrounding temperature relative to the temperatures of the silo structure and the stored bulk material filling of the silo with bulk material which is hot differences in the heating-up and cooling-down speeds between the unprotected and uncovered components of steel and reinforced concrete
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DIN 1055-6:2005-03
retardation of wall deformation by the silo structure NOTE
Differences in warming-up of unprotected components made of steel and reinforced
concrete is typical of roof structures in which the roof trusses just run upon the silo walls on slide bearings (without structural connections).
7.6.2 Loads due to a Decrease in the Surrounding Atmospheric Temperature (1)
If there is a possibility of a decrease in the surrounding atmospheric temperature
within a short span of time, then the additional loads due to differences between the temperature deformations of the outer structure and the mass of the bulk material that has been filled (the latter being relatively less affected by thermal influences) are to be taken into account. (2)
For silos with a circular ground plan, additional horizontal loads PhT are to be fixed,
which act upon the vertical silo walls when the container cools down to a greater degree than the bulk material stored. The additional loads at each point of the contact surface between the silo walls and the bulk material are to be computed by:
PhT = CT α w ∆T
Ew ⎡⎛ r ⎞ ⎛ Ew ⎢⎜ ⎟ + (1 − ν )⎜⎜ ⎝ EsU ⎣⎝ t ⎠
⎞⎤ ⎟⎟⎥ ⎠⎦
(107)
Where
CT
Load augmentation factor due to temperature
αw
Coefficient of thermal elongation of the silo wall
∆T
Is the temperature difference
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DIN 1055-6:2005-03
r
Is the silo radius ( = dc ) 2
t
Is the wall thickness
Ew
is the elasticity modulus of the silo wall
ν
is the Poisson number of the bulk material (approximately fixed with v = 0.3)
EsU
is the effective elasticity modulus of the bulk material during pressure relief at a depth z in the bulk material.
(3)
The computation of the effective elasticity modulus EsU of the bulk material during pressure relief in the bulk material depth z, has to take into account the size of the vertical fill load Pvf in the bulk material at this position.
(4)
The effective elasticity modulus EsU of the bulk material during pressure relief is to be determined acc. to the procedure described in C.10.
(5)
If the effective elasticity modulus EsU of the bulk material is determined by tests, a temperature-related load augmentation factor of CT = 1.2 is to be fixed. Should an effective elasticity modulus be derived by approximation from the bulk material thickness, a temperature-related load augmentation factor of CT = 3 is to be fixed.
7.6.3 Loads due to Filling of Hot Bulk material (1)
Should bulk materials with high temperatures be stored in a silo, an allowance has to be made for the difference in the temperatures between that part of the material which has been in the silo for a longer time and cooled down, and that part of the material which is being added on above the bulk material surface where the air
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DIN 1055-6:2005-03 temperatures are higher. The effects of these temperature differences upon the expansion pattern of the silo wall has to be observed. (2)
These effects do not need to be taken into account for silos of category 1.
7.7
Loads in Rectangular Silos
7.7.1 Rectangular Silos (1)
The wall loads caused by the bulk materials stored in silos of rectangular cross
section are to be fixed, depending upon the case, acc. to 7.2, 7.3 and 7.4. (2)
The loads determined at a specific bulk material depth in accordance with 7.2 can
be taken as mean values. The localized loads at this position can deviate from this mean value. (3)
The general requirements of 6.1 (2) notwithstanding, for design calculations for
silos of categories 1 and 2 the favourable effect of the interaction between the bulk material and the silo wall which takes the form of a transpositioning of the horizontal loads from the centre of the wall (decrease) to the corners (increase) can be taken into account if the silo wall is so designed that its stiffness is comparable with the stiffness of the stored bulk material. (4)
In case the load transpositioning is being estimated in accordance with 7.7.1 (3),
the relevant load estimates should be used.
7.7.2 Silos with Internal Braces (1)
In rectangular silo bins with beam ties running within the silo’s cross-section, the
bulk material loads upon the walls are to be fixed acc. to the methods in 7.2, 7.3 or 7.4 depending on the case.
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DIN 1055-6:2005-03
(2)
The loads which are imposed by the braces upon the silo walls are to be
determined taking after making allowances for the following influences: loads on the respective internal braces position and securing of braces slack of the braces Influence of the structure’s rigidity on the increase of the slack caused by the bulk material loads upon the beam tie. (3)
For silos of category 1 and 2, the calculation methods given in DIN V ENV 1993-4-
1:2002-05 Section 9 are to be used for making allowances for the loads upon the silo structures caused by the internal beam ties.
8
LOADS ON SILO HOPPERS AND SILO BOTTOMS
8.1
General
8.1.1 Physical Parameters (1)
This section gives the applicable characteristic values of the fill and discharge
Loads for silo bottoms with the following types of layout: flat bottoms steep hoppers flat inclined hoppers (2) The loads on the walls of the silo hoppers are to be determined as per the foll. Classification relating to the inclination of the hopper walls:
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DIN 1055-6:2005-03 if the angle of inclination of the bottom vis-à-vis the horizontal α is less than 5o then the bottom is presumed to be level if the other two cases mentioned do not apply, then the hopper is presumed to have a gentle inclination A hopper is said to be steep if the foll. criteria are met (see figures 17 and 18): ⎛1− K ⎞ ⎟⎟ tan β < ⎜⎜ 2 µ h ⎠ ⎝
(108)
Where
K
Lower characteristic value of the ratio of horizontal load acting upon the vertical walls
β
Angle of inclination of the hopper measured with reference to The vertical axis (half of the vertical and opposite angle)
µh
Lower characteristic value of the coefficients of wall friction in the hopper
NOTE
A hopper is said to be steep if the bulk material slides along the inclined walls subject to the
condition that the silo is filled-up and the bulk material is in a thickened (consolidated) state caused by the bulk material stored in the silo. The resistance to friction on the hopper walls may then be defined in terms of the normal pressures on the hopper wall and the coefficients of wall friction. It may be referred to as “fully mobilized wall friction” in this case. A hopper is said to be gently inclined if the bulk material does not flow along the inclined walls of the hopper when the silo is full (the angle of inclination with reference to the horizontal is too small or the wall friction is too high). The wall friction then does not have a direct relationship with the normal pressures acting on the hopper walls and the coefficients of wall friction, but is somewhat lower and depends upon the hopper’s angle of inclination and the level of stress in the hopper (wall friction is not fully mobilized). Here the compressibility of the bulk material does play a role, yet it may be ignored. In case of a transition from a steep hopper to a flat hopper the pressure estimates of both types
117
DIN 1055-6:2005-03 of hoppers show an identical distribution pattern and identical values in both cases. The transition from a steep to a flat hopper therefore takes place in uniform manner (angle of inclination for which the wall friction
Co-efficient of wall friction in the hopper µh
is fully mobilized
1.1 1 0.9 0.8
K=0.7 K=0.6 K=0.5 K=0.4 K=0.3
0.7 0.6 0.5 0.4 0.3 0.2 0.1 0 0
10
20
30
40
50
60
Angle of inclination of hopper with ref. to the vertical β
Figure 16 – BOUNDARIES BETWEEN STEEP AND FLAT HOPPER
z Pvft
β
hh
Phf
Phf
Phf Phf
Phf
Phf
x steil
flach
Figure 17 – DISTRIBUTION OF FILLING PRESSURES IN A STEEP AND FLAT SILO
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DIN 1055-6:2005-03 8.1.2 General Rules (1)
The mean vertical loads at the hopper transition and on a horizontal bottom may
be calculated with:
Pvft = Cb Pvf
(109)
Where
Pvf
is the vertical fill load acc. to the relevant equations (11) or (86) depending upon the slimness of the silo. For coordinate z here, one has to take the height of the silo walls hc (i.e. at the hopper transition shown in fig. 1a) and the bulk material parameters which lead to the maximum hopper loads given in Table 2;
Cb
is the bottom load augmentation factor to make allowance for the possibility that vertical loads larger than given in equations (11) and (86) may be imposed upon the hopper and the silo bottom, if the bulk material in the vertical shaft heaps-up over hopper.
(2)
For silos of categories 2 and 3 the bottom load augmentation factor is to be
estimated in accordance with equation (110):
Cb = 1.0 (3)
except under the conditions described in paragraph (4)
(110)
For silos of category 1, if the mean values and the material parameters Κ and
µ are used for determination of the load, then the bottom load augmentation factor is to be fixed acc. To equation (111):
Cb = 1.3
except under the conditions described in paragraph (4)
(111)
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DIN 1055-6:2005-03
(4)
There could be a pre-disposition for dynamic behaviour (conditions in paragraph 4), particularly under following conditions:
--
In a silo with a slim vertical silo shaft, when used for storage of bulk materials
which cannot be classified as bulk materials with marginal cohesion (see 3.1.23), --
If the stored bulk material shows a tendency for interlocking amongst the bulk
material particles and for bridging (e.g. cement clinker), --
Or, due to reasons other than the ones mentioned, there is a tendency for
sporadic loads during emptying (such as pulsating or knocking). NOTE 1
The determination of the cohesion c of a bulk material is described in C.9. The cohesion c
is rated as marginal, if it does not exceed the value c/σΓ = 0.04, when the bulk material consolidates on being subjected to a stress level of σΓ (see 3.1.23).
(5)
If the stored bulk material shows a significant tendency to behave dynamically
during emptying of the silo (see paragraph (4)), then larger loads have to be placed for the hoppers and the silo bottoms. The bottom load increase factor is then to be estimated by:
Cb = 1.2
for the categories 2 and 3
(112)
Cb = 1.6
for category 1
(113)
NOTE 2
The loads on the hopper walls can alternatively be fixed acc. to the procedure described
in Annex H. NOTE 3
The increased values for xx acc. to equation (113) must be used only when the
simplified procedures for load determination with the mean values of the characteristic bulk material parameters have been used in category 1.
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(6)
In each of the cases, the mean vertical load in the hopper is to be determined at a
height x above the (theoretical) apex of the hopper (see fig. 18) as follows:
⎡ γh ⎤ ⎧⎪⎛ x ⎞ ⎛ x ⎞ Pv = ⎢ h ⎥ ⎨⎜⎜ ⎟⎟ − ⎜⎜ ⎟⎟ ⎣ n − 1⎦ ⎪⎩⎝ hh ⎠ ⎝ hh ⎠
n
⎫⎪ ⎛ x⎞ ⎬ + Pv ft ⎜⎜ ⎟⎟ ⎪⎭ ⎝ hh ⎠
(114)
Where
n = S (Fµ heff cot β + F ) − 2
(115)
and S = 2 for conical and quadratic pyramid-shaped hoppers
(116)
S = 1 for wedge-shaped hoppers
(117)
S = (1+b/a) for hoppers with rectangular plan
(118)
Where
γ
Upper characteristic value of the bulk material’s specific gravity
hh
Is the vertical distance (height) between the apex of the hopper and the
transition into the vertical shaft (see fig. 18) x
The vertical coordinate going outwards from the apex of the hopper (see fig. 18)
µ heff
Is the effective or the mobilized characteristic coefficient of wall friction for the hoppers (in each case acc. to the equation (122) or (132)
S
is the coefficient for making allowance for the shape of the hopper
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is the characteristic value of the load ratio in the hoppers (in each case acc. to the equations (123), (127) or (133)
β
Is the angle of inclination of the hopper with respect to the vertical (= 90o – α) or the steepest angle with respect to the vertical in the case of a quadratic or rectangular pyramid type of hopper
Pv ft
Is the mean vertical load in the bulk material at the transition of the hopper for the filling loads (equation (109))
(7)
a
is the length of the long side of a rectangular cross-section of the hopper
b
is the length of the short side of a rectangular cross-section of the hopper
While determining the load ratio F in the hopper, one has to consider whether the
hopper has to be rated as steep or as flat and whether the load in question is fill-type or discharge-type of load. Suitable values for F are to be determined acc. to 8.3 or 8.4. (8)
The determination of a suitable value for the effective or mobilized coefficients wall
friction µ heff in the hopper has to take into consideration the question whether the hopper has to be classified as steep or as flat or whether the load in question is of fill-type or discharge-type. Suitable values are to be determined acc. to 8.3 or 8.4. 8.2
Horizontal Silo Bottoms
8.2.1 Vertical Loads on Horizontal Silo Bottoms (1)
The vertical loads on horizontal silo bottoms (inclination α ≤ 5o) can approximately
be taken as constant, except if the silo is classified as low and medium-slim. In such cases the specification in 8.2.2 are to be used.
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(2)
The vertical loads on horizontal bottoms are to be calculated using:
pv = pvft
(118)
Where pvft is to be calculated using equation (109) (3)
The vertical loads on horizontal silo bottoms for discharge loads are to be
equalized with the loads of the fill type.
8.2.2 Vertical Loads on Level Silo Bottoms in Low Silos and Silos with Medium Slimness (1)
For low silos and silos with medium slimness one has to keep in mind that in case
of horizontal silo bottoms, local bottom loads larger than the ones in 8.1.2 (equation (109)) can occur. (2)
The vertical loads pvsq on the horizontal silo bottom of a low silo and a silo with
medium slimness are to be determined with
⎛ h ⎜ 2.0 − c dc Pvsq = Pvb + ∆Psq ⎜ ⎜ htp ⎜ 2.0 − dc ⎝
⎞ ⎟ ⎟ ⎟ ⎟ ⎠
(119)
Where
∆Psq = Pvtp − Pvho
(120)
Pvtp = γhtp
(121)
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1
htp ho 2
hc
Legend 1
equivalent bulk material surface
2
lowest point of the wall without any contact with the bulk material
Figure 18 – BOTTOM LOADS IN LOW SILOS AND SILOS OF MEDIUM SLIMNESS (3)
The bottom loads p vsq acc to equation (119) can be computed for both fill loads
and discharge loads. (4)
The value of p vsq acc to equation (119) reproduces the vertical loads in the vicinity
of the midpoint of the silo bottom. If support cannot be ensured for the bottom plate, then a functional distribution of loads is required.
8.3
STEEP HOPPER
8.3.1 MOBILISED FRICTION (1)
For filling as well as for emptying loads the following value has to be computed for
the effective or mobilized coefficient of wall friction in equation (115):
µ heff = µ h
(122)
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µh
is the lower characteristic value of the angle of wall friction in the hopper.
8.3.2 FILL LOADS (1)
For fill loads the mean vertical stress at any given position x in a steep hopper is to
be calculated acc to equations (114) and (115) as well as the parameter F f
acc to
equation (123): Ff = 1 −
b ⎛ tan β ⎜⎜1 + µh ⎝
(123)
⎞ ⎟⎟ ⎠
In this case the parameter n in equation (114) is:
n = S (1 − b )µ h cot β
(124)
Where b.
Represents an empirical coefficient, which is to be taken as b = 0.2
The other parameters are defined in 8.1.2 (6). (2)
The loads perpendicular to the hopper walls p nf and the wall friction loads ptf at
any given position x of the wall of a steep hopper are to be calculated for the fill type of loads (see fig 17) acc to the equations (125) and (126):
p nf = F f p v
(125)
ptf = µ h F f pv
(126)
Where
Ff
is to be calculated using the equation (123)
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8.3.3 DISCHARGE LOADS (1)
For discharge loads the mean vertical stress at any given position x in a steep
hopper is to be calculated acc to equations (114) and (115) using the parameter Fe : Fe =
1 + sin ϕ i cos ε 1 − sin ϕ i cos(2 β + ε )
(127)
⎧ sin ϕ wh ⎫ ⎬ ⎩ sin ϕ i ⎭
(128)
With
ε = ϕ wh + arcsin ⎨
ϕ wh = arctan µ h
(129)
Where
µh
is the lower characteristic value of the coefficient of wall friction for the hopper
ϕi
is the upper characteristic value of the angle of internal friction of the bulk material stored in the hopper
NOTE 1
It is to be noted that the angle of internal friction of the hopper wall is always
smaller than or equal to the angle of internal friction of the bulk material stored in the hopper (i.e.ϕ wh ≤ ϕ i ) , because otherwise a sliding surface will develop within the bulk material when transverse stresses that can act upon the wall are larger than the internal friction of the bulk material. NOTE 2
The above equation (127) for Fe is based upon the simple theory of Walker
for discharge pressures in hoppers. It is also possible to use the alternative expression for Fe by Enstad which is given in H.11.
(2)
The loads perpendicular to the hopper walls p ne and the wall friction loads pte at
any position x of the wall of a steep hopper are to be calculated for the discharge type of loads (see fig 20) acc to the equations (130) and (131):
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p ne = Fe p v
(130)
pte = µ h Fe p v
(131)
Where
Fe
is to be calculated using the equation (127)
z
Phe
Pvft Zf β
hh
Pne Phf
Phf
Pne Phe
Pne
Pne
x steep
flat
Figure 19 – DISCHARGE PRESSURES IN A STEEP HOPPER AND A GENTLY SLOPING HOPPER
8.4
FLAT HOPPERS
8.4.1 MOBILISED FRICTION In a gently sloping hopper the wall friction is not fully mobilized. The partially mobilized or effective coefficient of wall friction is to be calculated as follows:
µ heff =
(1 − K ) 2 tan β
(132)
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Where
K
is the lower characteristic value of the horizontal load ratio in the vertical silo shaft, which leads to the maximum hopper loads (see table 2)
β
is the angle of inclination of the hopper with reference to the vertical axis (see fig 18)
8.4.2 FILL LOADS (1)
In fill loads the mean vertical stress at each depth of the bulk material in the
hopper is to be calculated as per equations (114) and (115), using the parameter F f , as follows:
⎧ ⎪⎪ Ff = 1 − ⎨ ⎪ ⎪⎩
b
⎛1 + tan β ⎜ µ heff ⎝
⎫ ⎪⎪ ⎬ ⎞⎪ ⎟ ⎠⎪⎭
(133)
The parameter n in equation (114) amounts in this case to:
n = S (1 − b )µ heff cot β
(134)
Where
µ heff
is the mobilized or effective coefficient of wall friction in a flat hopper acc to equation (132)
b
is an empirical coefficient, which is to be taken as b = 0.2
The other parameters are defined in 8.1. (2)
The loads perpendicular to the hopper walls p nf and the wall friction loads pte at
any position x of the wall of a flat hopper are to be calculated for the discharge type of loads (see fig 18) acc to the equations (135) and (136):
p ne = Fe p v
(135)
pte = µ h Fe p v
(136)
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Where
Ff
is to be calculated using the equation (132)
8.4.3 DISCHARGE LOADS In flat hoppers the discharge loads can be calculated - like the discharge loads (see fig 8.4.2) - perpendicular to the hopper walls p ne and the wall friction loads pte (see fig 20). 8.5
Hopper Loads in Silos with Air-Injection Equipment
(1)
For hoppers in which fluidization of the bulk material in the entire silo or certain
parts thereof due to use of air-injection equipment cannot be ruled out, allowance has to be made for the additional loads due to fluidization and the air pressures. (2)
These loads should be determined without an estimation of the wall friction loads
as described in 7.5.2.
9
LOADS ON TANKS
9.1
GENERAL
The following rules are applicable for the determination of the characteristic loads caused by fluids stored in tanks. NOTE 1
These rules are applicable for all types of tanks under static conditions.
Tanks in which dynamic processes are at play, are not included. NOTE 2
A lists of relevant influences, component safety factors and combination of
influences on tanks can be obtained from Annex B.
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9.2
LOADS CAUSED BY STORED FLUIDS
(1)
Loads from stored bulk materials are to be calculated keeping in mind the
following factors:
(2)
--
The defined range of fluids which may be stored in the tanks
--
The geometry of the tank
--
The maximum possible filling height in the tank
The characteristic value of the load p is to be calculated acc to the equation:
p (z ) = γ * z
(137)
Where
9.3
z
is the depth beneath the fluid surface
γ
is the specific gravity of the stored fluid
CHARACTERISIC VALUES OF FLUIDS
The specific gravities given in DIN 1055-1 are applicable.
9.4
SUCTION LAODS CAUSED BY INADEQUATE VENTILATION
If the ventilation system of the tank is susceptible to interferences, a suitable calculating method should be adopted in order to determine the sub pressures which arise during discharge under extreme conditions. The calculation has to take into account the possible adiabatic properties of the processes described.
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ANNEX A (INFORMATIVE)
THE BASES FOR STRUCTURAL PLANNING – RULES SUPPLEMENTING DIN 1055100 FOR SILOS AND TANKS
A.1
General
(1)
The format given in DIN 1055-100 is the basis for design calculations. However
there is a fundamental difference between silos and tanks vis-à-vis other structures – for the most part of their service life they are exposed to full loads arising from the bulk material and fluids stored therein and these , as a rule, constitute a large proportion of the fixed loads which result from the structure’s inherent weight. (2)
This Annex lays down additional rules for the partial safety factors relating to the
influences ( γ F -correction values) and the combination of influences as well as for the relevant combined correction values (ψ -correction values) for silos and tanks.
(3)
The possible temperature-influences include the effects of climatic temperature
and the effects of hot bulk materials. The following calculating-conditions must be taken into account: --
Hot bulk materials that are poured into partially filled silos or tanks. In such cases
the repercussions of an increase of the air-temperature above the bulk material is to be monitored. --
Deformation of the silo wall structure caused by the bulk material as it cools down.
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For determining the consequences of differing subsidence’s in the silo groups or
groupings of silo bins or tanks, the most unfavorable combination possible of filled and empty bins are to be used.
A.2
Boundary State of the Loading Capacity
A.2.1 Correction Value γ of the Partial Safety Factor
(1)
For the design calculations of silos and tanks, the values given in DIN 1055-
100:2001-03 Table 6 are used. (2)
If the maximum filling height and the highest specific gravity to be computed in
case of the fluids provided for storage is not exceeded, then the safety factor correction value γ Q may be reduced from 1.50 to 1.35. A.2.2 Combined Correction Value ψ The combined correction values ψ for silo loads and loads in tanks and the combined correction values for other influences are given in Table A.1
A.3
Combination of Influences
While furnishing proof of the loading capacity of a silo the following influences are to be considered: filling and storage of bulk materials emptying of bulk materials own loads and live loads (DIN 1055-3) snow loads and ice loads (DIN 1055-5)
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A.4
Calculating-Conditions
and
Combined-Influences
for
Categories 2 and 3 (1)
The predominant (dominant) and permanent influences are to be computed at their full values whereas the secondary influences may be reduced using the correction values ψ , in order to take into account the remote possibility of a simultaneous occurrence in compliance with DIN 1055-100. The combinations in Table A.1 can be used as reference values.
(2)
In case the dominant influences in question are earthquakes or extraordinary influences of loads, the secondary influences for the bulk material loads can be calculated using the mean values of the coefficients of wall friction µ m , of the horizontal load ratio K m , and of the hopper load ratio value Fm , subject to the condition that the suitable procedures given in 7.1, 7.3 and 8.1 are used.
------- 1) under preparation
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TABLE A.1 – COMBINED CORRECTION VALUES XX
Influence
ψo
ψ1
ψ2
filling / emptying of bulk-material
1.0
0.9
0.8
live loads, impressed deformations
0.7
0.5
0.3
places up to NN + 1 000 m
0.5
0.2
0
places over NN + 1 000 m
0.7
0.5
0.2
wind loads
0.6
0.5
0
temperature influences (not fire)*
0.6
0.5
0
building site subsidence’s
1.0
1.0
1.0
other influences **
0.8
0.7
0.5
snow loads and ice loads
* see DIN 1055-7 ** correction-values ψ for fluid pressure are to be determined based on the location
A.5
Combined Correction Values for category 1
For silos of category 1 the following simplified calculating situations can be used: --
Filling
--
Emptying
--
Wind in case of empty silo
--
Silo filled completely and wind
--
Snow (for the roof)
--
Dust explosion
In case of wind loads the use of the simplified rules given in DIN 1055-4 are allowed.
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ANNEX B (NORMATIVE)
INFLUENCES, PARTIAL SAFETY FACTORS AND COMBINED CORRECTION VALUES FOR THE INFLUENCES ON TANKS
B.1
General
(1)
The design calculations have to take into account the characteristic values of the
influences listed in section B.2.1 up to B.2.14. (2)
For these characteristic values the partial safety factors of the influences given in
B.3 and the combination rules given in B.4 are to be used.
B.2
Influences
B.2.1 Loads from Stored Fluids (1)
During operation, the inherent-weight loads of the products that are filled in are to
be computed (beginning from the state of maximum fullness till the state of complete emptying out) as loads resulting from filling. (2)
During a test filling, the inherent-weight loads of the test-filling substances that are
filled in are to be computed (beginning from the state of maximum fullness till the state of complete emptying out) as loads resulting from filling.
B.2.2 Loads from Internal Pressures (1)
During operation, loads at the specified minimum and maximum values of the
internal pressures are to be regarded as “loads resulting from internal pressure”.
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(2)
During a test filling, loads at the specified minimum and maximum values of the
internal pressures during the test filling are to be regarded as “loads resulting from internal pressure”.
B.2.3 Loads from Temperature (-Changes) Stresses due to forces caused by temperature expansions can be ignored if the number of load cycles of temperature expansions does not lead to a risk of a fatigue or a cyclic plastic failure.
B.2.4 Inherent Loads (1)
The resultant of the inherent weights of all individual components of the container
and the components attached to the latter are to be computed as inherent load.
B.2.5 Loads from Insulation (1)
The inherent weights of the insulation are to be computed as loads arising due to
insulation. (2)
The computational values are to be taken from DIN 1055-1.
B.2.6 Distributed Live Loads The distributed loads from usage (traffic/operation) that are to be computed should be taken from DIN 1053-3, unless they are specified by the customer.
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B.2.7 Concentrated Live Loads Concentrated individual loads from usage (traffic/operation) that are to be computed should be taken from DIN 1053-3, unless they are specified by the customer.
B.2.8 Snow Loads The snow loads are to be taken from DIN 1055-3.
B.2.9 Wind (1)
The wind loads are to be taken from DIN 1055-4.
(2)
Additionally one can take the following coefficients of pressure for circular
cylindrical tanks (see fig. B.1): a)
Internal pressure in case of top-open tanks and top-open collecting tanks:
c p = −0.6
b)
Internal pressure in case of aerated tanks with small openings: c p = −0.4
c)
If there is a collecting tank then the pressure acting externally on the tank can be computed as it decreases with height in a linear direction from top to bottom.
(3)
In keeping with their temporary character, the wind loads – reduced during the building phase – can be computed in accordance with DIN 1055-4 and DIN 1055-8
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Cp a
Cp a
Cp b
∇ 0 00m
Cp=0.6
φDT φDc
Cpa
a)
TANK WITH COLLECTING TROUGH
Cpa
Cpb
φDT b)
TANK WITHOUT COLLECTING TROUGH
Legend a)
c p acc. To DIN 1055-4
b)
c p = −0.4 in case of ventilation
Figure B.1 – COEFFICIENTS OF PRESSURE FOR WIND LOADS IN CASE OF CIRCULAR CYLINDRICAL TANKS
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B.2.10 Low Pressure through Inadequate Ventilation Loads which arise due to inadequate ventilation are to be computed acc. to 9.4.
B.2.11 Seismic Loads Seismic loads are to be computed acc to DIN 4149.
B.2.12 Loads from Connected Structures Loads from pipelines, shutters or other objects and loads which result from the subsidence of building foundations which are independent relative to the foundation of the tank are all to be taken into account. Piping equipment should be designed such that loads affecting the tanks are as small as possible.
B.2.13 Loads from Irregular Subsidence Loads from subsidence are to be taken into account if the occurrence of irregular subsidences is to be expected during the designated service life.
B.2.14 Loads from Catastrophies This includes blast wave, shock stress, fire damage, explosion, leakage inside the tank, spillage and overfilling of internal tank.
B.3
Partial Safety Factors for the Influences
(1)
The safety factors given in DIN 1055-100 are to be used for influences listed under
B.2.2 till B.2.14
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DIN 1055-6:2005-03 (2)
It is recommended that the safety factor for loads from fluids be computed for
operation (B.2.1 (1)) with γ F = 1.20 (3)
It is recommended that the safety factor for loads from fluids be computed during
the test filling (B.2.1 (2)) with γ F = 1.00 . (4)
In case of calculating conditions for extraordinary influences it is recommended
that the safety factor be computed using γ F = 1.00 for variable influences.
B.4
Combinations of Influences
(1)
The general stipulations in DIN 1055-100:2001-03 9.4 are to be followed.
(2)
Live loads and snow loads must not be computed as simultaneous forces.
(3)
Seismic influences must not be taken into consideration during the test filling.
(4)
Catastrophic influences must not be taken into consideration during the test filling.
The combination regulations for extraordinary loads in DIN 1055-100:2001-03 10.4 are however to be taken into consideration.
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ANNEX C (Normative)
Measurement of Bulk Material Parameters for the Determination of Silo Loads C.1
General
(1) This annex describes test procedures which are introduced in this standard exclusively for the purpose of determining bulk material parameters which are used in the determination of the loads in silos. These procedures are not applicable for designing of silos in the context of ensuring a reliable bulk material flow. The level of pressure taken as the basis for the determination of the bulk material parameters is far higher in the case of the determination of bulk material loads than it would be in the case of a study of the bulk material mechanism in the context of bulk material flow -- the reason being that high pressures are required for the bulk material specimen being tested to satisfy the relevant conditions pertaining to bulk materials. The process of preparation of the specimens therefore differs in some respects from what is considered standard procedure in terms of bulk material mechanics. (2) Compactness of a high order is required while preparing the specimen in order to obtain a representative bulk material packing. All parameters which influence the silo loads are to be determined subject to this condition, because this condition of high compactness describes the reference status for the upper characteristic values of the actions on the silo structure.
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C.2
Application
(1) The test procedures described in this annex are to be used for the calculation of loads of silos in category 3 and for bulk materials which are not contained in Table E.1. They can also be used as an alternative to the values given in Table E.1 for the determination of the bulk material parameters. The reference stresses in the tests act either in the vertical or the horizontal direction. They have to reproduce stress levels, which are representative of those that exist in the stored bulk material e.g. in the hopper passage during the fill-load. (2) The test procedures could also be used for the measurement of generally applicable bulk material parameters for determining the loads of silos, but not for specific silo geometry. Tests which are supposed to provide generally applicable parameters for the designing of different silos can be conducted subject to the foll. Level of reference load: (a)
for making allowance for vertical loads (C.6, C.8 and C.9): reference stress σ r = 100 kPa;
(b)
for making allowance for horizontal loads (C.7.2): reference stress
σ r = 50 kPa;
C.3
Symbols
The foll. Symbols have been used in this annex:
ax
Conversion factor for the bulk material parameters for making allowance for deviation
c
Cohesion (see fig. C.4)
D
Internal diameter of the test bin
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Fr
Residual shear-resistance (-force) at the end of the wall friction test (see fig. C.2b)
K mo
Mean value of the horizontal load ratio for smooth walls
∆
Displacement of the upper part of the shear bin during shear test
ϕi
Angle of internal friction while subjecting the specimen to stress (angle of the overall shear strength)
ϕc
Angle of internal friction during relief of the specimen (“effective internal angle of friction”)
µ
Coefficient of friction between the bulk material specimen and the wall specimen (coefficient of wall friction)
σr
Reference stress
τa
The residual shear strength measured in a shear test after increasing the normal pressure (see fig. C.4) (during relief)
•
The shear pressure measured in a shear test
τb
The maximum shear strength measured after reduction of the normal stress in a shear test (refer fig. C.4) (stress relief)
C.4
Definitions
The following definitions are applicable to this annex.
C.4.1 Secondary Parameters Each parameter which can influence the characteristic values of the stored bulk material, but is not listed amongst the main factors that lead to variance of the characteristic values. The composition, the grain grading (grain-size distribution), the moisture content, the temperature, the age, the electrical charging during operation and the production methods are a few examples of the secondary parameters. The variances in the reference stresses defined in C.2 may be regarded as secondary parameters.
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C.4.2 Specimen Selection Choosing specimen that represent the bulk material, that is provided for storage or the material of the silo wall, while taking into account that the properties of the material are subject to change with the passage of time.
C.4.3 Reference stress The state of stress that is prevalent at the time of measuring the characteristic values of the bulk material. The reference stress is generally chosen such that it corresponds to the level of stress prevalent in the bulk material after the filling of the silo. At times it may be necessary to define the reference stress in terms wider than just the principal stress.
C.5
Selection and Preparation of Specimen
(1) The tests are to be conducted with specimens that are representative of the bulk material that has been provided for storage in the silo. (2) The choice of the specimen has to be made keeping in mind that there may be possible changes in the bulk material parameters during the course of the silos usage, apart from the changes that occur on account of the changing environmental conditions, the effects of the silos operational processes and the effects of the sedimentation of the bulk material in the silo. (3) The mean value of each of the bulk material parameters has to be determined after making adequate allowance for variances of the relevant secondary parameters.
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(4) For each test the reference stress σ r is to be determined as a function of the pressure prevailing in the stored bulk material. The value for the reference stress however should not to be very precisely defined. NOTE 1
A precise determination of the reference stress would imply
that the test result was known before the test was conducted. The allowance for an approximate value for the reference stress is not critical to the interpretation of the test results. The tests however are to be conducted at a stress level which is appropriate for the serving the purpose of conducting the test. (5) For tests in accordance with C.6, C.7.2, C.8.1 and C.9 the procedure given below for specimen preparation has to be followed. (6) The specimen is to be introduced into the test bin without vibrations or other measures that may lead to its compression and is to be subjected to the reference stress. In order to consolidate the specimen, a cover plate is to be rotated (“twisted”) back and forth several times around its vertical axis, both in the clockwise and the anticlockwise directions, at an angle of 10°. NOTE 2
The number of rotations (“twists”) required depend on the bulk
material being tested. (7) The mean values obtained from the tests are to be multiplied with a conversion factor in order to derive extreme values. The conversion factors are to be chosen such that allowance is made for the influence of secondary parameters, for the changes of the bulk material parameters in the course of use, and for inaccuracies while taking the specimens.
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(8) The conversion factor must be suitably adjusted in case the variance of any of the secondary parameters amounts to more than 75% of the variance range that is covered by the conversion factor.
C.6
Determination of Bulk Material Specific Gravity γ
C.6.1 Short Description The bulk material density γ is to be determined using a consolidated (super critically compressed) specimen of the bulk material. NOTE
The purpose/meaning of this test is to obtain a good estimate of the
maximum bulk material density that arises in the silo. This aim is fulfilled by the determination of that density, which reaches its peak when the bulk material specimen is subjected to that level of pressure which is prevalent in the silo after filling has taken place. In order to achieve this it is necessary to pour the bulk material into the test bin in such a manner that a suitable density is developed in the bulk material packing before the specimen is subjected to a consolidating pressure. This can be achieved either by using the “rain filling procedure” to pour the bulk material into the shear bin or by means of preconditioning the specimen using the above-mentioned “twisting” of the cover plate. This will lead to such density of the bulk material which is representative for the conditions with respect to the determination of the silo loads. This procedure deviates substantially from the procedure specified in ASTM D6883-01 because that mainly deals with powdery bulk materials where the lowest possible density has to be achieved.
C.6.2 Test Apparatus The shear bin shown in fig. C.1 has to be used for the determination of the weight and volume of a bulk material specimen. The bin diameter D must be at least 5 times the maximum diameter of the bulk material grain and may not
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DIN 1055-6:2005-03 be lesser than 10 times the mean grain size. The height H of the compressed specimen must lie between 0.3D and 0.4 D. NOTE These restrictions relating to the grain size of the bulk material are chosen due to the following reasons: the restriction on the maximum grain size of the bulk material would ensure that the arrangement and orientation of the bulk material grains are not unduly disturbed due to the influence of the enclosing wall. Moreover it is known that this influence is greater in the situation where all the particles have the same size, than in the situation where the smaller particles can take up the space between the larger particles. It is due to this reason that in case of uniform size of the particles a restriction of 10 times the size of the particle and in case of a wider range of particle-sizes a restriction of 5 times the maximum particle diameter is prescribed.
N=
σ rπD3 4
1
a
H b
φD
Legend 1
standardized rotation
a
smooth surface
b
rough surface
Figure C.1 – ARRANGEMENT FOR DETERMINATION OF γ
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C.6.3
Procedure/Process
(1) The reference stress σ r has to correspond to the vertical pressure level
p v of the bulk material that is stored in the silo. (2) The preparation of the specimen has to comply with the procedure given in C.5. The density of the specimen has to be determined using the quotient from the measured weight of the consolidated specimen and from the volume of the bulk material that has been taken. The height of the specimen H has to be in the form of the mean value of three measurements which are to be taken at the same radial distance from the midpoint of the bin and within three 120° sectoral sections which are to be chosen in the direction of the circumference. NOTE The densities determined acc. to the procedure given in ASTM D6683 can turn out to be lower. The deviation is generally low for powdery bulk material, but for coarse-grained bulk material it can assume significant proportions.
C.7
Wall Friction
C.7.1 General (1) The two parameters below are distinct from each other: -- Coefficient of the wall friction µ m for the determination of loads (wall friction Coefficient); -- Wall friction angle ϕ wh for the evaluation of the flow behaviour. (2) For bulk materials with a wide range of grain sizes, which tend to separate out during
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DIN 1055-6:2005-03 The filling process, due allowance has to be made for possible mixing of materials while choosing the material specimens for determination of the coefficients of wall friction µ m . (3) The tests relating to wall friction are to be conducted using units of wall specimens which are representative of the material used in the wall surfaces of the silo structure. NOTE 1
Although the test laboratories are equipped with a wide range of
construction and surfacing materials, the individual units of wall specimens can show a transformation of the surface that makes it different from the surface condition at the time of the silo manufacture. Units of wall specimens with nominally identical designation can have angles of wall friction that vary from each other by several degrees. In such cases the wall specimens need to be procured from the prospective manufacturer of the construction material (e.g. the rolling mill or the tank manufacturer). Coated steel surfaces are to be coated with the same brand of coating. For large-scale projects it is recommended that the wall specimen units be retained for a subsequent comparison with the actual manufactured surface. It is presently not possible to characterize the wall surfaces in a manner such that the wall friction ratios can be reliably predicted. (4) If there is the possibility of subsequent exposure of the silo wall to corrosion or abrasion, then the wall friction tests should be conducted with wall specimens which make due allowance for the actual conditions that are present immediately after manufacture and those that arise after usage and wear and tear. NOTE 2
The constitution of the silo wall surface can change with time. Corrosion
can lead to roughening of the surface; subjection to abrasion can cause roughening as well as smoothening of the surface. Surfaces of materials such as polyethylene can become hollow and coated surfaces can get scratched. Silo walls can however also become smooth when fine particles from the bulk material such as fat or fine grains accumulate in the pores of the wall surface. These changes can lead to changes in the flow pattern, sometimes to such an extent that, for example, a core flow may arise in a silo designed originally for mass flow or vice versa. The horizontal or vertical loads can
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DIN 1055-6:2005-03 increase in silos with polished wall surfaces and the wall friction loads can increase in the case of silos with roughened surfaces. C.7.2 Coefficient of Wall Friction µ m for the Determination of Loads
C.7.2.1
Short Description
A bulk material specimen is sheared-off along an area that represents the wall surface and in the case of a corrugated sheet silo along a corrugated specimen. While doing this the shearing force is measured along the area that is sheared-off. NOTE
While interpreting the data from the shear tests, proper care should be
exercised to see whether the load calculations and inspection of the flow behaviour have been duly executed.
C.7.2.2
Test Apparatus
The apparatus for the test is shown in fig. C.2. The diameter of the bin must be at least 20 times the value of the diameter of the largest grain of the bulk material and may not be less than 40 times the value of the mean particle size. The height H of the compressed specimen must lie between 0.15 D and 0.2 D. In the case of wall specimens with discontinuities, e.g. in the case of a corrugated wall, the bin size has to be adjusted accordingly. NOTE
These restrictions relating to the grain size of the bulk material
are chosen due to the following reasons: the restriction on the maximum grain size of the bulk material would ensure that the arrangement and orientation of the bulk material grains are not unduly disturbed due to the influence of the enclosing wall. Moreover it is known that this influence is greater in the situation where all the particles have the same size, than in the situation where the smaller particles can take up the space between the
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larger particles. It is due to this reason that in case of uniform size of the particles a restriction of 40 times the size of the particle and in case of a wider range of particle-sizes a restriction of 20 times the maximum particle diameter is prescribed.
C.7.2.3. Procedure/Process (1) The largest horizontal load p h that arises in the silo is to be taken as the basis for the reference stress σ r . (2) The preparation of the specimen has to be in accordance with the procedure laid down in C.5. (3) The shearing of the specimen has to be executed in such a manner that a constant feed velocity of about 0.04 mm/s is ensured. (4) For the determination of the coefficients of wall friction the residual value of the frictional force Fr is to be used in the case of large deformations (see Fig. C.2) (5) The coefficient of wall friction for determination of loads are to be determined from the tests in the form of
µ=
Fr N
(C.1)
Where
Fr
Is the end or residual value of the shear force (see fig C.2b);
N
Is the vertical load placed upon the cover of the shear bin.
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C.7.3 Angle of Wall Friction ϕ wh for Analysis of Flow Behaviour (1) The angle of wall friction ϕ wh for the analysis of flow behaviour can be determined in accordance with the details given in fig. C.2. (2) The angle of wall friction for the analysis of flow behaviour of the bulk material is to be determined in case of low pressure levels.
N = σ rπ
Shear force F
2
D 4
µ= Fr
Fr N
H
F φD
1
a) Shear bin for measurement of wall friction
b)
typical
shearing-force
deformation relationships
Legend 1
wall sample
Figure C.2 - TEST PROCEDURE FOR THE DETERMINATION OF COEFFICIENTS OF WALL FRICTION
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C.8
Horizontal Load Ratio K
C.8.1 Direct Measurement
C.8.1.1 Test Principle Taking care to obstruct horizontal deformations, a vertical stress σ 1 has to be imposed upon a specimen and the horizontal stress σ 2 resulting from this strain has to be measured. The secant value of the horizontal load ratio K 0 has to be determined from this. NOTE 1
The size of the coefficient K 0 is dependant on the directions in which the
principal stresses build up in the specimen. For evaluation of the tests the horizontal and vertical stresses are to be regarded as an approximation of principal stresses in the specimen. As a rule this does not happen in the silo. NOTE 2
For specimens where horizontal deformations are obstructed, it must be
understood that horizontal elongations within the bulk material are restricted to such an extent that their influence on the stresses in the bulk material specimen are negligible. These elongations are, nevertheless, large enough to assume measurable proportions in the thin wall of the shear bin or in specific portions of the wall which are to be measured for concentrated elongations. Generally this criterion of restricted elongation in the bulk material specimen and the simultaneous measurability of the deformations in the apparatus wall is fulfilled by an average peripheral elongation of magnitude 1/10 per mil.
C.8.1.2
Apparatus
The geometry of the test apparatus can be seen in fig. C.3. the horizontal stresses are to be derived from the elongations that are measured at the periphery of the vertical ring.
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DIN 1055-6:2005-03 For this purpose the wall of the measuring bin must be thin enough and so designed that the stress level in the wall can be interpreted correctly and clearly. NOTE
Generally, a base plate which is separated from the ring of the bin wall is
required here so that both horizontal as well as vertical measurements are possible without any mutual interference. It is moreover necessary to position the points for measuring the elongations at adequate distance from the edges of the specimen. In addition, care should be taken to ensure that the elongations measured are linked with the internal horizontal stresses using a conversion factor, and that the bending of the walls of the test apparatus can be ignored in the relationship thus established. N =
π 4
D 2 (σ 1 + ∆ σ 1 )
σ2
1
(σ 2 + ∆σ 2 ) a
H b Kmo
φD a) Test equipment
σ1 b) Typical progression
of σ 2
with increasing σ 1 Legend a
smooth surface
b
rough surface
Figure C.3 - TEST PROCEDURE FOR DETERMINATION OF KO
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C.8.1.3
Procedure/Process
(1) The reference stress σ r has to be equivalent to the greatest level of vertical pressure
PV that is expected to build up in the bulk material stored in the silo. (2) The preparation of the specimen should comply with the procedure given in C.5 (3) The horizontal stress σ 1 in the specimen that arises due to the imposition of the vertical strain σ r - which corresponds to the reference stress σ 2 - is to be observed. The value of KO is to be calculated from these stress components (see fig. C.3) in the form: KO =
σ2 σ1
(C.2)
(4) The value of K is to be taken as:
K = 1.1K O NOTE
(C.3)
Using the factor 1.1 in equation (C.3), one should make allowance for the
difference between the horizontal load ratio (=KO ) in the shear bin which is measured in the (almost total) absence of wall friction influences and the value K under the influence of wall friction in the silo.
C.8.2 Indirect Measurement An approximate value of K can be derived from the angle of internal friction for the strain imposed ϕ i ; this can be determined either by the procedure laid down in C.9 or by a triaxial test. If the value K is being derived from ϕ i , the calculation in equation (7) is to be used.
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C.9
Stability Parameters: Cohesion c and Angle of Internal Friction ϕ i
C.9.1 Direct Measurement
C.9.1.1
Test Principle
The stability of a bulk material specimen can be determined using shearing bin tests. The two parameters c and ϕ i are to be used for describing the implications of the stability of the bulk material stored in the silo bins.
C.9.1.2
Apparatus
The equipment used for the test is a cylindrical shear bin in accordance with fig. C.4. The bin diameter must amount to at least 20 times the value of the largest grain diameter of the bulk material and must not be lesser than 40 times the value of the mean particle size. The height H of the compressed specimen must lie between 0.3D and 0.4D. NOTE
These restrictions relating to the grain size of the bulk material are chosen
due to the following reasons: the restriction on the maximum grain size of the bulk material would ensure that the arrangement and orientation of the bulk material grains are not unduly disturbed due to the influence of the enclosing wall. Moreover it is known that this influence is greater in the situation where all the particles have the same size, than in the situation where the smaller particles can take up the space between the larger particles. It is due to this reason that in case of uniform size of the particles a restriction of 40 times the size of the particle and in case of a wider range of particlesizes a restriction of 20 times the maximum particle diameter is prescribed.
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DIN 1055-6:2005-03 C.9.1.3 (1)
Procedure/Process
The reference stress σ r must be approximately equivalent to the greatest level of
vertical pressure p v that is expected to build up, acc. to C.2, in the bulk material stored in the silo. The preparation of the specimen must be carried out in accordance with the procedure given in C.5. (2)
The shearing of the specimen must be done at a constant feed velocity of about
0.04 mm/s. (3)
The determination of the stability parameters has to be based upon the shear
stress τ determined during or before a horizontal displacement of ∆ = 0.06 D , with D being the internal bin diameter (see fig. C.4)
N = σ rπ
D2 4
D2 F = τπ 4 H
a φD a) Shear bin
157
τa 1
τb 2
Transverse stress which is measured
transverse stress τ
DIN 1055-6:2005-03
τb φc
τ
φi σb
Shear bin displacement
τa
σa
Normal stress σ
(b)
(C)
b) Typical curve depicting shear stress and displacement c) Typical relationship between shear stress and normal stress as measured in a shear test
Legend 1)
Curve a
2)
Curve b
Figure C.4 - TEST PROCEDURE FOR THE DETERMINATION OF THE ANGLES OF INTERNAL FRICTION ϕ i AND ϕ c AND THE COHESION c BASED ON THE STRESS σ r IMPOSED DURING THE PRECOMPRESSION (4)
There are at least two tests to be conducted acc. to the conditions defined under
(5) and (6) (table C.1 and fig. C.4) (5)
For determination of the transverse stress τ a one material specimen is to be
subjected to a normal load equivalent to the reference stress σ r (6)
Then a second specimen is to be initially subjected, like the first specimen, to a
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DIN 1055-6:2005-03 normal load that is equivalent to the reference stress σ r - but only until the shearing. There after the normal load is to be reduced to about half the value of the reference stress ( σ b ≈
σr 2
). Subsequently it is to be further sheared at this stress level in order to
get the maximum transverse stress τ b (see fig. C.4b). the stresses determined in these two tests are listed in the Table C.1.
TABLE C.1 - TEST PARAMETERS ` TEST
AMOUNT
OF
PRELIMINARY STRAIN
No.1
NORMAL STRESS
MAX
IN THE TEST
MEASURED
σr
σr
No.2
σr
C.9.1.4 (1)
TRANSVERSE
σb ≈
STRESS
τa σr
τb
2
Evaluation The angle of internal friction when the stored bulk material is subject to strain is to
be determined using ⎛τa ⎞ ⎟⎟ ⎝σr ⎠
ϕ i = arctan⎜⎜
(2)
(C.4)
The cohesion c activated in the bulk material under reference stress σ r is to be
calculated using
c = τ a − σ r tan ϕ c
(C.5)
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With ⎛ τ a −τ b ⎝σr −σb
ϕ c = arctan⎜⎜
⎞ ⎟⎟ ⎠
(C.6)
Where
ϕ c The angle of internal friction in case of strain relief of a super critically consolidated specimen NOTE 1
The value of the cohesion c is largely dependant upon the
consolidating stress σ r and as such it cannot be regarded as a full-fledged material parameter. (3)
For a bulk material without cohesion (i.e. c = 0), the shear resistance should only
be described in terms of the angle of internal friction ϕ i - which then corresponds to ϕ c .
C.9.2 Indirect Measurement (1)
The cohesion of a bulk material can also be determined approximately from the
results of shear tests with a shear bin of Jenike. (2)
The cohesion should be determined within the pressure ratios corresponding to
the maximum vertical pressure σ vft n the silo after filling (see designs in C.2).
(3)
The maximum vertical pressure in the silo after the filling σ vft is to be fixed as the
maximum consolidating stress σ c .
(4)
The uni-axial yield stress σ u which corresponds to this consolidating stress is to
be determined from the flow function. In addition the angle of the effective internal friction
δ under the corresponding conditions of stress is to be determined. 160
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(5)
The foll. Approximate values for cohesion can be determined: ⎛ sin δ − sin ϕ c ⎞ ⎟⎟ c = σ c ⎜⎜ ( ) cos ϕ 1 sin δ + c ⎝ ⎠
(C.7)
ϕ c = arcsin⎜
⎛ 2 sin δ − K ⎞ ⎟ ⎝ 2−K ⎠
(C.8)
⎛σ ⎞ K = ⎜⎜ c ⎟⎟(1 + sin δ ) ⎝σu ⎠
(C.9)
With
Where
σc
The maximum consolidating stress in the Jenike shear bin test
σu
The uni-axial yield stress obtained from the Jenike shear bin test
δ
The effective angle of the internal friction obtained from the Jenike shear bin test
ϕc NOTE 1
Angle of internal friction during the stress relief (see fig. C.4c)
The magnitude of cohesion c depends greatly on the consolidating stress
and as such does not represent an independent material parameter of the bulk material. (6)
An approximate value for the angle of internal friction during stress relief ϕ i can be
obtained from the Jenike shear bin test (C.10) ⎛ sin δ cos ϕ c ⎝ 1 − sin ϕ c sin δ
ϕ i = arctan⎜⎜
NOTE 2
⎞ ⎟⎟ ⎠
(C.10)
The two parameters c and ϕ i are used in this norm only for assessing the
effects of the bulk material stability on the silo pressures.
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C.10 Effective Modulus of Elasticity ES C.10.1 Direct Measurement
C.10.1.1 Test Principle A vertical load σ 1 is imposed upon a specimen placed laterally. For each increment of the load ∆σ 1 (vertical) the resulting horizontal stress ∆σ 2 and the change in the vertical displacement ∆V1 are to be measured. The effective elasticity modulus for the imposed strain E sL (modulus of strain) is to be derived from these measurements using the horizontal load ratio K . The vertical load is to be thereafter reduced by the amount ∆σ 1 and the horizontal stress ∆σ 2 and vertical displacement ∆V2 to be measured. From these measurements the effective elasticity modulus for stress relief (relief modulus) is to be derived. NOTE 1
The magnitude of E s and E su depends upon the direction of the principal
stresses in the specimen. The horizontal and the vertical stresses in the specimen are approximately equivalent to the principal stresses; as a rule this does not happen in a silo. NOTE 2
For specimens where horizontal deformations are obstructed, it must be
understood that horizontal elongations within the bulk material are restricted to such an extent that their influence on the stresses in the bulk material specimen are negligible. These elongations are, nevertheless, large enough to assume measurable proportions in the thin wall of the test apparatus. Generally an average peripheral elongation of magnitude 1/10 per mil fulfills this criterion.
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C.10.1.2
Apparatus
(1) The geometry of the test apparatus can be seen in fig. C.5. It is similar to the apparatus described in C.8 for measuring the horizontal load ratio K. (2)The horizontal stresses are to be derived from the elongations that are measured at the periphery of the vertical ring. For this purpose the wall of the measuring bin must be thin enough and so designed that the stress level in the wall can be interpreted correctly and clearly. NOTE
Generally, a base plate that is separated from the bin walls is required here
so that both horizontal as well as vertical measurements are possible without any mutual interference. It is moreover necessary that the elongations are measured at an adequate distance from the edges of the specimen. In addition, care should be taken to ensure that the elongations measured are proportional to the internal horizontal stresses and that the bending of the walls of the test apparatus can be ignored in this relationship. (2)
It must also be ensured that vertical deformations of the specimen in suitably small amounts will occur.
163
N =
π 4
D 2 (∆ σ 1 )
∆V1
a
H
(∆σ 2 )
b
Vertical displacement increment ∆V
DIN 1055-6:2005-03
∆Vu ∆VL ∆σ1
φD
Vertical stress increment ∆σ
a) Test equipment
b) typical vertical displacement for vertical increments of stress ∆σ 1
Legend a
smooth surface
b
rough surface
Figure C.5 – TEST PROCEDURE FOR THE DETERMINATION OF THE ELASTICITY MODULI DURING STRAIN IMPOSITION AND STRAIN RELIEF
C.10.1.3 (1)
Procedure/Process
The highest level of vertical pressure pV that can be expected in the bulk material
stored in the silo is to be taken as the reference stress σ r (2)
The specimen is to be prepared in accordance with the procedure given in C.5.
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DIN 1055-6:2005-03 (3)
After the imposition of a vertical load σ 1 which corresponds to the reference
stress σ r , the readings for horizontal stresses and vertical deformations are to be taken. The height of the material specimen H is to be measured carefully (see C.6.3). (4)
After a small increment of the vertical stress ∆σ 1 , the horizontal stresses and the
vertical deformations have to be measured again. The increment of the vertical stresses may be chosen as approximately 10% of the reference stress σ 1 . (5)
The change in the horizontal stress ∆σ 2 as a consequence of the vertical load
increments ∆σ 1 is to be determined and the changes in the vertical displacements ∆V (both negative) are to be measured. The incremental value of K under subjection to strain is then to be determined in the form of KL :
⎛ ∆σ 2 K L = ⎜⎜ ⎝ ∆σ 1
(6)
⎞ ⎟⎟ ⎠
(C.11)
The effective elasticity modulus E sL under subjection to strain may then be derived
as follows
E sL
(7)
2 2K L ∆σ 1 ⎛ ⎜ 1− =H ∆v ⎜⎝ 1 + K l
⎞ ⎟ ⎟ ⎠
(C.12)
Subsequently a minor incremental reduction of the vertical strain ∆σ 1 has to be
made (to be treated as a quantity with a negative sign) and the resultant changes in the horizontal stresses and the vertical deformations are to be measured. The increment of the vertical strain ∆σ 1 should amount to approx. 10% of the reference stress σ 1 .
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(8)
The change in the horizontal stress ∆σ 2 as a consequence of the vertical load
increments ∆σ 1 is to be determined and the changes in the vertical displacements ∆V (both negative) are to be measured. The incremental value of K in case of strain relief is then to be determined in the form of KU : ⎛ ∆σ 2 K U = ⎜⎜ ⎝ ∆σ 1
(9)
⎞ ⎟⎟ ⎠
(C.13)
The effective elasticity modulus E sU in case of strain relief may then be derived as
follows
E sU
NOTE
2 2KU ∆σ 1 ⎛ ⎜ =H 1− ∆v ⎜⎝ 1 + K U
⎞ ⎟ ⎟ ⎠
(C.14)
The effective elasticity modulus in case of strain relief is usually far greater
than the elasticity modulus in case of subjection to strain. In a case where a greater elasticity modulus is harmful for the supporting framework (e.g. in case of temperature changes) the strain-relief elasticity modulus is to be used. Should the elasticity modulus of the bulk material be favourable for the structure (e.g. in case of thin-walled rectangular silos), the elasticity modulus for strain-imposition (strain-imposition modulus) is to be used.
C.10.2 (1)
Indirect Measurement For the purpose of assisting the specific inspection of the adjustment of the test,
an approximate value EsU may be determined as follows:
E sU = χPvft
(C.15)
Where
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Pvft
The vertical stress at the lower end of the vertical wall section (equation (11) or (86));
χ NOTE
The contiguity coefficient
The effective elasticity modulus for stress-relief EsU and the vertical stress
Pvft have the same unit in equation (C.15)
(2)
In case of missing experimental test data in accordance with the procedure in
C.10.1 the contiguity coefficient χ can be calculated as follows:
χ = 7γ
3 2
(C.16)
Where for γ the specific gravity of the bulk material expressed in kN/m3 is to be substituted. (3)
Alternatively the value of χ can be fixed at 70 for dry agricultural cereal products,
at 100 for small-sized mineral grains and at 150 for large-sized mineral grains.
C.11 Determination of the Upper and Lower Characteristic Values of the Bulk Material Parameters and Calculation of the Conversion Factor a
C.11.1 (1)
Test Principle The silo is to be designed for the most unfavourable conditions of strain which it
can be exposed to during its course of its use. This section deals with the assessment of variances in the bulk material parameters which can occur at the time of the design calculations.
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NOTE 1
it is possible that the parameters of the stored bulk material can undergo
changes during the service life. These changes that occur over a period of time cannot be easily assessed. (2)
The extreme values of the calculated loads are described in terms of their
characteristic values. These are values – normally 5% and 95% fractile values - which are not exceeded during the designated service life or the course of the assessment period given the recognized predicted probabilities. (3)
The extreme values of the parameters which are necessary for the achievement of
this extreme load level are the characteristic values of the bulk material parameters. (4)
For the determination of the decisive load ratios both the upper as well as the
lower characteristic values are to be used. (5)
The simplified procedure described here is to be used while viewing the
characteristic value on the basis of 1.28 times the standard deviation from the mean value. NOTE 2
The corresponding material parameters for a specific probability of
exceeding the load level depends on the geometry, the absolute size of the tank, the type of load and whether the loads are to be viewed in the vertical silo shaft or the hopper. In addition these values are influenced by the moisture content, the temperature, and the tendency of sedimentation and the age of these values. NOTE 3
as shown in the above passage, there are several bulk material properties,
each distinct from the other, which contribute to the characteristic loads. Therefore a 10 or 90 percentage value of each of the characteristic values is regarded as a suitable and reasonable estimate for the value which represents an adequate occurrence-possibility for the design load.
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(6)
For calculation of the relevant load conditions the upper as well as the lower
characteristic values of the relevant parameters are to be used.
(7)
In case adequate experimental data is available, the characteristic values are to
be calculated using statistical methods. NOTE 4
Although test data is helpful for the determination of characteristic values, it
has its limitations such as limitations on account of specimen size, on account of the process of specimen preparation etc. This may lead to a situation where the data for all the properties relevant to the operation life may be unrepresentative. NOTE 5
the values in Table E.1 are worked backwards from the assessments which
are based upon a combination of experience and actual data from experiments. (8)
In case the designer or the customer has at his disposal data or experimental
values for a specific design calculation, he can derive the characteristic bulk material parameters from this data if it represents the range of parameters of the bulk materials used during the service life.
C.11.2 (1)
Methods for Assessment For calculating the characteristic values of each parameter the following
procedures can be used. The variable Χ represents the characteristic values observed in each case.
(2)
The mean value of the characteristic value Χ is to be calculated from the test
data.
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(3)
Wherever possible, the coefficient of variation δ is to be determined from the
available test data. (4)
If the test data is not suitable for determining a coefficient of variation, a suitable
value is to be estimated for the bulk material. Table C.2 can be used as a guide here. (5)
The upper characteristic value of a parameter ( X U = X 0,90 ) is to be determined
using
X 0,90 = X (1 + 1.28δ )
(6)
(C.17)
The lower characteristic value of a parameter ( X U = X 0,90 ) is to be determined
using
X 0,10 = X (1 − 1.28δ )
(7)
The conversion factor a X of a parameter is to be determined using aX =
(8)
(C.18)
1 + 1.28δ ≈ 1 + 1.28δ + δ 2 1 − 1.28δ
(C.19)
When estimating the value of the conversion factors, the coefficients of variation δ
for the bulk material specific gravity have to be fixed at 0.10. In case of other bulk material parameters the values are to be estimated using the specifications for the bulk materials with similar properties listed in the Table C.2.
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TABLE C.2 --- TYPICAL VALUES OF THE COEFFICIENTS OF VARIATION FOR THE BULK MATERIAL PARAMETERS COEFFICIENT OF VARAITION
δ
ANGLE OF HORIZONTAL BULK
LOAD
MATERIAL
RATIO
K
COEFFICIENT OF WALL FRICTION
INTERNAL
µ
FRICTION
ϕi in degrees
category of wall-roughness D1
D2
D3
Gravel for Concrete
0.11
0.11
0.09
0.09
0.09
Aluminum
0.14
0.16
0.05
0.05
0.05
Fodder concentrate mix
0.08
0.06
0.16
0.19
0.19
Fodder concentrate pellets
0.05
0.05
0.14
0.14
0.14
Barley
0.08
0.10
0.11
0.11
0.11
Cement
0.14
0.16
0.05
0.05
0.05
Cement Clinker
0.21
0.14
0.05
0.05
0.05
Coal
0.11
0.11
0.09
0.09
0.09
Coal dust
0.14
0.18
0.05
0.05
0.05
Coke
0.11
0.11
0.09
0.09
0.09
Fly Ash
0.14
0.12
0.05
0.05
0.05
Flour
0.08
0.05
0.11
0.11
0.11
Iron Pellets
0.11
0.11
0.09
0.09
0.09
Calcium Hydrate
0.14
0.18
0.05
0.05
0.05
Limestone Powder
0.14
0.16
0.05
0.05
0.05
Maize
0.10
0.10
0.17
0.17
0.17
Phosphate
0.11
0.13
0.09
0.09
0.09
Potatoes
0.08
0.09
0.11
0.11
0.11
Sand
0.08
0.07
0.11
0.11
0.11
Slag Clinker
0.08
0.07
0.11
0.11
0.11
Soya Beans
0.08
0.12
0.11
0.11
0.11
Sugar
0.14
0.14
0.05
0.05
0.05
Sugar Beet Pellets
0.11
0.11
0.09
0.09
0.09
Wheat
0.08
0.09
0.11
0.11
0.11
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ANNEX D (NORMATIVE)
ASSESSMENT
OF
THE
BULK
MATERIAL
PARAMETERS
FOR
THE
DETERMINATION OF SILO LOADS
D.1
Aim
This annex describes methods for the assessment of the characteristic values of bulk materials which are required in this standard for the purpose of calculating silo loads and cannot be determined experimentally by means of tests.
D.2
Assessment of the coefficients of wall friction for a corrugated wall
(1)
The effective wall friction coefficient for D4 type of wall (corrugated or contoured-
metal sheet or metal sheet with horizontal slits) is to be determined from
µ eff = (1 − a w ) tan ϕ i + a w µ w
(D.1)
Where
µ eff
Effective coefficient of wall friction
ϕi
Angle of internal friction
µw
Coefficient of wall friction (against a level wall surface)
aw
Wall contact factor
NOTE 1
The effective wall friction depends on the angle of internal friction of the
bulk material, the coefficient of wall friction against the level wall and on the profile of the wall surface.
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(2)
The parameter aw in equation (D.1), which represents the portion of the sliding
surface against the wall surface, is to be determined from the geometry of the profile of the wall surface, with allowance being made for a suitable estimate of the contact zones that have been activated between the bulk material and the wall surface (see fig. D.1) (3) For corresponding depths of the folds and the waves a simple estimate can be made with equation (D.2):
aw =
NOTE 2
bw bw + bi
The interface between sliding surfaces and stationary zones is in contact
partially with the wall and partially with the broken surface within the bulk material. The portion which slides along wall surface is expressed using the factor aw . This portion cannot be easily determined and its estimation depends on the profile of the wall surface.
1 1
b
b bi bi
2
2
3 3
a)
Trapezoidal folded profile
b)
Sinusoidal wavy profile
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Legend 1
bulk material
2
bulk material flow
3
sliding surface
Figure D.1 – DIMENSIONS OF THE CONTOURING OF THE WALL SURFACE NOTE 3
For wall surface contouring which resemble the one in fig. D.1b, the factor
a w can be taken as approximately 0.20.
D.3
Internal Friction and the Wall Friction of a Coarse Bulk Material without
Fines The coefficient of wall friction µ and the angle of the internal friction ϕ i cannot be easily determined in case of coarse bulk materials without fines (e.g. lupin, peas, beans and potatoes). In such cases, in place of the angle of internal friction one has to take the gradient of slope ϕ r of a bulk material heap (debris cone) which is loosely fed on to a level base plate.
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ANNEX E (Normative)
Details of Bulk Material Parameters This annex specifies parameters for a few bulk materials commonly stored in silos, which are to be used as characteristic values for design calculations. Table E.1 – Bulk Material Parametersa Density γ
Gradi
Angle of
Horizontal load
Coefficient of wall frictionb
Paramet
ent of
internal
ratio
µ
er for
slope
friction
K
( µ = tan ϕ w )
referenc
3
ϕr
kN/m
ϕi
degree
e
(Mean value)
surface
degre
Type of
load
e
bulk
ϕ im
material
C op
aq Wall
Wall
Wall
Conver
Lower
Upper
Mea
Conv
Mean
Conver
type
type
type
sion
value
value
n
ersion
value
sion
D1
D2
D3
factor
γ1
γ2
valu
factor
Km
factor
e
aµ
ak
general bulk
6.0
22.0
40
35
1.3
0.50
1.5
0.32
0.39
0.50
1.40
1.0
17
18
36
31
1.16
0.52
1.15
0.39
0.49
0.59
1.12
0.4
10
12
36
30
1.22
0.54
1.2
0.41
0.46
0.51
1.07
0.5
5
6
39
36
1.08
0.45
1.1
0.22
0.30
0.43
1.28
1
6.5
8
37
35
1.06
0.47
1.07
0.23
0.28
0.37
1.20
0.7
material Concrete gravel Aluminium Concentrat ed feed mixture Concentrat ed feed pellets
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7
8
31
28
1.14
0.59
1.11
0.24
0.33
0.48
1.16
0.5
Cement
13
16
36
30
1.22
0.54
1.2
0.41
0.46
0.51
1.07
0.5
15
18
47
40
1.20
0.38
1.31
0.46
0.56
0.62
1.07
0.7
Coal
7
10
36
31
1.16
0.52
1.15
0.44
0.49
0.59
1.12
0.6
Coal dust
6
8
34
27
1.26
0.58
1.2
0.41
0.51
0.56
1.07
0.5
6.5
8
36
31
1.16
0.52
1.15
0.49
0.54
0.59
1.12
0.6
8
15
41
35
1.16
0.46
1.20
0.51
0.62
0.72
1.07
0.5
Flour
6.5
7
45
42
1.06
0.36
1.11
0.24
0.33
0.48
1.16
0.6
Iron pellets
19
22
36
31
1.16
0.52
1.15
0.49
0.54
0.59
1.12
0.5
6
8
34
27
1.26
0.58
1.20
0.36
0.41
0.51
1.07
0.6
11
13
36
30
1.22
0.54
1.20
0.41
0.51
0.56
1.07
0.5
Maize
7
8
35
31
1.14
0.53
1.14
0.22
0.36
0.53
1.24
0.9
Phosphate
16
22
34
29
1.18
0.56
1.15
0.39
0.49
0.54
1.12
0.5
Potatoes
6
8
34
30
1.12
0.54
1.11
0.33
0.38
0.48
1.16
0.5
Sand
14
16
39
39
1.09
0.45
1.11
0.38
0.48
0.57
1.16
0.4
Slag clinker
10.5
12
39
36
1.09
0.45
1.11
0.48
0.57
0.67
1.16
0.6
Soya beans
7
8
29
25
1.16
0.63
1.11
0.24
0.38
0.48
1.16
0.5
Sugar
8
9.5
38
32
1.19
0.50
1.2
0.46
0.51
0.56
1.07
0.4
6.5
7
36
31
1.16
0.52
1.15
0.35
0.44
0.54
1.12
0.5
7.5
9.0
34
30
1.12
0.54
1.11
.24
0.38
0.57
1.16
0.5
Cement clinkerc
Coke Fly ash
Lime hydrate Limestone powder
Sugar beet pellets Wheat
NOTE The upper characteristic value xx of the bulk material density lower characteristic value
γθ
γ u is to be always used when determining the silo loads. The
in table E.1 is meant to support calculations for storage capacities when, for example, a certain specified
storage capacity has to be ensured. A
When a bulk material that is not in the list has to be stored, then tests should to be conducted. If the expense incurred on the tests is not justified, esp. if an assessment of the expense shows that the wide spectrum of values used for
calculations would have only marginal Effect on the overall effort, then the values given in the so-called ‘general bulk material’ category may be used. These values can be particularly appropriate for small silo loads. For Large silo loads, however, these values generally result in unviable calculations. As a rule, in such cases tests are preferable. b C
The effective wall friction coefficient for wall type D4 (corrugated wall) can be assessed according to D.2
The bulk material shows a tendency to mechanically interlock leading to arching or discharge disturbances.
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ANNEX F (NORMATIVE)
DETERMINATION OF THE FLOW-PROFILE, MASS-FLOW AND CORE-FLOW The dimensioning of silos - with respect to their flow profiles - in terms of functional process technology is not included within the scope of this standard. The following information has been provided in order to enable a safe estimate about whether specific load ratios for mass flow conditions are present in a prospective silo design. This information is moreover necessary when alternate procedures for determination of hopper loads as given in Annex H are used.
Coefficient of wall friction in the hopper, µh
a) Conical hopper
Conical hopper 2 1.8 1.6 1.4 1.2 1 0.8 0.6 0.4 0.2 0
Series1
Series2
0
20
40
β
at the hopper apex, in degrees
Half-angle
60
80
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DIN 1055-6:2005-03
b) Cuneiform hoppe
Coefficient of wall friction in the hopper, µh
2 1.8 1.6 1.4 1.2
Series1
1 0.8
Series2
0.6 0.4 0.2 0 0
20 Half-angle
40 β
60
80
at the hopper apex
Legend 1
core flow
2
mass flow
3
mass flow or core flow can occur between the two lines
Figure F.1 – BOUNDARIES FOR MASS FLOW AND CORE FLOW CONDITIONS IN CASE OF CONICAL AND CUNEIFORM HOPPERS
NOTE
In the zone between the boundary lines of mass flow and core flow
the flow profile that arises depends on other parameters which are not included in this standard.
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ANNEX G (Normative)
Seismic Actions
G.1
General
(1) This annex lays down general guidelines for calculations of silos under seismic actions. These rules for calculations complement the general rules in DIN 4149 for design calculations under seismic conditions. (2) The value for the acceleration due to earthquakes for the silo structure has to be fixed according to EN 1998.
G.2
G.3
Symbols α
horizontal acceleration due to earthquakes
∆ph.so
additional horizontal loads due to seismic actions
Conditions during Calculations ---
Horizontal acceleration and the resultant horizontal and vertical loads on the silo structures (or the silo substructure) and the foundation (G.4.1);
---
Additional loads on the silo walls (G.4.2);
---
Rearrangement of bulk material at the material surface in the filled-up silo. The seismic actions can lead to a situation where a slide surface develops in the filled up bulk material cone in the vicinity of the bulk-material’s
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DIN 1055-6:2005-03 surface. This can pose a threat to the silo roof and the upper regions of the silo walls due to additional horizontal loads (see diagram G.1)
1
2
`Legend 1
slide surface during seismic actions
2
bulk material surface after the seismic action
Figure G.1 POSSIBLE REARRANGEMENT OF BULK MATERIAL SURFACE DUE TO SEISMIC ACTIONS
G.4
Seismic Actions
Directions for calculating the seismic actions are given in G.4.1 for the silo substructure and in G.4.2 for the silo walls.
G.4.1 Silo Substructures and Foundations Seismic actions due to the accelerated mass of the silo structure and the stored bulk material can be regarded as individual loads, which place a strain at the centre of gravity of the mass of the silo structure and the stored bulk material (see diagram G.2).
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Fs
Figure G.2 Seismic actions for the substructure (e.g. the supports)
G.4.2 Silo Walls (1) The influence of seismic actions on the silo walls has to be taken into account using an additional horizontal load portion. This has to be superimposed with the loads from the stored bulk material according to sections 7 and 8. The overall load is equivalent to the mass of the bulk material multiplied by the value of the horizontal acceleration due to earthquake α. (2) The reference value of the additional normal loads on the silo walls due to seismic effects is given,
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DIN 1055-6:2005-03
For a silo with a circular cross-section and diameter dc, by the foll. equation:
∆ph.so = γ
α dc
(G.1)
g 2
And for a rectangular silo with the width b the equation is:
∆ph.so = γ
αb g2
(G.2)
Where γ
is the bulk material density;
α
is the horizontal acceleration due to the earthquake;
g
is the acceleration of the fall.
(3) The additional loads normal to the silo walls may be assumed to be evenly distributed across the height of the silo. At the upper end of the silo wall one has to add the resultant forces – acting from inside outwards -- of the bulk material loads due to filling and discharging, and the additional seismic horizontal loads – never smaller than zero (no negative values). (4) The assumed horizontal distribution of the additional loads ∆ph.s = ∆ph.s is shown in diagram G.3.
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For a circular silo the additional load is to be found using the equation:
∆ph.s = ∆ph.so cosθ
(G.3)
For a rectangular silo ∆ph.s has to be fixed using the equation: ∆ph.s = ∆ph.so
(G.4)
∆Ph,s
∆Ph,s
∆Ph,s
a
θ ∆Ph,so
b a) cross-section of circular silo
b) cross-section of rectangular silo
FIGURE G-3 Cross-section across the vertical silo shaft with details of the additional horizontal loads due to seismic actions
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DIN 1055-6:2005-03
ANNEX H (NORMATIVE)
ALTERNATE RULES FOR THE DETERMINATION OF HOPPER LOADS
H.1
General
(1)
This annex gives two alternate procedures for estimation of bulk material loads on
hoppers. (2)
H.5 can be used for the description of loads not only for fill loads but also for
discharge loads. It must however be noted that the sum of these loads is not equivalent to the weight of the bulk material stored in the hopper. The given load formulation in the hopper is to be regarded as an envelope load profile which acts on the hopper walls during filling and during discharge. (3)
For fill loads in the case of steep hoppers, the equations given in H.7 can be used
as an alternative to the formulations given in 8.3.
H.2
Definitions
The following definitions are applicable to this Annex.
H.2.1 Peak Load (Kick Load) Peak load which can occur at the hopper junction in case of a mass flow during the emptying of a silo
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DIN 1055-6:2005-03
H.3
Symbols
lh
Distance between the hopper peak and the hopper junction along the inclined surface (see fig. H.1)
pn
Loads acting vertically upon the inclined hopper wall
pn i
Different load components acting vertically upon the inclined hopper wall (i = 1, 2 and 3)
ps
Load peak at the hopper junction
H.4
Dimensioning Conditions
(1)
The hopper is to be designed for the state prevailing after the filling and for discharge loads.
(2)
The flow pattern of the bulk material that is to be expected for the hopper is to be determined by fig. F.1
(3)
In case both core flow and mass flow can occur in the silo, these effects are both to be taken into account during dimensioning.
H.5
Loads on the Hopper Walls
(1)
For an inclination of the hopper walls vis-à-vis the horizontal α that is greater than 20° (see fig. 1b), the loads acting vertically on the inclined hopper walls p n are to be calculated as follows:
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DIN 1055-6:2005-03
NOTE
see NOTE in H.4
p n = p n 3 + p n 3 + ( p n1 − p n 2 )
x ln
(H.1)
With
(
pn1 = pvf Cb sin 2 β + cos 2 β
pn 2 = pvf Cb sin 2 β
p n 3 = 3.0
A γK s cos 2 β U µh
)
(H.2)
(H.3)
(H.4)
Where
β
Inclination of the hopper walls vis-à-vis the vertical (see fig. H.1)
x
Distance between the lower end of the hopper and the observed position (amount between 0 and xx) according to fig. H.1 (with ref. to the inclined surface)
pn1
And p n 2 are parts which describe the hopper loads caused by filling of the hopper
µh
Lower characteristic value of the coefficient of wall friction in the hopper
Ks
Upper characteristic value of the horizontal load ratio of the stored bulk material
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DIN 1055-6:2005-03
pn 3
The part of the load portion caused by the vertical pressures (of the bulk material stored in the vertical silo shaft) at the hopper junction/ hopper’s starting-point
Cb
Bottom load enlargement ratio
pvf
Vertical load at the hopper’s staring point after the filling in accordance with equation (11) or (86)
(2)
The wall friction loads pt are given by:
pt = p n µ h
(H.5)
Where
pn represent the hopper loads acting vertically on the hopper wall according to equation (H.1) (3)
For silos with possible mass flow, allowance is to be made for an additional load
portion p s at the hopper junction (see fig. H.1). this load portion is to be calculated actively from the hopper junction, measured across a length of 0.2d c and along the entire periphery of the hopper.
p s = 2 Kp vft
(H.6)
Where pvft is the vertical load portion of the fill load in the bulk material at the hopper’s starting point, calculated according to equations (11) or (86).
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Phft lh pt
Pn3 Pn1
x
Ps
β
Pn3
Pn2
Ps 0.2dc
Figure H.1 – ALTERNATIVE RULES FOR THE HOPPER LOADS H.6
Determination of the Connecting Forces at the Hopper Junction
The connecting forces in the hopper at the hopper junction are to be derived using the equilibrium conditions. For the loads arising from covering up of the hopper, the bottom load enlargement ratio C b is to be calculated.
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H.7
Alternate Equations for the Hopper Load Correction Value xx for Discharge Loads
In case of discharge loads in a hopper with steep walls, the mean vertical pressure at any position in the bulk material is to be calculated according to the equations (116) and (117) using the following parameter Fe :
⎛ 1 Fe = ⎜⎜ ⎝ 1 + µ cot β
⎡ ⎛ sin φi ⎞⎧⎪ ⎟⎟⎨1 + 2⎢1 + ⎜⎜ ⎠⎪⎩ ⎣ ⎝ 1 + sin φi
⎞⎛ cos ε sin (ε − β ) ⎞⎤ ⎫⎪ ⎟⎟⎜⎜ ⎟⎟⎥ ⎬ sin β ⎠⎦ ⎪⎭ ⎠⎝
(H.7)
In which
⎧ sin φ wh ⎫ ⎞ 1⎛ ε = β + ⎜⎜ φ wh + arcsin ⎨ ⎬ ⎟⎟ 2⎝ sin φ i ⎭⎠ ⎩
(H.8)
ϕ wh = arctan µ h
(H.9)
Where
µh
Lower characteristic value of the coefficient of wall friction in the hopper
ϕi
Angle of internal friction of the saved bulk material
NOTE The equation (H.7) is to be used instead of the equation (128). The equation (H.7) for Fe is founded on the somewhat complex Theory of Enstad for discharge press
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ANNEX I (NORMATIVE)
INFLUENCES DUE TO DUST EXPLOSIONS
I.1
General
This Annex contains instructions for making allowance for dust explosions in silo structures.
I.2
Application
(1)
This section is applicable to all silo structures and other comparable structures
where non-toxic combustible and explosive powders are processed or stored or accumulate in large quantities in the form of waste matter. (2)
It does not apply to those structures in which explosions are ruled out by means of
specific measures. (3)
This annex can be used for the retrofitting of the existing structures. In such case
the actual state of the structure is to be taken into account, not its planned state. In case of doubt an expert opinion has to be sought.
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DIN 1055-6:2005-03
I.3
Additional Standards, Guidelines and Regulations
Listed below are the additional standards, guidelines and regulations that are relevant to the planning and the operation of a silo structure. - DIN-Fachbericht 140, Silo Structures designed against Dust Explosions - DIN EN 26184-1, Explosion Protection Systems – Part 1: Determination of Explosive Characteristics of Combustible Dusts in the Atmosphere - DIN EN 1127-1, Explosive Atmospheres – Explosion Protection – Part 1: Basis and Methodology DIN EN 50014, Electrical Equipment for Explosion Hazard Areas – General Rules VDI 2263, Dust Fires and Dust Explosions; Risks, Evaluation, Protective Measures
I.4
Explosive Dusts and their Characteristic Values
(1)
The dust from several bulk materials which are normally stored in the silo
structures are explosive in nature. Explosions can occur when organic or inorganic dust having sufficiently small particle size reacts exothermically with acid and thereby causes a swiftly progressive reaction. (2)
During an explosion of dust from bulk material normally stored in silos,
overpressures ranging from 8 bars to 10 bars can occur in closed spaces without vents. (3)
The characteristic values for the explosive behaviour of dust are: --
The dust characteristic value K st
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DIN 1055-6:2005-03 --
The max. Explosive overpressure p max
dp of the rising pressure dt
(4)
The dust parameter K st corresponds to the max. Speed
(5)
Both values are determined in accordance with standardized procedures (see
DIN-Fachbericht 140 and DIN 26184-1) (6)
The principal explosive dust-types are: brown coal, cellulose, pea-flour, fly ash,
fodder, feed-mix concentrate, barley, corn flour, rubber, resin, wood dust, coffee, potato flour, coke, maize flour, maize starch (dry), milk powder, paper, pigment, Soya meal, Soya flour, hard coal, wheat flour, washing agents and sugar.
I.5
Sources of Ignition
Small quantities of energy are generally adequate for igniting these dust particles. The following sources of ignition are of particular significance in silo bins and associated spaces e.g. silo cellars, connecting passages and stairwells -
hot surfaces e.g. those which are caused by friction of defective structural
components, or sparks such as those caused by foreign bodies in the hoisting devices, sparks during welding, grinding and cutting during repairs, smoulder spots which can also enter into the silo bin from outside along with the bulk material. -
Unsuitable or defective electrical equipment (e.g. incandescent bulbs)
-
Heat generated due to drying
-
Self ignition due to electrostatic discharge
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I.6
Protective Measures
(1)
The damage caused by a dust explosion can be minimized by containing the
explosion as far as possible within the area in which the igniting occurs. For this purpose explosion zones have to be demarcated. The spreading of the explosion to another area is to be avoided. The explosive overpressures are to be minimized. (2)
The consequences of an explosion can be minimized by providing for suitable
precautionary measures during planning (e.g. the provision and demarcation of relevant explosion zones). (3)
The individual building sections between the explosion barriers are to be
dimensioned for one of the following two conditions: --
If no pressure relief has been provided, the zones must be dimensioned for the
max. Explosive overpressure p max --
If a suitable relief has been provided, the zones must be dimensioned with the
largest reduced overpressure p red or p red , ges .
(4)
The amount of the reduced explosive overpressures p red or p red , ges depend on the
type of the dust, the size of the zone where pressure relief has to be effected and the vents, and the opening pressure and the inertia of the depressurizing system.
(5)
The inflammable emission coming out of a vent should not have any adverse
effect on the surroundings nor be allowed to transmit the explosion to any other explosion zone.
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(6)
There should be no danger to people on account of splinters from panes or other
components. Vents should therefore lead out directly into the open – above roof tops in case of silo bins, and above high-lying window faces in case of other spaces such as silo cellars, connecting passages and stairwells.
(7)
The opening pressure of the depressurizing system should be as small as possible
And its mass inertia should be low. Here it must be kept in mind that with an early actuation of the depressurizing system a substantially larger quantity of the combustible dust-air mixture is passed on than with systems which have a greater inertia.
I.7
Dimensioning of the Components
The dimensioning of the concerned components is to be executed in accordance with the rules for extraordinary loads (catastrophic loads).
I.8
Dimensioning for Explosive Overpressure
(1)
All the load-bearing and space-enclosing components of an explosion zone are to
designed for the dimensioning pressure. (2)
The dimensioning pressures should be determined in accordance with the
procedure given in the DIN-Fachbericht 140.
I.9
Dimensioning for Sub pressure
After a pressure relief has taken place, a sub pressure may arise in the explosion area caused by the forces of mass inertia in case of swift gas emission and subsequent cooling of the hot flue gases. This sub pressure is to be taken into account with the
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DIN 1055-6:2005-03 dimensioning of enclosing components and the components which are situated in the cross-section of the current.
I.10
Securing the Closing Elements of the Vents
(1)
All the closing elements are to be secured such that do not fly open as a result of
the explosion’s pressure, e. g. shutters to be secured with joints, and covers with catches, ropes or other attachments. (2)
The velocities of the closing elements that were moved for estimating the
anchoring forces can be determined using the calculating methods laid down in DINFachbericht 140.
I.11
Recoil Forces through Pressure Relief
(1)
Recoil forces arise during pressure relief, for which allowance may - if required -
need to made in case of stability verification. This is to be specially checked in case of lightweight structures with horizontal vents which are distributed across the cross-section. (2)
The recoil forces can be calculated as per the specifications in DIN-Fachbericht
140.
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