Connection Design
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Transcript Connection Design
CONNECTION DESIGN
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Connections must be designed at the strength limit state
– Average of the factored force effect at the connection and the force effect
in the member at the same point
– At least 75% of the force effect in the member
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End connections for diaphragms, cross-frames, lateral bracing for
straight flexural members - designed for factored member loads
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Connections should be symmetrical about member axis
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End connections for floorbeams and girders
– At least two bolts or equivalent weld per connection
– Members connected so that their gravity axes intersect at a point
– Eccentric connections should be avoided
– Two angles with thickness > 0.375 in.
– Made with high strength bolts
– If welded account for bending moment in design
BOLTED CONNECTIONS
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Slip-critical and bearing type bolted connections.
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Connections should be designed to be slip-critical where:
– stress reversal, heavy impact loads, severe vibration
– joint slippage would be detrimental to the serviceability of the structure
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Joints that must be designed to be slip-critical include
– Joints subject to fatigue loading or significant load reversal.
– Joints with oversized holes or slotted holes
– Joints where welds and bolts sharing in transmitting load
– Joints in axial tension or combined axial tension and shear
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Bearing-type bolted connections can be designed for joints
subjected to compression or joints for bracing members
SLIP-CRITICAL BOLTED CONNECTION
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Slip-critical bolted connections can fail in two ways: (a) slip at the
connection; (b) bearing failure of the connection
Slip-critical connection must be designed to: (a) resist slip at load
Service II; and (b) resist bearing / shear at strength limit states
SLIP-CRITICAL BOLTED CONNECTION
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Slip-critical bolted connections can be installed with such a degree
of tightness large tensile forces in the bolt clamp the
connected plates together
Applied Shear force resisted by friction
P
P
Tightened
N =Tb
N =Tb
P
N =Tb
F=mN
Tb
F=mN
N =Tb
Tb
P
N = Tb
N = Tb
SLIP-CRITICAL BOLTED CONNECTION
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Slip-critical connections can resist the shear force using friction.
– If the applied shear force is less than the friction that develops between
the two surfaces, then no slip will occur between them
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Nominal slip resistance of a bolt in a slip-critical connection
– Rn = Kh Ks Ns Pt
– Where, Pt = minimum required bolt tension specified in Table 1
Kh = hole factor specified in Table 1
Ks = surface condition factor specified in Table 3
SLIP-CRITICAL BOLTED CONNECTION
Values of Kh
For standard holes
Values of Pt
Bolt diameter
(in.)
5/8
3/4
7/8
1
1-1/8
1-1/4
1-3/8
1-1/2
Required Tension
(kips)
A325
A490
19
24
28
35
39
49
51
64
56
80
71
102
85
121
103
148
1.0
For oversize and short-slotted holes 0.85
For long slotted holes with the slot
Perpendicular to the force direction
For long-slotted holes with the slot
Parallel to the force direction
0.70
0.60
Values of Ks
For Class A surface conditions 0.33
For Class B surface conditions 0.50
For Class C surface conditions 0.33
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Faying surfaces
– Unpainted clean mill scale, and blast-cleaned surfaces with Class A coating
– Unpainted blast-cleaned surfaces with Class B coating
– Hot-dip galvanized surfaces roughened by wire brushing – Class C
SLIP-CRITICAL CONNECTION
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Connection subjected to tensile force (Tu), which reduces clamping
– Nominal slip resistance should be reduced by (1- Tu/Pt)
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Slip is not a catastrophic failure limit-state because slip-critical
bolted connections behave as bearing type connections after slip.
Slip-critical bolted connections are further designed as bearing-type
bolted connection for the applicable factored strength limit state.
BEARING CONNECTION
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In a bearing-type connection, bolts are subjected to shear and the
connecting / connected plates are subjected to bearing stresses :
T
T
Bearing stresses in plate
T
Bolt in shear
T
Bearing stresses in plate
BEARING CONNECTION
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Bearing type connection can fail in several failure modes
a) Shear failure of the bolts
b) Excessive bearing deformation at the bolt holes in the connected parts
c) Edge tearing or fracture of the connected plate
d) Tearing or fracture of the connected plate between two bolt holes
e) Failure of member being connected due to fracture or block shear or ...
BEARING CONNECTION
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Nominal shear resistance of a bolt
– Threads excluded:
– Threads included:
Rn = 0.48 Ab Fub Ns
Rn = 0.38 Ab Fub Ns
Where, Ab = area of the bolt corresponding to the nominal diameter
Fub = 120 ksi for A325 bolts with diameters 0.5 through 1.0 in.
Fub = 105 ksi for A325 bolts with diameters 1.125 through 1.5 in.
Fub = 150 ksi for A490 bolts.
Ns = number of shear planes
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Resistance factor for bolts in shear = fs = 0.80
Equations above - valid for joints with length < less than 50.0 in.
– If the length is greater than 50 in., then the values from the equations
have to be multiplied by 0.8
BEARING CONNECTION
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Effective bearing area of a bolt = the bolt diameter multiplied by the
thickness of the connected material on which it bears
Bearing resistance for standard, oversize, or short-slotted holes in any
direction, and long-slotted holes parallel to the bearing force:
–
For bolts spaced with clear distance between holes greater than or equal to 3.0 d
and for bolts with a clear end distance greater than or equal to 2.0 d
–
Rn = 2.4 d t Fu
For bolts spaced with clear distance between holes less than 3.0 d
and for bolts with clear end distances less than 2.0 d
Rn = 1.2 Lc t Fu
Where, d = nominal bolt diameter
Lc= clear distance between holes or between the hole and the end of the member in
the direction of applied bearing force
Fu = tensile strength of the connected material
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The resistance factor fbb for material in bearing due to bolts = 0.80
BEARING CONNECTION
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SPACING REQUIREMENTS
– Minimum spacing between centers of bolts in standard holes shall not
be less than three times the diameter of the bolt
– For sealing against penetration of moisture in joints, the spacing on a
single line adjacent to the free edge shall satisfy s ≤ (4.0 + 4.0 t) ≤ 7.0
– Minimum edge distances
Bolt diameter
(in.)
5/8
3/4
7/8
1
1-1/8
1-1/4
1-3/8
Sheared
edge
1-1/8
1-1/4
1-1/2
1-3/4
2
2-1/4
2-3/8
Rolled or
Gas Cut edge
7/8
1
1-1/8
1-1/4
1-1/2
1-5/8
1-3/4
BOLTED CONNECTION
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Example 1 Design a slip-critical splice for a tension member. For
the Service II load combination, the member is subjected to a
tension load of 200 kips. For the strength limit state, the member is
subjected to a maximum tension load of 300 kips.
– The tension member is a W8 x 28 section made from M270-Gr. 50
steel. Use A325 bolts to design the slip-critical splice.
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Step I. Service and factored loads
– Service Load = 200 kips.
– Factored design load = 300 kips
– Tension member is W8 x 28 section made from M270 Gr.50. The
tension splice must be slip critical (i.e., it must not slip) at service loads.
BOLTED CONNECTION
Step II. Slip-critical splice connection
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Slip resistance of one fully-tensioned slip-critical bolt = Rn = Kh Ks Ns Pt
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f = 1.0 for slip-critical resistance evaluation
– Assume bolt diameter = d = ¾ in. Therefore Pt = 28 kips from Table 1
– Assume standard holes. Therefore Kh = 1.0
– Assume Class A surface condition. Therefore Ks = 0.33
– Therefore, fRn = 1.0 x 0.33 x
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1 x 28 = 9.24 kips
Therefore, number of ¾ in. diameter bolts required for splice to be slipcritical at service loads = 200 / 9.24 = 21.64.
Therefore, number of bolts required ≥ 22
BOLTED CONNECTION
Step III: Layout of flange-plate splice connection
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To be symmetric about centerline, need the number of bolts = multiple of 8.
Therefore, choose 24 fully tensioned 3/4 in. A325 bolts with layout above.
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Slip-critical strength of the connection = 24 x 9.24 kips = 221.7 kips
Minimum edge distance (Le) = 1 in. from Table 4.
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Design edge distance Le = 1.25 in.
Minimum spacing = s = 3 x bolt diameter = 3 x ¾ = 2.25 in.
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Design spacing = 2.5 in.
BOLTED CONNECTION
Step IV: Connection strength at factored loads
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The connection should be designed as a normal shear/bearing
connection beyond this point for the factored load of 300 kips
Shear strength of high strength bolt = f Rn = 0.80 x 0.38 x Ab x Fub Ns
– Equation given earlier for threads included in shear plane.
– Ab = 3.14 x 0.752 / 4 = 0.442 in2
– Fub = 120 ksi for A325 bolts with d < 1-1/8 in.
– Ns= 1
– Therefore, fRn = 16.1 kips
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The shear strength of 24 bolts = 16.1 kips/bolt x 24 = 386.9 kips
BOLTED CONNECTION
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Bearing strength of 3/4 in. bolts at edge holes (Le = 1.25 in.)
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fbb Rn = 0.80 x 1.2 Lc t Fu
Because the clear edge distance = 1.25 – (3/4 + 1/16)/2 = 0.84375 in. < 2 d
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fbb Rn = 0.80 x 1.2 x 0.84375 x 65 kips x t = 52.65 kips / in. thickness
Bearing strength of of 3/4 in. bolts at non-edge holes (s = 2.5)
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fbb Rn = 0.80 x 2.4 d t Fu
Because the clear distance between holes = 2.5 – (3/4 + 1/16) = 1.6875 in. > 2d
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fbb Rn = 0.80 x 2.4 x 0.75 x 65 kips x t = 93.6 kips / in. thickness
Bearing strength of bolt holes in flanges of wide flange section W8 x 28
(t = 0.465 in.)
– 8 x 52.65 x 0.465 +16 x 93.6 x 0.465 = 892 kips
CONNECTION STRENGTH
Connection Strength
Slip-critical strength = 221.7 kips
Shear strength of bolts = 386.9 kips
Bearing strength (plate) = 892 kips
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Connection strength (fRn) > applied factored loads (gQ).
– Therefore ok
WELDED CONNECTIONS
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Introduction
– The shielded metal arc welding (SMAW) process for field welding.
– Submerged metal arc welding (SAW) used for shop welding –
automatic or semi-automatic process
– Quality control of welded connections is particularly difficult because of
defects below the surface, or even minor flaws at the surface, will
escape visual detection.
– Welders must be properly certified, and for critical work, special
inspection techniques such as radiography or ultrasonic testing must
be used.
WELDED CONNECTIONS
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Two most common types of welds are the fillet and the groove weld.
– lap joint – fillet welds placed in the corner formed by two plates
– Tee joint – fillet welds placed at the intersection of two plates.
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Groove welds – deposited in a gap or groove between two parts to be
connected e.g., butt, tee, and corner joints with beveled (prepared) edges
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Partial penetration groove welds can be made from one or both sides with or
without edge preparation.
Fillet weld
Fillet weld
WELDED CONNECTIONS
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Design of fillet welded connections
– Fillet welds are most common and used widely
– Weld sizes are specified in 1/16 in. increments
– Fillet welds are usually fail in shear, where the shear failure occurs
along a plane through the throat of the weld
L
Throat = a x cos45o
= 0.707 a
a
a
Failure Plane
– Shear stress in fillet weld of length L subjected to load P
fv =
P
0.707 a L w
FILLET WELDED CONNECTIONS
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The shear strength of the fillet weld = fe2 0.60 Fexx
– Where, fe2 = 0.80
– Fexx is the tensile strength of the weld electrode used in the welding
process. It can be 60, 70, 80, 90, 100, 110, or 120 ksi. The corresponding
electrodes are specified using the nomenclature E60XX, E70XX, E80XX,
and so on.
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Therefore, the shear strength of the fillet weld connection
–
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fRn = fe2 x 0.60 Fexx x 0.707 a Lw
Electrode strength should match the base metal strength
– If yield stress (sy) of the base metal is 60 - 65 ksi, use E70XX electrode
– If yield stress (sy) of the base metal is 60 - 65 ksi, use E80XX electrode
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E70XX is the most popular electrode used for SMAW fillet welds
– For E70XX, fRn = 0.80 x 0.60 x 70 x 0.707 a
Lw = 0.2375 a Lw kips
FILLET WELDED CONNECTIONS
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The shear strength of the base metal must be considered:
–
f Rn = fv x 0.58 Ag Fy
where, fv = 1.0
Fy is the yield strength of the base metal and Ag is the gross area in shear
T
Plan
Elevation
Strength of weld in shear
= 0.80 x 0.60 x Fexx x 0.707 x a x Lw
Strength of base metal
= 1.0 x 0.58 x Fy x t x Lw
Smaller governs the strength of the weld
FILLET WELDED CONNECTIONS
Limitations on weld dimensions
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Minimum size (amin)
– Weld size need not exceed the thickness of the thinner part joined.
– amin depends on the thickness of the thicker part joined
– If the thickness of the thicker part joined (T) is less than or equal to ¾ in.
amin = ¼ in.
– If T is greater than ¾ in. amin = 5/16 in.
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Maximum size (amax)
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Minimum length (Lw)
– Maximum size of fillet weld along edges of connected parts
– for material with thickness < 0.25 in., amax = thickness of the material
– for plates with thickness 0.25 in., amax = thickness of material - 1/16 in.
– Minimum effective length of fillet weld = 4 x size of fillet weld
– Effective length of fillet weld > 1.5 in.
FILLET WELDED CONNECTIONS
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Weld terminations and end returns
– End returns must not be provided around transverse stiffeners
– Fillet welds that resist tensile forces not parallel to the weld axis or
proportioned to withstand repeated stress shall not terminate at corners
of parts or members
– Where end returns can be made in the same plane, they shall be
returned continuously, full size around the corner, for a length equal to
twice the weld size (2a)
FILLET WELD DESIGN
Example 1 Design the fillet welded connection system for a double
angle tension member 2L 5 x 3½ x 1/2 made from A36 steel to carry
a factored ultimate load of 250 kips.
Step I. Design the welded connection
Considering only the thickness of the angles; amin = 1/4 in.
Considering only the thickness of the angles; amax = 1/2 - 1/16 in. = 7/16 in.
Design, a = 3/8 in. = 0.375 in.
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Shear strength of weld metal = f Rn = 0.80 x 0.60 x FEXX x 0.707 x a x Lw
= 8.9 x Lw kips
Strength of the base metal in shear = f Rn = 1.0 x 0.58 x Fy x t x Lw
= 10.44 Lw kips
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Shear strength of weld metal governs, f Rn = 8.9 Lw kips
FILLET WELD DESIGN
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Design strength f Rn > 250 kips
– Therefore, 8.9 Lw > 250 kips
– Therefore, Lw > 28.1 in.
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Design length of 3/8 in. E70XX fillet weld = 30.0 in.
Shear strength of fillet weld = 267 kips
Connection layout
– Connection must be designed to minimize eccentricity of loading.
Therefore, the center or gravity of the welded connection must coincide
with the center of gravity of the member.
L1
(d)
f L1
Tu
3.4 in.
f L2
L2
FILLET WELD DESIGN
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Connection layout
– Connection must be designed to minimize eccentricity of loading.
– The c.g. of the welded connection must coincide with c.g. of the member
L1
(d)
f L1
Tu
3.4 in.
f L2
L2
– Total length of weld required = 30 in.
– Two angles assume each angle will have weld length of 15 in.
FILLET WELD DESIGN
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The tension force Tu acts along the c.g. of the member, which is
1.65 in. from the top and 3.35 in. from the bottom (AISC manual).
– Let, f be the strength of the fillet weld per unit length.
Therefore, fL1 + fL2 = Tu
And fL2 x 3.35 - fL1 x 1.65 = 0 - taking moments about the member c.g.
– Therefore, L1 = 2.0 L2
But, L1 + L2 = 15.0 in.
– Therefore, L1 = 10 in. and L2 = 5 in.
Design: L1 = 10.0 in. and L2 = 5.0 in.
FILLET WELD DESIGN
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Consider another layout
L1
(e)
f L1
Tu
5f
3.4 in.
f L2
L2
fL1 + fL2 + 5f = Tu
fL2 x 3.5 + 5f x 0.85 - fL1 x 1.65 = 0 - Moment about member c.g.
Additionally,
L1 + L2 + 5 = 15.0 in.
Therefore,
L1 = 7.6 in.
Design: L1 = 8.0 in.
and
and
L2 = 2.4 in.
L2 = 3.0 in.
Groove Welded Connections
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Connects structural members that are aligned in the same plane
Basic Types:
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Complete joint penetration groove weld: transmits full load of the member they join
and have the same strength as the base metal.
–
Partial penetration groove weld: Welds do not extend completely through the
thickness of the pieces being joined.
Groove Welds
Complete penetration groove welded connections
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Tension and compression loaded
– Factored resistance
= factored resistance of base metal
Shear loaded on effective area lesser of
– Factored resistance of weld = 0.6 x fe1 x Fexx = 0.6 x 0.85 x Fexx
– 60% of factored resistance of base metal in tension
Partial penetration groove-welded connections
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Tension or compression parallel to the weld axis and compression normal
to effective area factored resistance of the base metal
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Tension normal to the effective area lesser of
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Shear loaded lesser of
– Factored resistance of the weld = 0.6 fe2 Fexx = 0.60 x 0.80 x Fexx
– Factored resistance of the base metal
– Factored resistance of the weld = 0.6 fe2 Fexx = 0.60 x 0.80 x Fexx
– Factored resistance of base metal = 0.58 Fy
Groove Welds