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Structure Analysis I
Chapter 9
Deflection
Energy Method
Structural Analysis IDr. Mohammed Arafa
Energy Method
This principle states that the work done by all the external forces
acting on a structure Ue is transformed into internal work or strain
energy Ui which is developed when the structure deforms.
This principle can be stated mathematically as:
e iU U
The conservation of energy principle
Energy Method
PU
dxFU
e
x
e
21
0
When a force F undergoes a displacement dx
in the same direction as the force, the work
done is
If the total displacement is x the work become
dxFdUe
The force applied gradually
External Work -Force
Energy Method
' 'eU P
If P is already applied to the bar and that
another force F` is now applied
The work done by P when the bar undergoes
the further deflection ` is then
External Work -Force
If the total angle of rotation is the work become:
0
eU M d
12eU M
If the moment is applied gradually to a structure from zero to M
dMdUe
The work of a moment is defined by the product of
the magnitude of the moment M and the angle dthen:
External Work -Moment
`eU M
If the moment is already applied to the structure and other
loadings further distort the structure by an amount `
Energy Method
Strain Energy – Axial Force
L
A
N
E
AE
NL
AE
LNU
PU
NP
i2
2
21
N = internal normal force in a truss member caused
by the real load
L = length of member
A = cross-sectional area of a member
E = modulus of elasticity of a member
Energy Method
Strain Energy – Bending
MU
dxEI
Md
21
L
i
i
EI
dxMU
EI
dxMdU
0
2
2
2
2
Principle of Work and EnergyExample
22 2 3
0 0
1,
2 2 2 6
L L
e i
PxM P LU P U dx dx
EI EI EI
Consider finding the displacement at the point where the force P is applied to
the cantilever beam in
2 3
3
1 1
2 6
3
e iU U
P LP
EI
PL
EI
Principle of Virtual Work
uPWork of
External
Loads
Work of
Internal
Loads
dLu..1
Virtual Load
Real displacement
Method of Virtual Work: Trusses
External Loading
AE
NLn . .1
dLu..1
1 = external virtual unit load acting on the truss joint in the stated direction of
n = internal virtual normal force in a truss member caused by the external
virtual unit load
= external joint displacement caused by the real load on the truss
N = internal normal force in a truss member caused by the real load
L = length of member
A = cross-sectional area of a member
E = modulus of elasticity of a member
Method of Virtual Work: Trusses
Temperature
1. T Ln
1 = external virtual unit load acting on the truss joint in the stated direction of
n = internal virtual normal force in a truss member caused by the external virtual
unit load
= external joint displacement caused by the temperature change.
= coefficient of thermal expansion of member
T = change in temperature of member
L = length of member
Method of Virtual Work: Trusses
Fabrication Errors and Camber
1. Ln
1 = external virtual unit load acting on the truss joint in the stated direction of
n = internal virtual normal force in a truss member caused by the external virtual
unit load
= external joint displacement caused by fabrication errors
L = difference in length of the member from its intended size as caused by a
fabrication error.
Structural Analysis IDr. Mohammed Arafa
Example 1
The cross sectional area of each member of the truss show, is A = 400mm2
& E = 200GPa.
a) Determine the vertical displacement of joint C if a 4-kN force is applied
to the truss at C
A virtual force of 1 kN is applied at C in the vertical direction
AE
NLn . .1
Solution
Member n (KN) N (KN) L (m) nNL
AB 0.667 2 8 10.67
AC -0.833 2.5 5 -10.41
CB -0.833 -2.5 5 10.41
Sum 10.67
mmm
AEAE
nNL
mkNm
kN
133.0 000133.0
1020010400
)67.1067.10 .1
)/(6
)(6
(
22
Structural Analysis IDr. Mohammed Arafa
Text book Example 8-14
Determine vertical displacement at C
A = 0.5 in2
E = 29 (10)3 ksi
Example 2
Example 3
Method of Virtual Work: Beam
dxEI
Md dLu..1
dxEI
Mm
L
0
.1
1 = external virtual unit load acting on the beam in the stated direction of Δ
m = internal virtual moment in a beam caused by the external virtual unit load
Δ = external joint displacement caused by the real load on the truss
M = internal moment in a beam caused by the real load
L = length of beam
I = moment of inertia of cross-sectional
E = modulus of elasticity of the beam
Method of Virtual Work: Beam
dxEI
MmL
mKN 0
).( .1
Similarly the rotation angle at any point on the beam can be
determine, a unit couple moment is applied at the point and the
corresponding internal moment have to be determinem
Example 4
Determine the displacement at point B of a steel beam
E = 200 Gpa , I = 500(106) mm4
Structural Analysis IDr. Mohammed Arafa
Solution
mEI
EI
x
EI
dxx
EI
dxxxdx
EI
Mm
L
15.0)10)(10(500)10(200
)10(15)10(15
4
66)6()1( .1
1266
33
10
0
410
0
310
0
2
0
mB
B
15.0
5.7)10)(10(500)10(200
20001266
Another Solution
Real Load
Virtual Load
Example 5
Example 6
Determine the Slope at point B of a steel beam
E = 200 Gpa , I = 60(106) mm4
Solution
Virtual Load
rad 0094.0)10(60)10(2002
)5(3)10(3
2
3 3)3()1()3()0( .1
66
22
10
5
210
5
10
5
5
00
B
L
EI
x
EI
dxx
EI
dxx
EI
dxxdx
EI
Mm
Real Load
rad
EIEIB
0094.0
1121
112
69 1060)10(200
112
Another Solution
Real Load
Virtual Load
Example 7
Example 8
Example 9
Determine the horizontal deflection at A
Example 4
Solution
Real Load
Virtual Load
m
EIEIEIA
031.0
12505.2
5000
100
69 10200)10(200
1250
Structural Analysis IDr. Mohammed Arafa
Virtual Strain Energy Caused by: Axial Load
n
nNLU
AE
n = internal virtual axial load caused by the external virtual unit load
N = internal normal force in the member caused by the real load
L = length of member
A = cross-sectional area of the member
E = modulus of elasticity of the material
Virtual Strain Energy Caused by: Shear
0
L
S
vVU K dx
GA
/
/
/
/S
dy dx
G
dy G dx
K V A
Vdy K dx
GA
dU vdy vK V A dx
0
L
S
vVU K dx
GA
= internal virtual shear in the member caused by the external virtual unit load
V = internal shear in the member caused by the real load
G= shear modulus of elasticity for the material
A = cross-sectional area of the member
K = form factor for the cross-sectional area
K=1.2 for rectangular cross sections
K=10/9 for circular cross sections
K=1.0 for wide-flange and I-beams where A is the area of the web.
Virtual Strain Energy Caused by: Shear
Virtual Strain Energy Caused by: Torsion
t
tTLU
GJ
/
/
t
cd dx
G
Tc
J
Td dx dx dx
c Gc GJ
tTdU td dx
GJ
Virtual Strain Energy Caused by: Torsion
t= internal virtual torque caused by the external virtual unit load
T= internal shear in the member caused by the real load
G= shear modulus of elasticity for the material
J = polar moment of inertia of the cross-sectional
L = member length
t
tTLU
GJ
Structural Analysis IDr. Mohammed Arafa
Virtual Strain Energy Caused by: Temperature
0
m
L
mtemp
Td dx
c
m TU dx
c
Virtual Strain Energy Caused by: Temperature
0
L
mtemp
m TU dx
c
m= internal virtual moment in the beam caused by the external virtual unit load or
unit moment
= coefficient of thermal expansion
Tm = change in temperature between the mean temperature and the temperature
at the top or the bottom of the beam
c = mid-depth of the beam
Example 10
Example 11
