ENGR 220 Section 6.3 – 6.4. Assumptions 1.Straight prismatic beams 2. Homogenous material 3. Cross sectional area symmetric w.r.t an Axis 4. Bending moment.
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ENGR 220Section 6.3 – 6.4
Assumptions
1.Straight prismatic beams
2. Homogenous material
3. Cross sectional area symmetric w.r.t an Axis
4. Bending moment applied perpendicular to this axis of symmetry
5. Neutral surface does not experience any change in length
6. All cross sections remain plane and perpendicular to the longitudinal axis.
7. Any deformation of the cross section in its own plane is neglected.
Bending Deformation
Bending Deformation
Maximum Strain
max
max
max
c
y
c
y
c
Strain / Stress Profiles
Wood Specimen that failed in bending
The Flexure Formula
• Applying Hooke’s Law– σ=Eε
• A linear variation in strain results in a linear variation in stress. max
c
y
max
c
y
Locating Neutral Axis.
Resultant Normal Force on the Cross section = 0
dF = dA = 0
Substitute for , in terms of max
-(max /c ) y dA = 0
y dA = 0
y dA = y = location of centroid.
y = 0 implies the centroidal axes are lying on the neutral axis.
Flexure Formula
I
Mcmax
Moment of Inertia Review
• Note: Moment of inertia is actually a misnomer. It has been adopted because of its similarity to integrals of the same form related to mass.
xdACentroid
dAx2Inertia ofMoment Area
dmr 2Inertia ofMoment Mass
Parallel Axis Theorem
xyy
yxx
AdII
AdII2
'
2'
Composite Shapes
)(
)(2
'
2'
xyy
yxx
AdII
AdII
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