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Lecture 15 – Strain and stress in beams
Instructor: Prof. Marcial Gonzalez
Fall, 2020ME 323 –Mechanics of Materials
Reading assignment: 6.1—6.2
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Last modified: 8/22/20 11:23:31 PM
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Beam theory (@ ME 323)- Geometry of the solid body:
straight, slender member with constant cross sectionthat is design to supporttransverse loads.
- Kinematic assumptions: Bernoulli-Euler Beam TheoryTimoshenko Beam Theory, etc.
- Material behavior: isotropic linear elastic material; small deformations.
- Equilibrium:1) relate stress distribution (normal and shear stress) with
internal resultants (only shear and bending moment)
2) find deformed configuration
Equilibrium of beams
Longitudinal Planeof Symmetry
(Plane of Bending)
Longitudinal Axis
deflection curve
J.L. Lagrange
J. Bernoulli L. EulerS.P. Timoshenko
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Beam theory (@ ME 323)- Geometry of the solid body: straight, slender member with constant cross
section that is design to support transverse loads.- Kinematic assumptions: Bernoulli-Euler Beam Theory
Timoshenko Beam Theory, etc.
Pure bending (i.e., and ):
Equilibrium of beams
Longitudinal Planeof Symmetry
(Plane of Bending)
Longitudinal Axis
- Plane of Bending
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Bernoulli-Euler beam theory- Kinematic assumptions:
1.- the beam possesses a longitudinal plane of symmetry or plane of bending, and is loaded and supported symmetrically with respect to this plane;2.- there is a longitudinal plane perpendicular to the plane of bending that remains free of strain (i.e., ) as the beam deforms. This plane is called the neutral surface (NS)—the neutral axis (NA) is the intersection of the NS with the cross section;3.- cross sections remain plane and perpendicular to the deflection curve of the deformed beam;4.- transverse strains (i.e., ) may be neglected in deriving an expression for the longitudinal strain .
Equilibrium of beams
- Plane of Bending
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Bernoulli-Euler beam theory- Kinematic assumptions: Strain-Displacement Equation
Equilibrium of beams
y
z
Neutral Surface
Undeformed Deformed underpure bending
Cross Section
Radius of curvature (+ or -) Curvature (+ or -)
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Bernoulli-Euler beam theory- Kinematic assumptions: Strain-Displacement Equation
Equilibrium of beams
y
z
Undeformed Deformed underpure bending
Cross Section
One half of the cross section is under longitudinal compression,the other half is under longitudinal tension.
Exist but can be neglected in the derivation of the strain-displacement eqn.
When , the Bernoulli-Euler beam theory can be used if the beam is slender.
Neutral Surface
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Bernoulli-Euler beam theory- Kinematic assumptions: Strain-Displacement Equation
Equilibrium of beams
One half of the cross section is under longitudinal compression,the other half is under longitudinal tension.
When , the Bernoulli-Euler beam theory can be used if the beam is slender.
positivecurvature
negativecurvature
Exist but can be neglected in the derivation of the strain-displacement eqn.
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Bernoulli-Euler beam theory- Material behavior: isotropic linear elastic material; small deformations
Equilibrium of beams
Recall our initial assumptions:
positivecurvature
y
zNeutral Surface
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Bernoulli-Euler beam theory- Material behavior: isotropic linear elastic material; small deformations
Equilibrium of beams
Recall our initial assumptionsTherefore, the y-coordinate is measured from the centroid!!!!
positivecurvature
y
zNeutral Surface
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Bernoulli-Euler beam theory- Material behavior: isotropic linear elastic material; small deformations
Equilibrium of beams
Moment-curvature equation – Flexure formula
positivecurvature
y
zNeutral Surface
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Bernoulli-Euler beam theory - Summary
Equilibrium of beams
Moment-curvature equation – Flexure formula – In addition
Note: the y-coordinate is measured from the centroid!!!!
positivecurvature
negativecurvature
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Equilibrium of beams
Example 21: For a T-beam, determine the maximum tensile stress and the maximum compressive stress in the structure.
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Equilibrium of beams
Example 22 (review Statics notes): Determine the location of the centroid.Determine the moment of inertia.
Any questions?
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Equilibrium of beams
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