MER200: Theory of Elasticity Lecture 6

MER200: Theory of Elasticity Lecture 6 TWO DIMENSIONAL PROBLEMS Plane Stress Problems Stress Functions MER200: Theory of Elasticity

Equilibrium MER200: Theory of Elasticity

Strain-Displacement MER200: Theory of Elasticity

Compatibility MER200: Theory of Elasticity

Isotropic Stress-Strain Relations MER200: Theory of Elasticity

Plane Strain Condition • Thin Plate • Load uniformly distributed over thickness • Load parallel to the plane of the plate • Normal and Shearing stresses on the faces of the plate are zero • σz=τxz= τxz=0 • Stresses with z components through the thickness closely approximated by 0. • Fz=0 • Fx=Fx(x,y), Fy=Fy(x,y) MER200: Theory of Elasticity

Equations of Elasticity forPlane Stress MER200: Theory of Elasticity

Reducing Governing EquationsFrom Eight to Three • Starting with Compatibility MER200: Theory of Elasticity

Constitutive Equations forPlane Strain MER200: Theory of Elasticity

Three Equations • Compatibility in terms of Stress • Equilibrium MER200: Theory of Elasticity

Stress Functions • Plane Stress Compatibility • Plane Strain Compatibility MER200: Theory of Elasticity

Body Force is Conservative • Potential Function V exists • V causes compatibility equations to reduce to one equation with one dependent variable MER200: Theory of Elasticity

Airy’s Stress Function φ • Definitions • Φ implies that equilibrium equations are identically satisfied MER200: Theory of Elasticity

Compatibility equations can now be written • For Plane Stress • Biharmonic operator • Biharmonic equation MER200: Theory of Elasticity

MER200: Theory of Elasticity Lecture 6