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Application Solutions of Plane Elasticity

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Presentation on theme: "Application Solutions of Plane Elasticity"— Presentation transcript:

1 Application Solutions of Plane Elasticity
Professor M. H. Sadd

2 Solutions to Plane Problems Cartesian Coordinates
Airy Representation Biharmonic Governing Equation R S Traction Boundary Conditions x y

3 Uniaxial Tension of a Beam
y T 2l 2c

4 Note Integrated Boundary Conditions
Pure Bending of a Beam x y M 2l 2c Note Integrated Boundary Conditions

5 Bending of a Beam by Uniform Transverse Loading
x y w 2c 2l wl x/w - Elasticity x/w - Strength of Materials l/c = 2 l/c = 4 l/c = 3 Dimensionless Distance, y/c

6 Bending of a Beam by Uniform Transverse Loading
x y w 2c 2l wl Note that according to theory of elasticity, plane sections do not remain plane For long beams l >>c, elasticity and strength of materials deflections will be approximately the same

7 Cantilever Beam Problem
x y N P L 2c Stress Field Displacement Field

8 Cantilever Tapered Beam
x y L p A B Stress Field x = L x = L

9 Solutions to Plane Problems Polar Coordinates
Airy Representation Biharmonic Governing Equation R S Traction Boundary Conditions x y r

10 General Solutions in Polar Coordinates

11 Thick-Walled Cylinder Under Uniform Boundary Pressure
r1/r2 = 0.5 r/r2 r /p  /p Dimensionless Distance, r/r2 Internal Pressure Case

12 Stress Free Hole in an Infinite Medium Under Uniform Uniaxial Loading at Infinity
r/a

13 Stress Concentrations for Other Loading Cases
Biaxial Loading T Biaxial Loading T Unaxial Loading K=3 K=2 K=4

14 Stress Concentration Around Elliptical Hole
x y b a ()max/S Circular Case (K=3)

15 Half-Space Under Concentrated Surface Force System (Flamant Problem)
x y Y X r C Normal Loading Case (X=0) Dimensionless Distance, x/a y/(Y/a) xy/(Y/a) y = a

16 Notch-Crack Problems Contours of Maximum Shear Stress y r    x
 = 2 -  r x Contours of Maximum Shear Stress

17 Two-Dimensional FEA Code MATLAB PDE Toolbox
- Simple Application Package For Two-Dimensional Analysis Initiated by Typing “pdetool” in Main MATLAB Window Includes a Graphical User Interface (GUI) to: Select Problem Type Select Material Constants Draw Geometry Input Boundary Conditions Mesh Domain Under Study Solve Problem Output Selected Results

18 FEA Notch-Crack Problem
(vonMises Stress Contours)

19 Curved Beam Problem P  r a b  = /2 b/a = 4 a/P
Dimensionless Distance, r/a a/P Theory of Elasticity Strength of Materials  = /2 b/a = 4

20 Disk Under Diametrical Compression
= P Flamant Solution (1) + + Flamant Solution (2) Radial Tension Solution (3)

21 Disk Under Diametrical Compression
+ + = P 2 y x 1 r1 r2

22 Disk Results Theoretical, Experimental, Numerical
Theoretical Contours of Maximum Shear Stress Finite Element Model (Distributed Loading) Photoelastic Contours (Courtesy of Dynamic Photomechanics Laboratory, University of Rhode Island)

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