The state of a plane strain at a point has the components Ex 400 (10-6), ɛy = 200 (10 ) and yxy = 400 (10-6). Determine the principal strains and the maximum in plane shear strain. Select one: & =524 (10-6), ɛ2 = -76.4 (106) and ymax in-plane = 223 (10 ). E1 = 524 (10-), 2 = -76.4 (10-6) and ymax in-plane = 447 (10). & = 524 (10-), ɛ2 = 76.4 (10-b) and ymax in-plane = 223 (10 ). E1 = 524 (10-6), E2 = 76.4 (10-6) and ymax in-plane = 447 (10-). %3D E = -76.4 (10-), E2 = -524 (10-6) and ymax in-plane = 447 (10-9).

The state of a plane strain at a point has the components Ex 400 (10-6), ɛy = 200 (10 ) and yxy = 400 (10-6). Determine the principal strains and the maximum in plane shear strain. Select one: & =524 (10-6), ɛ2 = -76.4 (106) and ymax in-plane = 223 (10 ). E1 = 524 (10-), 2 = -76.4 (10-6) and ymax in-plane = 447 (10). & = 524 (10-), ɛ2 = 76.4 (10-b) and ymax in-plane = 223 (10 ). E1 = 524 (10-6), E2 = 76.4 (10-6) and ymax in-plane = 447 (10-). %3D E = -76.4 (10-), E2 = -524 (10-6) and ymax in-plane = 447 (10-9).

Mechanics of Materials (MindTap Course List)

9th Edition

ISBN:9781337093347

Author:Barry J. Goodno, James M. Gere

Publisher:Barry J. Goodno, James M. Gere

Chapter7: Analysis Of Stress And Strain

Section: Chapter Questions

Problem 7.7.11P: The strains for an element of material in plane strain (see figure) are as follows: x = 480 ×10-6. y...

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