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The strain components Ex, Ey, and Yxy are given for a point in a body subjected to plane strain. Using Mohr's circle, determine the principal strains, the maximum in-plane shear strain, and the absolute maximum shear strain at the point. Show the angle Op, the principal strain deformations, and the maximum in-plane shear strain distortion in a sketch. Ex = 490 mɛ, εy = -750 uɛ, Yxy = -6 10 urad. Enter the angle such that -45°50ps +45°. Answer: Ep1 = -820.96 με Ep2 = 560.96 με Ymax in-plane - 1381.92 urad Yabsolute max. - 1381.92 urad Op = op 13.070
The strain components for a point in a body subjected to plane strain are Ex = 930 pɛ, Ey = -1120ue and Yxy = -583 urad. Using Mohr's circle, determine the principal strains (Ep1 > Ep2), the maximum inplane shear strain Vip, and the absolute maximum shear strain Ymax at the point. Show the angle op (counterclockwise is positive, clockwise is negative), the principal strain deformations, and the maximum in-plane shear strain distortion in a sketch. Answers: = Ep1 = 970.65 με. Ep2 = -1160.65 με. Vip 2131.3 urad. Ymax = 2131.3 urad. өр = Op 97