Point A in a beam is deformed such that the strain components are ɛ, = -1380 µe, ɛy = -880 µe, ɛ, = 0 µɛ, and yxy = 1470 prad.Determine the magnitude of the absolute maximum shear strain at the point.%3DA-Answer:Absolute maximum shear strain = i2696.014prad

Use formula of maximum shear strain.

Point A in a beam is deformed such that the strain components are ɛx = -1380 ue, ɛy = -880 µe, ɛ; = 0 µɛ, and y,xy = 1470 µrad. Determine the magnitude of the absolute maximum shear strain at the point. Answer: Absolute maximum shear strain = i prad 2696.014

Point A in a beam is deformed such that the strain components are ɛx = -1380 ue, ɛy = -880 µe, ɛ; = 0 µɛ, and y,xy = 1470 µrad. Determine the magnitude of the absolute maximum shear strain at the point. Answer: Absolute maximum shear strain = i prad 2696.014

Principles of Foundation Engineering (MindTap Course List)

9th Edition

ISBN:9781337705028

Author:Braja M. Das, Nagaratnam Sivakugan

Publisher:Braja M. Das, Nagaratnam Sivakugan

Chapter8: Vertical Stress Increase In Soil

Section: Chapter Questions

Problem 8.6P: Two line loads q1 and q2 of infinite lengths are acting on top of an elastic medium, as shown in...

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Concept explainers

Methods to Determine Vertical Stress

The load applied to the soil is transferred to the underground. The presence of water at soil pores and solid grains above the soil are the primary components that are responsible for the effective load transfer. Due to the load acting, the internal component of the soil or the underground formations undergoes deformations or a tectonic shift. The amount of deformation depends upon the amount of load acting on the soil surface, which indeed, depends on the weight of everything present above the soil. Due to this, the underground soil element develops internal stresses which try to resist the tectonic changes.

Question

Point A in a beam is deformed such that the strain components are ɛ, = -1380 µe, ɛy = -880 µe, ɛ, = 0 µɛ, and yxy = 1470 prad.
Determine the magnitude of the absolute maximum shear strain at the point.
%3D
A-
Answer:
Absolute maximum shear strain = i
2696.014
prad

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