**Part D - Determine maximum in-plane shear stress in MPa.**Options:- 191- 572- 382- 477- 286[Submit] [Request Answer]---**Part E - Determine direction of maximum shear stress in degrees.**Options:- 29.2- 52.6- 21.9- 43.8- 11.7[Submit] [Request Answer] ### State of Plane StressThe state of plane stress at a point is represented by the element shown in the figure. The stress components are given as:- \(\sigma_x = 200 \, \text{MPa}\)- \(\sigma_y = 450 \, \text{MPa}\)- \(\tau_{xy} = 200 \, \text{MPa}\)[Click here to see all formulas](#)### Diagram ExplanationThe diagram to the right illustrates a rectangular element subjected to plane stress. The following stress components are displayed:- \(\sigma_x\) is the normal stress acting in the horizontal direction.- \(\sigma_y\) is the normal stress acting in the vertical direction.- \(\tau_{xy}\) is the shear stress acting on the element.### Problem Statement#### Part ADetermine the maximum principal stress in \(\text{MPa}\).#### Options:- 253- 355- 507- 760- 608[Submit] [Request Answer]To solve this, one would typically use the principal stress formulas for a plane stress condition.

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ne shear stress in

Elements Of Electromagnetics

7th Edition

ISBN:9780190698614

Author:Sadiku, Matthew N. O.

Publisher:Sadiku, Matthew N. O.

ChapterMA: Math Assessment

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Problem 1.1MA

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Question

**Part D - Determine maximum in-plane shear stress in MPa.**

Options:
- 191
- 572
- 382
- 477
- 286

[Submit] [Request Answer]

---

**Part E - Determine direction of maximum shear stress in degrees.**

Options:
- 29.2
- 52.6
- 21.9
- 43.8
- 11.7

[Submit] [Request Answer]

### State of Plane Stress

The state of plane stress at a point is represented by the element shown in the figure. The stress components are given as:

- \(\sigma_x = 200 \, \text{MPa}\)
- \(\sigma_y = 450 \, \text{MPa}\)
- \(\tau_{xy} = 200 \, \text{MPa}\)

[Click here to see all formulas](#)

### Diagram Explanation

The diagram to the right illustrates a rectangular element subjected to plane stress. The following stress components are displayed:
- \(\sigma_x\) is the normal stress acting in the horizontal direction.
- \(\sigma_y\) is the normal stress acting in the vertical direction.
- \(\tau_{xy}\) is the shear stress acting on the element.

### Problem Statement

#### Part A

Determine the maximum principal stress in \(\text{MPa}\).

#### Options:
- 253
- 355
- 507
- 760
- 608

[Submit] [Request Answer]

To solve this, one would typically use the principal stress formulas for a plane stress condition.

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