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High School Math Geometry Geometry, Student Edition

Prove that arcADC is semicircle if and only if ∠ A B C = 90 ° .

Prove that arcADC is semicircle if and only if ∠ A B C = 90 ° .

Geometry, Student Edition

Geometry, Student Edition

1st Edition

ISBN: 9780078884849

Author: McGraw-Hill, McGraw Hill

Publisher: Glencoe/McGraw-Hill School Pub Co

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Statements and Logic

Logic is the analysis of general patterns of thoughts without regard to any specific sense of context.

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Question

Chapter 10.4, Problem 40PPS

To determine

Prove that arcADC is semicircle if and only if ∠ABC=90° .

Expert Solution & Answer

Explanation of Solution

Given :

Geometry, Student Edition, Chapter 10.4, Problem 40PPS

Calculation:

Given : arcADC is semicircle

To Prove : ∠ABC=90°

Proof :

arcADC is semicircle

So, m∠ADC=180°

By Inscribed Angle Theorem, since the angle ABC is inscribed by arc ADC , so,

m∠ABC=12marcADC=12(180°)=90°

Hence proved.

Conversly,

Given : ∠ABC=90°

To Prove : arcADC is semicircle

Proof :

By Inscribed Angle Theorem, since the angle ABC is inscribed by arc ADC , so,

marcADC=2m∠ABC=2(90°)=180°

Hence , arcADC is semicircle.

So, arcADC is semicircle if and only if ∠ABC=90° .

Hence proved.

Chapter 10.4, Problem 39PPS

Chapter 10.4, Problem 41PPS

Chapter 10 Solutions

Geometry, Student Edition

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