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Calculus / Calculus: Early Transcendentals, 10 / Chapter 0.4 / Problem 29

Calculus: Early Transcendentals, | 10th Edition | ISBN: 9780470647691 | Authors: Howard Anton Irl C. Bivens, Stephen Davis

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Prove that if a2 + bc = 0, then the graph off(x) = ax + bcx ais symmetric about the line

Chapter 0, Problem 29

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QUESTION:

Prove that if \(a^{2}+b c \neq 0\), then the graph of \(f(x)=\frac{a x+b}{a x-a}\) is symmetric about the line \(y=x\).

Equation Transcription:

${a}^{2}+bc\ne{}0$

$f(x)=\frac{ax+b}{cx-a}$

$y=x$

Text Transcription:

a^2+bc not = 0

f(x)=ax+b/cx-a

y=x

Questions & Answers

QUESTION:

Prove that if \(a^{2}+b c \neq 0\), then the graph of \(f(x)=\frac{a x+b}{a x-a}\) is symmetric about the line \(y=x\).

Equation Transcription:

${a}^{2}+bc\ne{}0$

$f(x)=\frac{ax+b}{cx-a}$

$y=x$

Text Transcription:

a^2+bc not = 0

f(x)=ax+b/cx-a

y=x

ANSWER:

Step 1 of 3

The given function is

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