How do you solve $(2(x-2))/(x^2-10x+16)=2/(x+2)$ ?

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How do you solve $(2(x-2))/(x^2-10x+16)=2/(x+2)$ ?

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Answer 1 · 2017-06-01T16:44:18

$x in {cancel"O"}$

(no solutions)

Explanation:

First, let's factor $x^2-10x+16$ .

We need two factors of 16 which add up to -10.

$-2 and -8$ work, so our factored polynomial is:

$(x-2)(x-8)$

Now we can solve the equation:

$(2(x-2))/(x^2-10x+16)=2/(x+2)$

$(2(x-2))/((x-2)(x-8)) = 2/(x+2)$

$(color(blue)cancel(color(black)2)color(red)cancel(color(black)((x-2))))/(color(red)cancel(color(black)((x-2)))(x-8)) = color(blue)cancel(color(black)2)/(x+2)$

$1/(x-8) = 1/(x+2)$

Now take the reciprocal of both sides:

$x-8 = x+2$

$-8 = 2$

This is impossible, so there are no solutions.

Answer 2 · 2017-06-01T16:56:50

No solution

Explanation:

$(2(x-2))/(x^2-10x+16)=2/(x+2)$

$:.(2(cancel(x-2)^1))/((cancel(x-2)^1)(x-8))=2/(x+2)$

$:.2/(x-8)=2/(x+2)$

multiply both sides by (x-8)(x+2)

$:.2(x+2)=2(x-8)$

$:.2x+4=2x-16$

$:.2x-2x=-16-4$

$:.0=-20$

No solution

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How do you solve $(2(x-2))/(x^2-10x+16)=2/(x+2)$ ?

2 Answers

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