How do you solve $log (x^2-9) = log (5x+5)$ ?

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How do you solve $log (x^2-9) = log (5x+5)$ ?

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Answer 1 · 2015-08-01T18:54:02

$color(red)(x=7)$

Explanation:

$log(x^2-9) = log (5x+5)$

Convert the logarithmic equation to an exponential equation.

$10^( log(x^2-9)) = 10^( log (5x+5))$

Remember that $10^logx =x$ , so

$x^2-9 = 5x+5$

Move all terms to the left hand side.

$x^2-9-5x-5 = 0$

Combine like terms.

$x^2-5x-14 = 0$

Factor.

$(x-7)(x+2) = 0$

$x-7 = 0$ and $x+2=0$

$x=7$ and $x=-2$

Check:

$log(x^2-9) = log (5x+5)$

If $x=7$

$log(7^2-9) = log (5(7)+5)$

$log(49-9) = log (35+5)$

$log40 = log40$

$x=7$ is a solution.

If $x=-2$ ,

$log((-2)^2-9) = log (5(-2)+5)$

$log(4-9) = log (-10+5)$

$log(-5) = log (-5)$

#log(-5) is not defined,

$x=-2$ is a spurious solution.

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How do you solve $log (x^2-9) = log (5x+5)$ ?

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How do you solve $log (x^2-9) = log (5x+5)$ ?