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Question #4549a

1 Answer

Oct 15, 2016

$x = 2$

Explanation:

$9^x-9=8(3^x)$

$=> (3^x)^2-8(3^x)-9=0$

Let $u = 3^x$

$u^2-8u - 9 = 0$

$=> (u-9)(u+1)=0$

$=> u-9 = 0 or u+1 = 0$

$=> u = 9 or u = -1$

$=> 3^x = 9 or 3^x = -1$

As $3^x in (0, oo)$ for $x in RR$ , we can dismiss the second possibility

$=> 3^x = 9$

$=> 3^x = 3^2$

$:. x = 2$

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