How do you solve $2log_5x = log_5 9$ ?

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Answer 1 · 2016-02-24T01:37:22

First simplify using the rule $alogn = logn^a$

$log_5(x^2) = log_5(9)$

Put everything to one side of the equation.

$0 = log_5(9) - log_5(x^2)$

Simplify using the rule $log_am - log_an = log_a(m / n)$

$0 = log_5(9/x^2)$

Convert to exponential form.

$5^0 = 9/x^2$

$1 = 9/x^2$

$x^2 = 9$

$x = +-3$

However, only +3 works as a solution because the log of a negative number is non-defined.

The solution set is x = 3.

Hopefully this helps!

How do you solve 2log_5x = log_5 92log_5x = log_5 9?