How do you solve $log x=-2$ ?

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Answer 1 · 2016-06-19T11:07:42

$x=1/100$ .

You only need to know that the logarithm is the inverse function of the exponential.

If by " $log$ " you mean the base 10 logarithm, then simply make both terms the exponents of a $10$ -based power:

$log(x)=-2 \implies 10^{log(x)}=10^{-2}$

Now, as I said, exponential and log are inverse function, which means that they cancel out, remaining with

$x=10^{-2}=1/100$

If you have another base, simply substitute that, replacing 10 with your base.

How do you solve log x=-2log x=-2?