How do you evaluate $log 0.01$ $log 0.01$ ?

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How do you evaluate $log 0.01$ $log 0.01$ ?

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Answer 1 · 2016-03-22T14:17:58

I found $- 2$ $-2$ if the log is in base $10$ $10$ .

Explanation:

I would imagine the log base being $10$ $10$
so we write:
${log}_{10} (0.01) = x$ $log_(10)(0.01)=x$
we use the definition of log to write:
$10^{x} = 0.01$ $10^x=0.01$
but $0.01$ $0.01$ can be written as: $10^{- 2}$ $10^-2$ (corresponding to $\frac{1}{100}$ $1/100$ ).
so we get:
$10^{x} = 10^{- 2}$ $10^x=10^-2$
to be equal we need that:
$x = - 2$ $x=-2$
so:
${log}_{10} (0.01) = - 2$ $log_(10)(0.01)=-2$

Answer 2 · 2016-03-22T15:07:09

$log 0.01 = - 2$ $log 0.01=-2$

Explanation:

$log 0.01$ $log 0.01$
$= log (\frac{1}{100})$ $=log (1/100)$
$= log (\frac{1}{10^{2}})$ $=log(1/10^2)$
$= {log 10}^{- 2}$ $=log10^-2$ -> use property $\frac{1}{x^{n}} = x^{- n}$ $1/x^n = x^-n$
$- 2 log 10$ $-2log10$ ->use property ${log}_{b} x^{n} = n \cdot {log}_{b} x$ $log_b x^n=n*log_bx$
$= - 2 (1)$ $= -2(1)$ ->log 10 is 1
$= - 2$ $=-2$

Answer 3 · 2018-07-21T11:35:55

$- 2$ $-2$

Explanation:

$log 0.01$ $\log0.01$

$= log (\frac{1}{100})$ $=\log(1/100)$

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

$= - 2 log 10$ $=-2\log10$

$= - 2 \cdot 1$ $=-2\cdot 1$

$= - 2$ $=-2$

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