How do you evaluate ${log}_{5} 92$ $log_5 92$ ?

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How do you evaluate ${log}_{5} 92$ $log_5 92$ ?

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Answer 1 · 2016-04-21T01:00:13

$\approx 2.81$ $approx2.81$

Explanation:

There is a property in logarithms which is ${log}_{a} (b) = \frac{log b}{log a}$ $log_a(b)=logb/loga$ The proof for this is at the bottom of the answer Using this rule:
${log}_{5} (92) = \frac{log 92}{log 5}$ $log_5(92)=log92/log5$
Which if you type into a calculator you'll get approximately 2.81.

Proof:
Let ${log}_{a} b = x$ $log_ab=x$ ;
$b = a^{x}$ $b=a^x$
$log b = {log a}^{x}$ $logb=loga^x$
$log b = x log a$ $logb=xloga$
$x = \frac{log b}{log a}$ $x=logb/loga$
Therefore ${log}_{a} b = \frac{log b}{log a}$ $log_ab=logb/loga$

Answer 2 · 2016-04-21T11:29:10

$x = \frac{ln (92)}{ln (5)} \approx 2.810$ $x=ln(92)/ln(5) ~~2.810$ to 3 decimal places

Explanation:

As an example consider ${log}_{10} (3) = x$ $log_10(3) =x$

This mat be written as: $10^{x} = 3$ $" "10^x=3$
'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Given: ${log}_{5} (92)$ $" "log_5(92)$

Let ${log}_{5} (92) = x$ $log_5(92)=x$

The we have: $5^{x} = 92$ $5^x=92$

You can use log base 10 or natural loges (ln). This will work for either.

Take logs of both sides

$ln (5^{x}) = ln (92)$ $ln(5^x)=ln(92)$

Write this as: $x ln (5) = ln (92)$ $xln(5)=ln(92)$

Divide both sides by $ln (5)$ $ln(5)$ giving:

$x = \frac{ln (92)}{ln (5)} \approx 2.810$ $x=ln(92)/ln(5) ~~2.810$ to 3 decimal places

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How do you evaluate ${log}_{5} 92$ $log_5 92$ ?

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