How do you calculate ${log}_{7} 5.8$ $log_7 5.8$ with a calculator?

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How do you calculate ${log}_{7} 5.8$ $log_7 5.8$ with a calculator?

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Answer 1 · 2016-08-09T08:25:39

${log}_{7} 5.8 = \frac{{log}_{10} 5.8}{{log}_{10} 7} = 0.9034$ $log_7 5.8 = (log_10 5.8)/(log_10 7) = 0.9034$

Explanation:

Some calculators are able to calculate logs with any base, but let's work through this for those calculators which can only work with base 10.

Let ${log}_{7} 5.8 = x log form$ $log_7 5.8 = x" log form"$

$7^{x} = 5.8 index form$ $7^x = 5.8" index form"$

The variable is in the index, find the log of both sides.

${log}_{10} 7^{x} = {log}_{10} 5.8$ $log_10 7^x = log_10 5.8$

$x {log}_{10} 7 = {log}_{10} 5.8$ $xlog_10 7 = log_10 5.8$

$x = \frac{{log}_{10} 5.8}{{log}_{10} 7}$ $x = (log_10 5.8)/(log_10 7)$

Now use a calculator to find the answer $0.9034$ $0.9034$

${log}_{a} b = \frac{{log}_{10} b}{{log}_{10} a} is called the change of base law$ $log_a b = (log_10 b)/(log_10 a) " is called the change of base law"$

We could have written the following in one step:

${log}_{7} 5.8 = \frac{{log}_{10} 5.8}{{log}_{10} 7}$ $log_7 5.8 = (log_10 5.8)/(log_10 7)$

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How do you calculate ${log}_{7} 5.8$ $log_7 5.8$ with a calculator?

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