How do you solve $5^{x + 2} = 2$ $5^(x+2) = 2$ ?

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How do you solve $5^{x + 2} = 2$ $5^(x+2) = 2$ ?

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Answer 1 · 2015-11-10T22:34:53

$x = \frac{log (\frac{2}{25})}{log 5} = - 1, 57$ $x=(log(2/25))/(log5)=-1,57$

Explanation:

From the laws of exponents we may write this as

$5^{x} \cdot 5^{2} = 2$ $5^x*5^2=2$

Now dividing throughout by $5^{2}$ $5^2$ yields

$5^{x} = \frac{2}{25}$ $5^x=2/25$

Now taking the log on both sides and using laws of logs we can write it as

$x log 5 = log (\frac{2}{25})$ $xlog5=log(2/25)$

Finally dividing throughout by $log 5$ $log5$ gives

$x = \frac{log (\frac{2}{25})}{log 5} = - 1, 57$ $x=(log(2/25))/(log5)=-1,57$

Answer 2 · 2015-11-14T03:37:08

To undo the $x$ $x$ being raised to an exponent, take the log base 5 of both sides. This undoes the 5 on the left, leaving just $x + 2$ $x+2$ . On the right is ${log}_{5} 2$ $log_"5"2$ , which can be put into a calculator using the change of base formula, in which ${log}_{5} 2 = \frac{log 2}{log 5}$ $log_"5"2=(log2)/(log5)$ .

Then, 2 is subtracted from both sides, leaving $x$ $x$ equal to $\frac{log 2}{log 5} - 2 \approx - 1.57$ $(log2)/(log5)-2~~-1.57$ .

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