How do you solve ${log}_{10} (x + 4) - {log}_{10} x = {log}_{10} (x + 2)$ $log_10(x+4)-log_10x=log_10(x+2)$ ?

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How do you solve ${log}_{10} (x + 4) - {log}_{10} x = {log}_{10} (x + 2)$ $log_10(x+4)-log_10x=log_10(x+2)$ ?

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Answer 1 · 2017-01-30T11:45:11

I got: $x = \frac{- 1 + \sqrt{17}}{2}$ $x=(-1+sqrt(17))/2$

Explanation:

We can use a property of logs to write a difference of logs into a log of a fraction:
${log}_{10} (\frac{x + 4}{x}) = {log}_{10} (x + 2)$ $log_(10)((x+4)/(x))=log_(10)(x+2)$
If the logs are equal then also the arguments have to be. So:
$\frac{x + 4}{x} = x + 2$ $(x+4)/x=x+2$
Rearrange and solve for $x$ $x$ :
$x + 4 = x^{2} + 2 x$ $x+4=x^2+2x$
$x^{2} + x - 4 = 0$ $x^2+x-4=0$
Use the Quadratic Formula:
$x_{1, 2} = \frac{- 1 \pm \sqrt{1 + 16}}{2}$ $x_(1,2)=(-1+-sqrt(1+16))/2$
I can only accept the positive solution to avoid a negative argument in ${log}_{10} (x)$ $log_(10)(x)$ .

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How do you solve ${log}_{10} (x + 4) - {log}_{10} x = {log}_{10} (x + 2)$ $log_10(x+4)-log_10x=log_10(x+2)$ ?

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How do you solve ${log}_{10} (x + 4) - {log}_{10} x = {log}_{10} (x + 2)$ $log_10(x+4)-log_10x=log_10(x+2)$ ?