How do you solve $log (3x+1) = 1 + log (2x-1)$ ?

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How do you solve $log (3x+1) = 1 + log (2x-1)$ ?

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Answer 1 · 2015-12-23T01:41:44

The explanation is given below.

Explanation:

$log(3x+1)=1+log(2x-1)$
$log(3x+1)=log(10)+log(2x-1)$ since $log(10)=1$
$log(3x+1)=log(10(2x-1))$ Product rule of logarithms
$3x+1 = 10(2x-1)$ if logA = log B then A= B
$3x+1 = 20x-10$ distributive law

Now we have to solve for x using inverse operaitions to isolate x.

$3x+1 + 10 = 20x-10+10$

Adding 10 on both sides would remove $10$ from the right side of the equation

$3x+11=20x$
$3x+11-3x=20x-3x$

Subtracting $3x$ on both sides would isolate the term containing $x$ to one side of the equation.

$11=17x$

Dividing both sides by 17 we get

$11/17=(17x)/17$

$11/17 = x$

$x=11/17$ Answer

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How do you solve $log (3x+1) = 1 + log (2x-1)$ ?

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How do you solve $log (3x+1) = 1 + log (2x-1)$ ?