1 Answer

Ingroxd · Answer 1 · 2020-07-08T10:28:07+0000

We can divide both sides by the expression on either side:

$|3x+1|=|2x-7|\implies(|3x+1|)/(|2x-7|)=1\implies\left|(3x+1)/(2x-7)\right|=1$

Then we use the definition of absolute value:

$|x|:=\begin{cases}x&\text{if }x\ge0\\-x&\text{if }x<0\end{cases}$

So we have two possible cases:

1) If
$(3x+1)/(2x-7)\ge0$ , then
$\left|(3x+1)/(2x-7)\right|=(3x+1)/(2x-7)$ , and solving the equation gives

$(3x+1)/(2x-7)=1\implies3x+1=2x-7\implies x=-8$

2) If
(3x+1)/(2x-7)<0 , then
$\left|(3x+1)/(2x-7)\right|=-(3x+1)/(2x-7)$ , and

$-(3x+1)/(2x-7)=1\implies(3x+1)/(2x-7)=-1\implies3x+1=-2x+7\implies5x=6$

$\implies x=\frac65$

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