How do you simplify $(x-3)/(x+2)$ ?

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Answer 1 · 2017-05-14T20:25:33

$(x-3)/(x+2) = 1-5/(x+2)$

As a rational expression,

$(x-3)/(x+2)$

is already in simplest form.

However, it is possible to separate it out into the sum of a trivial polynomial and a partial fraction with constant numerator:

$(x-3)/(x+2) = ((x+2)-5)/(x+2) = 1-5/(x+2)$

One advantage of this form is that $x$ only occurs once, so it is easy to invert as a function:

Let:

$y = 1-5/(x+2)$

Add $5/(x+2)-y$ to both sides to get:

$5/(x+2) = 1-y$

Take the reciprocal of both sides to get:

$(x+2)/5 = 1/(1-y)$

Multiply both sides by $5$ to get:

$x+2 = 5/(1-y)$

Subtract $2$ from both sides to get:

$x = 5/(1-y)-2$

So if:

$f(x) = (x-3)/(x+2) = 1-5/(x+2)$

then:

$f^(-1)(y) = 5/(1-y)-2$

How do you simplify (x-3)/(x+2)(x-3)/(x+2)?