How do you simplify $(6x^2-4x-3)/(3x^2+x)$ ?

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How do you simplify $(6x^2-4x-3)/(3x^2+x)$ ?

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Answer 1 · 2017-01-08T15:40:33

$(6x^2-4x-3)/(3x^2+x) = 2-(6x+3)/(3x^2+x)$

Explanation:

Notice that:

$3x^2+x = x(3x+1)$

Then $x$ is not a factor of the numerator, but $(3x+1)$ might be.

Let's try:

$6x^2-4x-3 = (6x^2+2x)-(6x+2)-1$

$color(white)(6x^2-4x-3) = 2x(3x+1)-2(3x+1)-1$

$color(white)(6x^2-4x-3) = (2x-2)(3x+1)-1$

No. So there is no cancellable factor and we cannot substantially simplify the given rational expression.

About the most we can do is separate out the quotient $2$ as follows:

$(6x^2-4x-3)/(3x^2+x) = ((6x^2+2x)-(6x+3))/(3x^2+x)$

$color(white)((6x^2-4x-3)/(3x^2+x)) = (2(3x^2+x)-(6x+3))/(3x^2+x)$

$color(white)((6x^2-4x-3)/(3x^2+x)) = 2-(6x+3)/(3x^2+x)$

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How do you simplify $(6x^2-4x-3)/(3x^2+x)$ ?

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How do you simplify $(6x^2-4x-3)/(3x^2+x)$ ?