How do you simplify $\frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }$ ?

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How do you simplify $\frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }$ ?

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Answer 1 · 2017-02-01T20:23:18

$-(2(x^3-2x^2-11x+16))/(x(x+4)(x-2))$

Explanation:

Assuming you wrote the question correctly, there isn't much simplification you can do for this expression.

A negative two ( $-2$ ), can be factored out of the numerator, giving:

Numerator: $-2(x^3-2x^2-11x+16)$

The denominator can be factored in two steps. First, factor out the $x$ which is common to all the terms:

Denominator: $x(x^2+2x-8)$

Second, factor the second term:

Denominator: $x(x+4)(x-2)$

Now, simply place the new numerator over the new denominator, giving:

$-(2(x^3-2x^2-11x+16))/(x(x+4)(x-2))$ .

NOTE: This is a little strange for an introductory algebra course. Students are usually given something that factors "nicely", reducing multiple terms. For example, if the problem had asked you this:

$(-2x^3+4x^2+22x-24)/(x^3+2x^2-3x)$

You would have been able to reduce that to this:

$-(2(x-4))/(x)=8/x-2$

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How do you simplify $\frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }$ ?

1 Answer

Explanation:

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How do you simplify \frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }\frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }?

1 Answer

Explanation:

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How do you simplify $\frac { - 2x ^ { 3} + 4x ^ { 2} + 22x - 32} { x ^ { 3} + 2x ^ { 2} - 8x }$ ?