How do you solve $24x^3+18x^2-168x = 0$ ?

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How do you solve $24x^3+18x^2-168x = 0$ ?

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Answer 1 · 2015-06-11T18:13:56

First off, notice that you can divide out $x$ . That means one of the solutions is $x = 0$ .

$0 = 24x^2 + 18x - 168$

Now you can divide by 3.

$0 = 8x^2 + 6x - 56$

You can't really factor it into integers though. The factors of 56 include 1, 2, 4, 7, 8, 14, 28, and 56. The ones that could work with $8x$ and $x$ to give $6$ are $7$ with $8$ or $4$ with $14$ ; the rest are too far apart. Regardless, neither of those give $6x$ in the end. So:

$x = [-b pm sqrt(b^2 - 4ac)]/(2a)$

$= [-6 pm sqrt(36 - 4*8*-56)]/(16)$

$= [-6 pm sqrt(1828)]/(16)$

$= [-6 pm 2sqrt(457)]/(16)$

Overall:

$x = 0$
$x ~~ 2.3125$
$x ~~-3.0625$

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How do you solve $24x^3+18x^2-168x = 0$ ?

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How do you solve $24x^3+18x^2-168x = 0$ ?