How do you factor $15x^2-9x-14$ ?

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How do you factor $15x^2-9x-14$ ?

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Answer 1 · 2017-04-16T11:52:18

$15x^2-9x-14 = 1/60(30x-9-sqrt(921))(30x-9+sqrt(921))$

Explanation:

Here's how you can do it by completing the square. I will use $60 = 15*2^2$ as a multiplier to allow me to work mostly in integers. Then use the difference of squares identity:

$a^2-b^2 = (a-b)(a+b)$

with $a=(30x-9)$ and $b=sqrt(921)$ as follows:

$15x^2-9x-14 = 1/60(900x^2-540x-840)$

$color(white)(15x^2-9x-14) = 1/60((30x)^2-2(30x)(9)+9^2-921)$

$color(white)(15x^2-9x-14) = 1/60((30x-9)^2-(sqrt(921))^2)$

$color(white)(15x^2-9x-14) = 1/60((30x-9)-sqrt(921))((30x-9)+sqrt(921))$

$color(white)(15x^2-9x-14) = 1/60(30x-9-sqrt(921))(30x-9+sqrt(921))$

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How do you factor $15x^2-9x-14$ ?

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