How do you factor the expression $16 y^{2} - 12 y + 2$ $16y^2 - 12y + 2$ ?

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How do you factor the expression $16 y^{2} - 12 y + 2$ $16y^2 - 12y + 2$ ?

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Answer 1 · 2016-04-26T01:40:46

f(y) = 2(4y - 1)(2y - 1)

Explanation:

There is a systematic, non- guessing, new AC Method (Socratic Search)
$f (y) = 16 y^{2} - 12 y + 2 =$ $f(y) = 16y^2 - 12y + 2 =$ 16(y + p)(y + q)
Converted trinomial $f'(y) = x^2 - 12y + 32 =$ (x + p')(x + q')
p' and q' have same sign, because ac > 0.
Factor pairs of (ac = 32) --> (-4, -8) . This sum is -12 = b. Then, p' = -4 and q' = -8.
Back to f(y), $p = (p')/a = -4/16 = -1/4$ and $q = (q')/a = -8/16 = -1/2$ .
Factored form: $f(y) = 16(y - 1/4)(y - 1/2) = 2(4y - 1)(2y - 1)$

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How do you factor the expression $16 y^{2} - 12 y + 2$ $16y^2 - 12y + 2$ ?

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