How do you factor the trinomial $20 q^{2} - 39 q b + 18 b^{2}$ $20q^2-39qb+18b^2$ ?

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How do you factor the trinomial $20 q^{2} - 39 q b + 18 b^{2}$ $20q^2-39qb+18b^2$ ?

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Answer 1 · 2016-04-27T17:41:09

(4a - 3b)(5a - 6b)

Explanation:

Factor: $20 a^{2} - 39 a b + 18 b^{2}$ $20a^2 - 39ab + 18b^2$ .
Use the new AC Method to factor trinomials (Socratic Search)
Consider a as variable and b as constant. Factor the trinomial:
$y = 20 a^{2} - 39 a b + 18 b^{2} =$ $y = 20a^2 - 39ab + 18b^2 =$ 20(a + p)(a+ q)
Converted trinomial: $y' = a^2 - 39ab + 360b^2 =$ (a + p')(a + q')
p' and q' have same sign because ac > 0.
Factor pairs of (ac = 260b^2) --> ..(-10b, -36b)(-15b, -24b). This sum is
-39b. Then, p' = -15b and q' = -24b.
Back to original trinomial y, $p = (p')/a = -(15b)/20 = -(3b)/4$ ,
and $q = (q')/a = -(24b)/20 = -(6b)/5$
Factored form: $y = 20(a - (3b)/4)(a - (6b)/5) = (4a - 3b)(5a - 6b)$

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How do you factor the trinomial $20 q^{2} - 39 q b + 18 b^{2}$ $20q^2-39qb+18b^2$ ?

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Explanation:

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How do you factor the trinomial $20 q^{2} - 39 q b + 18 b^{2}$ $20q^2-39qb+18b^2$ ?