How do you factor the trinomial #4a^2-16ab+15b^2#?

1 Answer
Nghi N.
Apr 27, 2016

(2a - 3)(2a - 5)

Explanation:

Consider a as an variable, b as a constant, and factor the trinomial, using the new AC Method (Socratic Search).
#y = 4a^2 - 16ab + 15b^2 =# 4(a + p)(a + q)
Converted trinomial #y' = a^2 - 16ab + 60b^2 =# (a + p')(a + q')
p' and q' have same sign because ac > 0.
Factor pairs of #(ac = 60b^2) #--> (-6b, -10b). This sum is -16b = b. Then p' = -6b and q' = -10b.
Back to original trinomial y, #p = (p')/a = -6b/4 = -(3b)/2# and
#q = (q')/a = -(10b)/4 = (-5b)/2.#
Factored form : #y = 4(a - (3b)/2)(a - (5b)/2) = (2a - 3b)(2a - 5b)#

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