How do you factor k^2 + 8k = 84?

2 Answers
Alan P. · Meave60
Jul 29, 2015

(k-6)(k+14)=0

Explanation:

One way to approach this problem is by "completing the square"

k^2+8k =84
color(white)("XXXX")if k^2+8x are the first 2 terms of a squared binomial)
color(white)("XXXX")rarr the third terms must be (8/2)^2

k^2+8k+4^2 = 84 + 4^2

(k+4)^2 = 100

k+4 = +-10

k= 6 or k=-14

(k-6)(k+14) = 0

Nghi N. · Alan P.
Jul 29, 2015

Factor: y = k^2 + 8k - 84

Ans: (k - 6)(k + 14)

Explanation:

y = k^2 + 8k - 84.
I use the new AC Method. a and c have opposite signs.
Factor pairs of (-84) --> (-2, 42)(-3, 28)(-6, 14). This sum is 8 = b.

y = (k - 6)(k + 14)

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