How do you solve c^2 + 8c + 2 = 5c + 15 by completing the square?

2 Answers
mizoo
Apr 25, 2018

See the Explanation:

Explanation:

c^2 + 8c + 2 = 5c + 15
c^2 + 3c = 13
c^2 + 2(3/2)c = 13
c^2 + 2(3/2)c + (3/2)^2 - (3/2)^2 = 13
(c + 3/2)^2 - (3/2)^2 = 13
(c + 3/2)^2 = 13 + 9/4
c + 3/2 = +- sqrt(13 + 9/4)
c = -3/2 +- sqrt61/2

Jim G.
Apr 25, 2018

c=-3/2+-1/2sqrt61

Explanation:

"rearrange equation into "color(blue)"standard form"

"subtract "5c+15" from both sides"

rArrc^2+3c-13=0larrcolor(blue)"in standard form"

"using the method of "color(blue)"completing the square"

• " the coefficient of the "c^2" term must be 1 which it is"

• " add/subtract "(1/2"coefficient of the c-term")^2" to"
c^2+3c

c^2+2(3/2)c color(red)(+9/4)color(red)(-9/4)-13=0

rArr(c+3/2)^2-61/4=0

rArr(c+3/2)^2=61/4

color(blue)"take the square root of both sides"

rArrc+3/2=+-sqrt(61/4)larrcolor(blue)"note plus or minus"

rArrc+3/2=+-1/2sqrt61

"subtract "3/2" from both sides"

rArrc=-3/2+-1/2sqrt61larrcolor(red)"exact solutions"

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