How do you solve $n^2 + 19n + 66 = 6$ by completing the square?

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How do you solve $n^2 + 19n + 66 = 6$ by completing the square?

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Answer 1 · 2015-04-29T20:32:51

First simplify the process by moving the constant term to the right side of the equation;
then add whatever constant is necessary to both sides so that the left side is a square;
finally take the square root of both sides and simplify.

$n^2+19n+66 = 6$

$n^2+19n = -60$

If $n^2 + 19n$ are the first two terms of a square
$(n+a)^2 = (n^2+2an+a^2)$
then
$a = 19/2$
and
$a^2 = (19/2)^2 = 361/4 = 90 1/4$

$n^2 + 19n + (19/2)^2 = -60 +90 1/4$

$(n+19/2)^2 = 30 1/4 = 121/4$

$n+19/2 = +-sqrt(121/4) = +- 11/2$

$n = -19/2 +- 11/2 = (-19 +-11)/2$

$n = -15$
or
$n=--4$

Answer 2 · 2015-04-29T21:54:01

$n=-4, -15$

You can solve the problem by factoring.

$n^2+19n+66=6$

Subtract 6 from both sides.

$n^2+19n+60=0$

Factor.

$4xx15=60 and 4+15=19$

$(n+4)(n+15)=0$

$n+4=0$

$n=-4$

$n+5=0$

$n=-5$

$n=-4, -15$

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