Question

asked Dec 16, 2020 220k views

2 Answers

Lei Mou · Answer 1 · 2020-12-17T14:56:06+0000

Answer:

$x=-3\±√(15)$

Explanation:

We have the following equation

x^2+6x-6=0

To use the method of completing squares you must take the coefficient of x and divide it by 2 and square the result.

((6)/(2))^2=9

Now add 9 on both sides of equality

(x^2+6x+ 9)-6=9

Factor the term in parentheses

(x+3)^2-6=9

Add 6 on both sides of the equation

(x+3)^2-6+6=9+6

(x+3)^2=15

Take square root on both sides of the equation

$√((x+3)^2)=\±√(15)$

$x+3=\±√(15)$

Subtract 3 from both sides of the equation.

$x+3-3=-3\±√(15)$

$x=-3\±√(15)$

Ben Sharpe · Answer 2 · 2020-12-19T20:42:31+0000

For this case we must solve the following equation by completing squares:

x ^ 2 + 6x-6 = 0

We add 6 to both sides of the equation:

x ^ 2 + 6x = 6

We divide the middle term by 2, and square it:

$(\frac {6} {2}) ^ 2$

And we add it to both sides of the equation:

$x ^ 2 + 6x + (\frac {6} {2}) ^ 2 = 6 + (\frac {6} {2}) ^ 2\\x ^ 2 + 6x + (3) ^ 2 = 6 + 9$

We rewrite the left part of the equation:

(x + 3) ^ 2 = 15

We apply root to both sides:

$x + 3 = \pm \sqrt {15}$

We have two solutions:

$x_ {1} = \sqrt {15} -3\\x_ {2} = - \sqrt {15} -3$

Answer:

$x_ {1} = \sqrt {15} -3\\x_ {2} = - \sqrt {15} -3$

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