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Use the quadratic formula to find both solutions to the quadratic equation

given below.
x² + 8x = 20
O A. x - ³-√²7
2
B. X=2
□ C. x = -6-√27
D. x=-10
E. x = -1
F.
X=
-6+ √27
2

User Zhirzh
by
3.2k points

1 Answer

23 votes
23 votes

Answer:

B. x=2 and D. x=-10

Explanation:

We have the quadratic formula:
x=\frac{-b\sqrt{b^(2) -4ac} }{2a}

Quadratic equations are in the form
ax^2+bx+c

We have to get the equation equal to zero before we can use the quadratic formula so subtract 20 from both sides and we get
x^2+8x-20=0


a=1, b=8, c=-20

Now we plug these values into the quadratic equation


x=\frac{-8\sqrt{8^(2)-4(1)(-20) } }{2(1)}

Now we solve for x


x=(-8√(64+80) )/(2)


x=(-8√(144) )/(2)

Now we get two equations because the square root gives us both a positive and a negative answer.


x=((-8)+12)/(2) and
x=((-8)-12)/(2)

Let's solve the first one now


x=(4)/(2)


x=2

Now the second one


x=(-20)/(2)


x=-10

so
x=2 and
x=-10

so the answers are B and D.

Hope this helps!

User Bitman
by
3.2k points