Solve the quadratic equation 4x2 − 121 = 0. Verify your answer using a difference-of-squares factoring method. a, x equals plus or minus start fraction two over 11 end fraction …

Question

asked Jan 2, 2021 85.7k views

1 Answer

Warren Buckley · Answer 1 · 2021-01-08T00:46:50+0000

Answer:

Option d) is correct

That is x equals plus or minus start fraction 11 over two end fraction

Explanation:

Given quadratic equation is
4x^2-121=0

To write the given quadratic equation by using a difference-of-squares factoring method:

4x^2-121=0

The above equation can be written as

4x^2-11^2=0

(2x)^2-11^2=0

The above equation is in the form of difference-of-squares

Therefore the given quadratic equation can be written in the form of difference-of-squares

by factoring method is
(2x)^2-11^2=0

(2x+11)(2x-11)=0 (which is in the form
a^2-b^2=(a+b)(a-b) )

2x+11=0 or 2x-11=0

x=(-11)/(2) or
2x=11

x=(-11)/(2) or
x=(11)/(2)

$x=\pm (11)/(2)$

Therefore option d) is correct

That is x equals plus or minus start fraction 11 over two end fraction