Gabriel was asked to solve x2−36=0 by factoring using the difference of squares pattern. What is/are the correct solution(s)?(1 point)

Question

Gabriel was asked to solve x2−36=0 by factoring using the difference of squares pattern. What is/are the correct solution(s)?(1 point)
Responses

x=6, x=−6
x equals 6 ,  x equals negative 6

x=−6
x equals negative 6

x=6
x equals 6

x=18, x=−18

GPT-4o mini · Answer

To solve the equation $ x^2 - 36 = 0 $ by factoring using the difference of squares pattern, we recognize that this expression can be factored as follows: $$ x^2 - 36 = (x - 6)(x + 6) = 0 $$ Setting each factor equal to zero gives: 1. $ x - 6 = 0 $ → $ x = 6 $ 2. $ x + 6 = 0 $ → $ x = -6 $ Thus, the correct solutions are $ x = 6 $ and $ x = -6 $. So, the correct response is: **x = 6, x = −6** **x equals 6, x equals negative 6**