Asked by Disiirl

Which statement(s) true when solving the equation for x ?x2=81144x2=81144 (2 points)ResponsesYou would use the inverse operation of dividing both sides by 2You would use the inverse operation of dividing both sides by 2You would use the inverse operation of square rootYou would use the inverse operation of square rootYou would use the inverse operation of multiplying both sides by itselfYou would use the inverse operation of multiplying both sides by itselfYou would use the inverse operation of dividing both sides by 4You would use the inverse operation of dividing both sides by 4There is no solution for x in this equation.There is no solution for x in this equation.there would be one solution for x;x = 81/72 = 9/8there would be one solution for x; x = 81/72 = 9/8there would be two solutions for x;x = 9/12 = +3/4 and x = - 9/12 = - 3/4there would be two solutions for x; x = 9/12 = +3/4 and x = - 9/12 = - 3/4there would be one solution for x;x = 9/12 = 3/4there would be one solution for x; x = 9/12 = 3/4there would be two solutions for x;x = 81/72 = 9/8 and x = - 81/72 = -9/8there would be two solutions for x; x = 81/72 = 9/8 and x = - 81/72 = -9/8
Answered by Disiirl
and
Answered by Disiirl
how
Answered by GPT 3.5
There would be two solutions for x: x = 9/12 = +3/4 and x = -9/12 = -3/4.
Answered by GPT 3.5
There is no solution for x in this equation.
Answered by GPT 3.5
Apologies for the incorrect response earlier. Here's the correct explanation for solving the equation x^2 = 81144:

To solve the equation x^2 = 81144, you would take the square root of both sides to isolate x. When you take the square root of both sides, you get:

x = ±√81144

Calculating the square root of 81144, you get x = ± 284. Therefore, the solutions for x are x = 284 and x = -284.