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Which statement(s) true when solving the equation for x ?x2=81144x2=81144 (2 points)ResponsesYou would use the inverse operatio...Asked by @~@
Which statement(s) true when solving the equation for x ?
x2=81144
(2 points)
Responses
You would use the inverse operation of dividing both sides by 2
You would use the inverse operation of dividing both sides by 2
You would use the inverse operation of square root
You would use the inverse operation of square root
You would use the inverse operation of multiplying both sides by itself
You would use the inverse operation of multiplying both sides by itself
You would use the inverse operation of dividing both sides by 4
You would use the inverse operation of dividing both sides by 4
There 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 = 9/8
there would be one solution for x; x = 81/72 = 9/8
there would be two solutions for x;
x = 9/12 = +3/4 and x = - 9/12 = - 3/4
there would be two solutions for x; x = 9/12 = +3/4 and x = - 9/12 = - 3/4
there would be one solution for x;
x = 9/12 = 3/4
there would be one solution for x; x = 9/12 = 3/4
there would be two solutions for x;
x = 81/72 = 9/8 and x = - 81/72 = -9/8
x2=81144
(2 points)
Responses
You would use the inverse operation of dividing both sides by 2
You would use the inverse operation of dividing both sides by 2
You would use the inverse operation of square root
You would use the inverse operation of square root
You would use the inverse operation of multiplying both sides by itself
You would use the inverse operation of multiplying both sides by itself
You would use the inverse operation of dividing both sides by 4
You would use the inverse operation of dividing both sides by 4
There 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 = 9/8
there would be one solution for x; x = 81/72 = 9/8
there would be two solutions for x;
x = 9/12 = +3/4 and x = - 9/12 = - 3/4
there would be two solutions for x; x = 9/12 = +3/4 and x = - 9/12 = - 3/4
there would be one solution for x;
x = 9/12 = 3/4
there would be one solution for x; x = 9/12 = 3/4
there would be two solutions for x;
x = 81/72 = 9/8 and x = - 81/72 = -9/8
Answers
Answered by
@~@
are you sure
Answered by
GPT 3.5
None of these statements are true when solving the equation x^2 = 81144.
To solve for x when x^2 = 81144, you need to take the square root of both sides. The square root of 81144 is 285. Therefore, x = ±285.
To solve for x when x^2 = 81144, you need to take the square root of both sides. The square root of 81144 is 285. Therefore, x = ±285.
Answered by
GPT 3.5
I apologize for the mistake in my previous response. Let me clarify:
To solve for x when x^2 = 81144, you would take the square root of both sides. The square root of 81144 is 285.28 (rounded to two decimal places). Therefore, x = ±285.28.
So, the statement "You would use the inverse operation of square root" is the correct statement when solving the equation x^2 = 81144.
To solve for x when x^2 = 81144, you would take the square root of both sides. The square root of 81144 is 285.28 (rounded to two decimal places). Therefore, x = ±285.28.
So, the statement "You would use the inverse operation of square root" is the correct statement when solving the equation x^2 = 81144.
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