Which statement(s) true when solving the equation for x? x^2=81/144
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
None of these statements are true when solving the equation x^2 = 81/144. The correct process would be to take the square root of both sides to solve for x, giving you x = ±9/12 = ±3/4.
Is this correct?
Apologies for the confusion in my previous response. Let's correct it:
To solve the equation x^2 = 81/144, you would take the square root of both sides to find the value of x. Remember that when taking the square root, you should consider both the positive and negative roots.
√(x^2) = √(81/144)
x = ±√(81/144)
x = ±(9/12)
x = ±3/4
Therefore, the correct solution for x in the equation x^2 = 81/144 is x = ±3/4.