Question

Enter the simplified form of the complex fraction in the box. Assume no denominator equals zero.

Answer 1

Answer: hope it helpsss

Explanation:

Answer 2

`((9-x))/(3x)`

Explanation:

we have

`((2)/(x-3)-(3)/(x))/((3)/(x-3))`

step 1

Solve the numerator of the quotient

`(2)/(x-3)-(3)/(x)=(2x-3(x-3))/((x-3)x)=(2x-3x+9)/((x-3)x)=(9-x)/((x-3)x)`

step 2

substitute in the original expression

`((9-x)/((x-3)x))/((3)/(x-3))`

`((x-3)(9-x))/(3x(x-3))`

step 3

simplify

`((9-x))/(3x)`