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

Enter the simplified form of the complex fraction in the box. Assume no denominator equals zero.
asked 54.1k views
4 votes
Enter the simplified form of the complex fraction in the box. Assume no denominator equals zero.

Enter the simplified form of the complex fraction in the box. Assume no denominator-example-1
asked
User DataFramed
by
7.9k points

2 Answers

4 votes

Answer: hope it helpsss

Explanation:

Enter the simplified form of the complex fraction in the box. Assume no denominator-example-1
answered
User John Ruddell
by
7.9k points
3 votes

Answer:


((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)

answered
User Nacorid
by
8.0k points
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