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Combine as indicated by the signs. Write variables alphabetically in your answer. 3/x+1/xyz+2/xy

Combine as indicated by the signs. Write variables alphabetically in your answer. 3/x+1/xyz+2/xy
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Combine as indicated by the signs. Write variables alphabetically in your answer. 3/x+1/xyz+2/xy

User GFu
by
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2 Answers

7 votes

(3yz+2z+1)/(xyz) should be your answer
User MartinM
by
8.7k points
2 votes

Answer:


(3yz+2z+1)/(xyz)

Explanation:

Given expression,


(3)/(x)+(1)/(xyz)+(2)/(xy)

∵LCM(x, xyz, xy) = xyz,


(3)/(x)=(3yz)/(xyz)


(2)/(xy)=(2z)/(xy)


\implies (3)/(x)+(1)/(xyz)+(2)/(xy)=(3yz)/(xyz)+(1)/(xyz)+(2z)/(xyz)


=(3yz+1+2z)/(xyz)


=(3yz+2z+1)/(xyz)

User Fringley
by
7.6k points
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