Math, asked by satya2196, 1 year ago

LCM of 2/3, 8/9, 32/81, 10/27​

Answers

Answered by premshrukkgs
8

Answer:

LCM of fractions is LCM of the numerators divided by HCF of denominators.

LCM (2, 8, 32) = 32

HCF (3, 9, 81) = 3

So LCM (2/3, 8/9, 32/81) = 32/3

Answered by krishnaanandsynergy
1

Answer:

We can find the L.C.M of the fractions. For that, we should divide the L.C.M numerator and H.C.F of denominator.

Answer: LCM of 2/3, 8/9, 32/81, 10/27​ is \frac{160}{3}

Step-by-step explanation:

  • Numerator value is: 2, 8, 32, 10
  • L.C.M of numerator value 2, 8, 32, 10 is 160. Explanation will show in the following image.
  • Denominator value is: 3, 9, 81, 27
  • H.C.F of denominator value 3, 9, 81, 27 is 3.
  • L.C.M of   \frac{2}{3},\frac{8}{9},\frac{32}{81},\frac{10}{27}=\frac{L.C.M of numerator}{H.C.F of denominator}
  • Answer: LCM of \frac{2}{3},\frac{8}{9},\frac{32}{81},\frac{10}{27}=\frac{160}{3}

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