Math, asked by AtaKezz1999, 1 month ago

Find the smallest number by which 88209 can be divided so that the quotient is a perfect cube.​

Answers

Answered by anjugoyal954
1

Answer:

11×11 is the number by which 88209 must be divided to make the quotient a perfect cube. Hence, the smallest number is 121, which when divides 88209, the quotient is 729 which is a perfect cube

Answered by DarkenedSky
7

To find the smallest number by which 88209 must be divided so that the quotient is a perfect cube, we have to find the prime factors of 88209.

88209=3x3x3x3x3x3x11x11

Prime factors of 88209 are 3,3,3,3,3,3,11,11.

Out of the prime factors of 88209, 11 cannot be considered in its perfect cube as it have only two factors of 11.

So, 11x11 is the number by which 88209 must be divided to make the quotient a perfect cube.

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