Question

Find the smallest number by which 8788 be divided so that the quotient is perfect cube.​

Answer 1

Answer:

in this question u first have prime factorize the no.

after prime factorization , we get

$\sqrt{8788} = 2*2*13*13*13 \\=>8788 =\sqrt{2*2*13*13*13} \\\ since \ 13 \ cant \ be \ paired \\ therefore \ 13 \ the \ smallest \ no. \ by \ which \ 8788 \ be \ divided \ so \ that \ the \ quotient \ is \\ perfect \ cube.$

Step-by-step explanation:

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Answer 2

Answer:

4

Step-by-step explanation:

8788 = 2×2×13×13×13

8788 =2²×13³

8788 = 4×13³

8788/4 = 13³

so the smallest number by which 8788 be divided so that the quotient is a perfect cube is

4

here is your answer

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