Question

Find the smallest number by which 8788 be divided so that the quotient is a
perfect cube.
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Answer 1

Hello!✌

Question:

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

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

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

Solution:

$\sqrt[3]{8788} = 2 \times 2 \times 13 \times 13 \times 13$

Clearly,for a perfect cube it must be divided by 2 *2 = 4

Hope this helps

@adiba31❤✌

Answer 2

$\huge{\mathfrak{\green{S}}}{\mathfrak{o}}{\mathfrak {\orange {l}}}{\mathfrak{\red{u}}}{\mathfrak {\pink {t}}}{\mathfrak{\blue{i}}}{\mathfrak{\purple {o}}}{\mathfrak {\gray {n}}}$

=>8788=2×2×13×13×13

=>8788=2² ×13³

=>8788=4×13³

=> 48788 =13³

Hence ,while dividing 8788 with a smallest number and we get quotient is a perfect cube is 4