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Question

Find the smallest number by which 1575 must be divided so that the quotient becomes a perfect square.

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Solution

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Given number is 1575 first we write it as the product of prime factors
3 1575
3 525
5 175
5 35
7 7
1
$∴$ $1575 = 3 \times 3 - ---- - \times 5 \times 5 - ---- - \times 7$
Clearly 7 has no pair so if we divide it by 7 then quotient become a perfect square

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