Find 2 numbers whose product has maximum factors
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Let's assume n and n + 1 , be any two numbers ,
In mathematical generality , n ( n + 1 ) will yield prime number formats as a result , which isn't required here , again , n ( n ) = n ² which may be even or odd in nature , we can't obtain that information on the basis of number selection ,
Secondly , if n is odd , n + 1 is even ,
n is even , then n + 1 is odd for sure ,
Required we've to obtain a product with maximum factors , just according to density property of real numbers , there exists many such numbers infinitely , so , we can't conclude easily , but it's generated format is in the above equations ,
Largest primes , M48 - 1 WOULD RESULT IN THE SAME
Remember , it's subtracted ( - 1 )
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In mathematical generality , n ( n + 1 ) will yield prime number formats as a result , which isn't required here , again , n ( n ) = n ² which may be even or odd in nature , we can't obtain that information on the basis of number selection ,
Secondly , if n is odd , n + 1 is even ,
n is even , then n + 1 is odd for sure ,
Required we've to obtain a product with maximum factors , just according to density property of real numbers , there exists many such numbers infinitely , so , we can't conclude easily , but it's generated format is in the above equations ,
Largest primes , M48 - 1 WOULD RESULT IN THE SAME
Remember , it's subtracted ( - 1 )
★✩★✩★✩★✩★✩★✩★✩★✩★✩★✩★
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