Quizzes & Puzzles7 mins ago
Maths Problem
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I am trying to find square numbers which divide by 3, 5 and 7. Is there a quick method please?
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For more on marking an answer as the "Best Answer", please visit our FAQ.In fact if a square number is divisible by 3, then it must also be divisible by 3^2 = 9, and so on. So you are looking for numbers that are divisible not only by 3, 5, 7 but also 3 twice, 5 twice and 7 twice.
If it's these numbers individually then you can take 3^2 = 9, (3^2)*(2^2) = 9*4 = 36 etc. along with 5^2= 25, (5^2*)*(2^2) = 25*4 = 100 etc.
Otherwise you are looking for square numbers which are multiples of (3^2)*(5^2)*(7^2) = 9*25*49 = 11025, and then take square multiples of this.
The key point then is that square numbers have each distinct prime number as a factor an even number of times (0,2,4,6 times... but always an even number of the same prime factor).
If it's these numbers individually then you can take 3^2 = 9, (3^2)*(2^2) = 9*4 = 36 etc. along with 5^2= 25, (5^2*)*(2^2) = 25*4 = 100 etc.
Otherwise you are looking for square numbers which are multiples of (3^2)*(5^2)*(7^2) = 9*25*49 = 11025, and then take square multiples of this.
The key point then is that square numbers have each distinct prime number as a factor an even number of times (0,2,4,6 times... but always an even number of the same prime factor).