rational number for all distinct numbers a, b. e in A. Prove that there exists a positive integer M such that a √M is a
Question
Rational number for all distinct numbers a, b. e in A.
Prove that there exists a positive integer M such that a is a
Solution
It seems like there's a part of your question missing. However, I can start explaining how to prove that there exists a positive integer M such that a √M is a rational number for all distinct numbers a, b. e in A.
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First, we need to understand what a rational number is. A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, with the denominator q not equal to zero.
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Now, let's assume that a is a rational number. This means that a can be written as p/q, where p and q are integers and q ≠ 0.
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We want to find a positive integer M such that a √M is also a rational number. This means that we want to find M such that √M = q/p.
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Squaring both sides of the equation gives M = (q^2) / (p^2).
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Since p and q are integers, (q^2) / (p^2) is also an integer, provided that p ≠ 0.
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Therefore, there exists a positive integer M such that a √M is a rational number for all distinct numbers a, b. e in A.
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