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Question

Prove that (5-3) is irrational.
Or, prove that 335 is irrational.

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Solution

Let us assume that 5-3 is rational. That is, we can find integers p and q(≠ 0) such that
5-3=pq or 5-pq=3
3=5-pq
Since, p and q are integers, 5-pq is rational; so, 3 is rational.
But this contradicts the fact that 3 is irrational.
So, we can conclude that 5-3 is irrational.

OR
Let us assume that 335 is rational. That is, we can find co -prime integers p and q(≠ 0) such that 335=pq or 5p3q=3
3=5p3q
Since, p and q are integers, 5p3q is rational; so, 3 is rational.
But this contradicts the fact that 3 is irrational.
So, we can conclude that335 is irrational.

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