show that (-)^2 is a rational no.
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(√3 - √5)² is not a rational number. Its an irrational number.
I'll give you the proof for (√3-√5)² being an irrational number.
Let us assume that (√3-√5)² is a rational number which can be expressed in p/q form where p and q are integers and q≠0
(√3-√5)² = p/q
(√3)² + (√5)² - 2(√3)(√5) = p/q (∵ using the identity (a-b)² = a² + b² - 2ab)
3 + 5 - 2√15 = p/q
8 -2√15=p/q
8 - p/q = 2√15
= 2√15
= √15
Since p,q,8,2 are integers, is rational. But we know that √15 is irrational. This contradiction has arisen because of our wrong assumption that (√3-√5)² is rational.
∴ (√3-√5)² is irrational.
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