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प्रश्न
Prove that `sqrt(p) + sqrt(q)` is irrational, where p, q are primes.
उत्तर
Let us suppose that `sqrtp + sqrtq` is rational.
Again, let `sqrtp + sqrtq` = a, where a is rational.
Therefore, `sqrtq = a - sqrtp`
On squaring both sides, we get
q = `a^2 + p - 2asqrtp` .....[∵ (a – b)2 = a2 + b2 – 2ab]
Therefore, `sqrtp = (a^2 + p - q)/(2a)`, which is a contradiction as the right-hand side is rational number while `sqrtp` is irrational, since p is a prime number.
Hence, `sqrtp + sqrtq` is irrational.
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