Question

1. Prove that √15 is irrational.​

Answer 1

Answer:

Explanation: This proof uses the unique prime factorisation theorem that every positive integer has a unique factorisation as a product of positive prime numbers. Suppose √15=pq for some p,q∈N . ... Now k<q<p contradicting our assertion that p,q is the smallest pair of values such that

Answer 2

Answer:

All root numbers are irrational !!!!! ✌️✌️✌️