" 14.Prowe that for any prime positive integer "p,sqrt(p)" is an irrational number "

Prove that for any prime positive integer p ,sqrt(p) is an irrational number.

Prove that for any prime positive integer p,quad sqrt(p) is an irrational number.

If p ,\ q are prime positive integers, prove that sqrt(p)+sqrt(q) is an irrational number.

If p,q are prime positive integers,prove that sqrt(p)+sqrt(q) is an irrational number.

Give negation of the followings: For each prime number p,sqrt(p) is irrational number.

If p prime number, then prove that sqrt(p) is irrational ?

Given that sqrt(p) is irrational for all primes p and also suppose that 3721 is a prime. Can you conclude that sqrt(3721) is an irrational number ? Is your conclusion correct ? Why or why not ?

The negation of ' sqrt5 is an integer or 5 is an irrational number' is

The negation of ' sqrt5 is an integer or 5 is an irrational number' is

If p and q are positive integers, then (p)/(q) is a ______ rational number and (p) (-q) is a ______ rational number.