Prove that sqrtp+sqrtq is an irrational,...

Prove that `sqrtp+sqrtq` is an irrational, where p,q are primes.

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

Prove that sqrta+ sqrtb is irrational, where a, b are primes.

Prove that sqrtp-sqrtq is irrational when p,q are primes.

Prove that sqrt3-sqrt5 is an irrational number.

Prove that sqrt3 + sqrt5 is an irrational number.

Prove that sqrt2+sqrt11 is an irrational number.

Prove that sqrt2-3sqrt5 is a irrational number.

Prove that sqrt5+sqrt11 is irrational.

Prove that sqrt(2)+sqrt(3) is irrational .

Prove that sqrt2+sqrt2 is irrational .

Prove that sqrt2+sqrt3 is irrational.

Recommended Questions

Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
Prove that sqrt(p)+sqrt(q) is an irrational,where p and q are primes.
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
sqrtp (where p is a prime number) is
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|
Prove that sqrtp+sqrtq is an irrational, where p,q are primes.
Text Solution
|