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

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

Verified by Experts

The correct Answer is:

irrational

REAL NUMBERS
EDUCART PUBLICATION|Exercise LONG QUESTION TYPE QUESTIONS|5 Videos
REAL NUMBERS
EDUCART PUBLICATION|Exercise SHORT QUESTION (SA-I) TYPE QUESTIONS|12 Videos
QUADRATIC EQUATIONS
EDUCART PUBLICATION|Exercise LONG ANSWER Type Questions [4 marks]|19 Videos
SAMPLE PAPER - 6
EDUCART PUBLICATION|Exercise PART - B (SECTION - IV)|13 Videos

Similar Questions

Explore conceptually related problems

Prove that sqrt(p)+sqrt(q) is an irrational,where p and q are primes.

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

Prove that is irrational.

Use contradiction method to prove that: p: sqrt(3) is irrational is a true statement.

Test paper discussion -1,2,3 discussion || Prove OF √p + √q are irrational from where p,q are prime number

Assertion(A): sqrt(a) is an irrational number, when a is a prime number. Reason (R):Square root of any prime number is an irrational number.

Prove that q^^~p -=~ (q to p)

"If p then q" is same as (where p and q are statement)

Assertion : sqrt2 is an irrational number. Reason : If p be a prime, then sqrtp is an irrational number.