Prove That

Is a Irrational Number
Answers
Answered by
0
Answer:
Then √3 = p/q, where p, q are the integers i.e., p, q ∈ Z and co-primes, i.e., GCD (p,q) = 1. Here 3 is the prime number that divides p2, then 3 divides p and thus 3 is a factor of p. ... So, √3 is not a rational number. Therefore, the root of 3 is irrational.
Step-by-step explanation:
it's a request plz plz mark me as brainlist plz it's a request plz
Answered by
0
Answer:
Yes it is irrational number
hope it will help you a lot
Attachments:

Similar questions