Question

Prove that there is no rational number whose square is 3.
​

Answer 1

proof: Let us assume to the contrary that √3 is a rational number. where p and q are co-primes and q≠ 0. It means that 3 divides p2 and also 3 divides p because each factor should appear two times for the square to exist. ... This demonstrates that √3 is an irrational number.

Answer 2

( Picture Above)

if helpful please mark me as the brainliest!!

!!!!!!!!!!!!!!! I will thank ur answers