Let us assume that √2+√3 is a rational number
Then. there exist coprime integers p, q,q≠0 such that
√2+√3=pq
=>pq−√3=√2
Squaring on both sides, we get
=>(pq−√3)2=(√2)2
=>p2q2−2pq√3+(√3)2=2
=>p2q2−2pq√3+3=2
=>p2q2+1=2pq√3
=>p2+q2q2×q2p=√3
=>p2+q22pq=√3
Since, p,q are integers, p2+q22pq is a rational number.
=>√3 is a rational number.
This contradicts the fact that √3 is irrational.
Thus, our assumption is incorrect.
Therefore, √2+√3 is a irrational.