is
irrational.
OR
Prove that 
is
irrational.
Answer:
Suppose, 
is a
rational number.
Let
where a
is rational number, (1)
Therefore, 
On squaring both sides, we get
(1)
which is a contradiction as the right hand side is a
rational number while
is
irrational. Hence, is
irrational. (1)
OR
Suppose,
is
rational.
Then, there exist cop rime positive integers p and q
such that (1)
(1)
is
irrational while 
is
rational, but irrational number can never be equal to a rational number. Thus, our
assumption is wrong. Hence, is
irrational. (1)
You need to login to perform this action.
You will be redirected in
3 sec
