Step 1 :

Rolles Theorem :

Let $\"\"$ be a function that satisfies the following three hypotheses.

1. $\"\"$ is continuous on $\"\"$ .

2. $\"\"$ is differentiable on $\"\"$ .

3. $\"\"$ .

Then there is a number $\"\"$ in $\"\"$ such that $\"\"$ .

Step 2 :

The function is $\"\"$ and the interval is $\"\"$ .

A function $\"\"$ is continuous when, for every value $\"\"$ in its domain, $\"\"$ is defined, and $\"\"$ .

Consider the number $\"\"$ as $\"\"$ .

$\"\"$ .

$\"\"$

Since the function $\"\"$ is undefined at $\"\"$ , it is discontinuous on the interval $\"\"$ .

Step 3 :

$\"\"$

$\"\"$ .

Since the function $\"\"$ is discontinuous on the interval $\"\"$ , it does not satisfies the Rolles Theorem.