Step 1 :

\

Second partials test :

\

If f have continuous partial derivatives on an open region containing a point $\"\"$ for which

\

$\"\"$ and $\"\"$ .

\

To test for relative extrema of f , consider the quantity

\

$\"\"$

\

1. If $\"\"$ and $\"\"$ , then f has a relative minimum at $\"\"$ .

\

2. If $\"\"$ and $\"\"$ , then f has a relative maximum at $\"\"$ .

\

3. If $\"\"$ and $\"\"$ , then $\"\"$ is a saddle point.

\

\

4. The test is inconclusive if $\"\"$ .

\

Step 2 :

\

The function is $\"\"$ .

\

Apply partial derivative on each side with respect to x.

\

$\"\"$

\

Differentiate $\"\"$ partially with respect to x.

\

$\"\"$

\

Differentiate $\"\"$ partially with respect to y.

\

$\"\"$

\

\

Step 3 :

\

The function is $\"\"$ .

\

Apply partial derivative on each side with respect to y.

\

$\"\"$

\

Differentiate $\"\"$ partially with respect to y.

\

$\"\"$

\

Differentiate $\"\"$ partially with respect to x.

\

$\"\"$

\

\

Step 4 :

\

Find the critical points :

\

Equate $\"\"$ to zero.

\

$\"\"$

\

Equate $\"\"$ to zero.

\

$\"\"$

\

Substitute $\"\"$ in the above equation

\

$\"\"$

\

When $\"\"$ , $\"\"$ .

\

The critical point are $\"\"$ and $\"\"$ .

\

Find the quantity d :

\

$\"\"$

\

Since $\"\"$ , $\"\"$ is a saddle point.

\

Substitute the point $\"\"$ in $\"\"$ .

\

$\"\"$

\

The saddle point is $\"\"$ .

\

Solution :

\

The saddle point is $\"\"$ .