Step 1:

The equation is $\"\"$ .

(i)

Test for Symmetry about the $\"\"$ -axis:

Replace $\"\"$ with $\"\"$ and simplify the equation.

If the resulting equation is equal to the original equation then it is symmetry about $\"\"$ -axis.

$\"\"$

The equation is symmetric with respect to $\"\"$ -axis.

Step 2:

(ii)

Test for Symmetry about the $\"\"$ -axis:

Replace $\"\"$ with $\"\"$ and simplify the equation.

If the resulting equation is equal to the original equation then it is symmetry about $\"\"$ -axis.

$\"\"$

The equation is symmetric with respect to $\"\"$ -axis.

Step 3:

(iii)

Test for Symmetry about the origin:

Replace $\"\"$ with $\"\"$ , $\"\"$ with $\"\"$ as and simplify the equation.

If the resulting equation is equal to the original equation then it is symmetry about origin.

$\"\"$

The equation is symmetric with respect to origin.

Solution:

The equation is $\"\"$ is symmetric with respect to $\"\"$ -axis, $\"\"$ -axis and origin.