The difference between an exterior angle of `(n-1)` sided regular polygon and an exterior angle of `(n+2)` sided regular polygon is `6^(@)`. Find the value of n

If the difference between the exterior angle of an( n )sided regular polygon and an (n + 1) sided regular polygon is 12^@ find the value of n.

If the difference between an interior angle of a regular polygon of (n + 1) sides and an interior angle of a regular polygon of n sides is 4^(@) , find the value of n. Also, state the difference between their exterior angles.

If the difference between an exterior angle of a regular polygon of 'n' sides and an exterior angle of another regular polygon of '(n+1)' sides is equal to 5^(@) , find the value of 'n'.

The interior angle of a n sided regular polygon is 48^(@) more than the interior angle of a regular hexagon. Find n.

The exterior angle of a regular polygon is one-third of its interior angle. How many sides has the polygon?

If each interior angle of a regular polygon is 144^@ , find the number of sides in it.

The difference between the exterior angles of two regular polygons, having the sides equal to (n-1) and (n+1) is 9^@. Find the value of n.

The ratio between an exterior angle and an interior angle of a regular polygon is 2 : 3. Find the number of sides in the polygon.

The interior angle of a regular polygon is 156^0dot Find the number of sides of the polygon.

Prove that the interior angle of a regular pentagon is three times the exterior angle of a regular decagon.