Consider a plygon of sides 'n' which sat...

Consider a plygon of sides `'n'` which satisflies the equation `3. .^(n)p_(4) = .^(n-1)p_(5)`
Number of quadrilaterals that can be made using the vertices of the polygon of sides `'n'` if exactly two adjacent side of the quadrilateral are common to the sides of polygon is

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Consider a plygon of sides `'n'` which satisflies the equation `3. .^(n)p_(4) = .^(n-1)p_(5)` Number of quadrilaterals that can be made using the vertices of the polygon of sides `'n'` if exactly two adjacent side of the quadrilateral are common to the sides of polygon is

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Consider a plygon of sides `'n'` which satisflies the equation `3. .^(n)p_(4) = .^(n-1)p_(5)`
Number of quadrilaterals that can be made using the vertices of the polygon of sides `'n'` if exactly two adjacent side of the quadrilateral are common to the sides of polygon is