A square of side ‘a’ lies above x axis and has one vertex at the origin. The side passing through the origini makes and angle ‘p’ ( 0 - y(cosp – sinp) – x(sinp - cosp) = p
- y(cosp + sinp) + x(sinp – cosp) =p
- y(cosp + sinp) + x(sinp + cosp) = p
- y(cosp + sinp) + x(cosp – sinp) = p
A square of side ‘a’ lies above x axis and has one vertex at the origin. The side passing through the origini makes and angle ‘p’ ( 0
- y(cosp – sinp) – x(sinp - cosp) = p
- y(cosp + sinp) + x(sinp – cosp) =p
- y(cosp + sinp) + x(sinp + cosp) = p
- y(cosp + sinp) + x(cosp – sinp) = p