If one vertex of a square whose diagonals intersect at the origin is `(3 cos theta + i sin theta)`, then find the two adjacent vertcies.

Find (dy/dx) , if x=a cos theta, y=a sin theta

Prove that sin (3theta)/(1+2cos 2theta)=sin theta .

Evaluate |[cos theta, -sin theta], [sin theta, cos theta]|

Find the slope of the line joining the points (a cos theta , b sin theta) and (a cos phi, b sin phi)

If z= r (cos theta + i sin theta) , then the value of (z)/(bar(z)) + (bar(z))/(z) is

If p and q are the lenghts of the perpendiculars from the origin to the lines x cos theta - y sin theta = k cos 2theta and x sec theta + y cosec theta = k respectively prove that p^2 + 4q^2= k^2

Express each one of the following in the standard form a+ib (1)/(1-cos theta+2i sin theta)

Find dy/dx if x=2cos^3theta , y=2sin^3theta .

If tan ^(-1)(3/4)=theta , find the value of sin theta

Find real theta such that (3+2 i sin theta)/(1-2 i sin theta) is purely real: