Find all possible triplets (x,y,z) such that `(x+y)+(y+2z) cos 2 theta +(z-x) sin^(2) theta =0` , for all ` theta `.

Find (d^2y)/(dx^2) if x= cos theta, y = a sin theta)

Find dy/dx , if x = cos(theta) and y = sin(2theta)

Show that the points (x, y), where : x=5 cos theta, y=-3+5 sin theta lie on a circle for all values of theta .

If f(x)=|{:( sin^2 theta , cos^(2) theta , x),(cos^(2) theta , x , sin^(2) theta ),( x , sin^(2) theta , cos^2 theta ):}| theta in (0,pi//2), then roots of f(x)=0 are

Find dy/dx when x = cos theta + cos 2 theta, y = sin theta + sin 2 theta)

If x = 2 cos theta - cos 2 theta, y = 2 sin theta - sin 2 theta, find dy/dx at theta = pi/2

Prove that all lines represented by the equation (2 cos theta + 3 sin theta ) x + (3 cos theta - 5 sin theta ) y = 5 cos theta - 2 sin theta pass through a fixed point for all theta What are the coordinates of this fixed point ?

The number of all possible values of theta , where 0 lt theta lt pi , for which the system of equations (y+z) cos 3 theta = (xyz) sin 3 theta x sin 3 theta=(2 cos 3 theta)/y+(2 sin 3 theta)/z (xyz) sin 3 theta = (y+2z) cos 3 theta +y sin 3 theta has a solution (x_(0), y_(0), z_(0)) with y_(0)z_(0) ne 0 is _______.

Find (d^2y)/dx^2 , if x = a (theta - sin theta), y = a(1+cos theta)