Show that the normal at any point `theta` to the curve `x = a cos theta + a theta sin theta, y = a sin theta - a theta cos theta` is at a constant distance from the origin.

Find dy/dx when x = a (cos theta + theta sin theta) , y = a (sin theta - theta cos theta).

Eliminate theta between the equation : x =a cos theta + b sin theta, y =a sin theta- b cos theta .

Show that the equations of the normal at any point theta on the curve x = 3 cos theta - cos^3 theta, y = 3 sin theta - sin ^3 theta is 4(y cos^3 theta - x sin^3 theta) = 3 sin 4 theta

If x = a (cos theta + theta sin theta) and y = a (sin theta - theta cos theta) , find (d^2y)/(dx^2) at t = pi/4 .

Prove that : sin 2 theta= 2sin theta cos theta .

(cosec theta -sin theta ) (sec theta - cos theta ) (tan theta + cot theta ) = 1.

Find the slope of the normal to the curve x = a cos^3 theta, y = a sin^3 theta at theta = pi/4