Find the equation of the normal to the curve given by `x=3cos theta-cos^3theta` and `y=3sin theta-sin^3theta` at `theta=(pi)/(4)`

Find the equation of the normal to the curve given by x = 3 cos theta - cos^3theta y = 3 sin theta - sin^3 theta

Find the equation of the normal to the curve given by x = cos^3theta , y = sin^3theta at theta=pi/4

If x=cos theta-cos 2theta and y=sin theta-sin2theta , then find (dy)/(dx) .

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

Find the equations of tangent and normal to curve x = 1 - cos theta and y = theta - sin theta "at" theta = (pi)/(4) .

Find the.equations of tangent and normal to the curves x = a sin^3theta and y = a cos^3theta at theta=pi/4

Show that the equation of normal at any point 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 .

Solve the following: cos 2theta - cos theta = sin theta - sin 2theta