The normal to the curve `x=a(1+cos theta), y=a sin theta " at " 'theta ' ` always passes through the fixed point

Find the normal to the curve x=a(1+cos theta),y=a sin theta at theta. Prove that it always passes through a fixed point and find that fixed point.

Show that the normal to the curve x=3cos theta-cos^(3)theta,y=3sin theta-sin^(3)theta at theta=(pi)/(4) passes through the origin.

Find the equation of the normal to the curve x=a cos theta and y=b sin theta at theta

The equation of normal to the curve x= a cos^(3) theta, y=a sin^(3) theta" at "theta=(pi)/(4) is

Find the equation of normal to the curve x=cos theta, y = sin theta" at point "theta = pi/4*

The normal to the curve x=a(cos theta + theta sin theta), y=a(sin theta - theta cos theta) at any theta is such that

The equation of normal at any point o to the curve x=a cos theta+a sin theta,y=a sin theta-a cos theta is always at a distance of