The equation of the tangent to the curve `x=2cos^(3) theta` and `y=3sin^(3) theta` at the point, `theta =pi//4` is

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

The equation of the normal to the curve x=a\ cos^3theta,\ \ y=a\ sin^3theta at the point theta=pi//4 is (a) x=0 (b) y=0 (c) x=y (d) x+y=a

The equation of tangent to the curve x= sin theta and y=cos 2 theta" at "theta=(pi)/(6) is

Find the slope of the tangent to the curve: x=acos^3theta, y = asin^3 theta at theta = pi/4

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

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

Show that the equation of the normal to the curve x=a cos ^(3) theta, y=a sin ^(3) theta at 'theta ' is x cos theta -y sin theta =a cos 2 theta .