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

Answer the following: Find the equation of tangent to the circle x=5costheta and y=5sintheta at the point theta=pi/3 on it.

Find the equation of the tangent to the hyperbola, x=3 sectheta, y=5 tantheta at theta =pi/3

Find dy/dx if, x= a cos^(3) theta , y= a sin^(3) theta at theta = pi / 3

If x = a cos^3 theta, y = b sin^3 theta , then

if x=a cos^(4) theta, y= a sin^(4) theta, "then" (dy)/(dx)"at" theta=(3pi)/(4) is

Find the equations of tangents and normals to the curve at the point on it: x = sin theta and y= cos 2theta at theta = (pi)/6

The equation of tangent to the curve x=a sec theta, y =a tan theta" at "theta=(pi)/(6) is: a) 2sqrt3x-y=-sqrt3a b) 2sqrt3x+y=a c) 2x-y=sqrt3a d) 2sqrt3x+y=sqrt3a

The centre of the circel x=-1 + 2 cos theta, y =3 + 2 sin theta, is

Eliminate theta,if x=a cos^3 theta y=b sin^3 theta