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

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

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

Find the center of the circle x=-1+2cos theta,y=3+2sin theta

Find the center of the circle x=-1+2cos theta,y=3+2sin theta

Show that the point (x, y) , where x=5 cos theta, y=-3+5 sin theta , lies on a circle for all values of theta

x=a cos^(3)theta,y=a sin^(3)theta

Show that the equation of the normal at any point 'theta' on the curvex = 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.

The centre and radius of a circle given by equation x =2 +3 cos theta, y =3-3 sin theta are

Find the centre and radius of the circle whose parametric equation is x= -1+2 cos theta , y= 3+2 sin theta .