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

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

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

Centre of the circel (x-3) ^(2) + (y-4) ^(2) =5 is

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

If x= e^(theta )(sin theta - cos theta ) , y= e^(theta ) ( sin theta + cos theta ) then (dy)/(dx) at theta =(pi)/(4) is

If cos theta + sin theta = sqrt2 cos theta " then" cos theta - sin theta is equal to