Prove that the curve represented by `x=3(cost+sint),y=4(cost-sint),t in R ,` is an ellipse.

The curve represented by x=2(cost+sint) and y = 5(cos t-sin t ) is

The curve represented by x=2(cost+sint) and y = 5(cos t-sin t ) is

The graph represented by x=sin^2t, y=2cost is

Prove that the curves x=4 (costheta+sintheta) and y=3 (costheta-sintheta) represents an ellipse.

The curve is given by x = cos 2t, y = sin t represents

Find the area enclosed by the curve x=3cos t ,y=2sint

The length of tangent to the curve x=a(cost+log tan.(t)/(2)),y=a(sint), is

The length of the normal at t on the curve x=a(t+sint), y=a(1-cos t), is

If x=10(t-sint) , y=12(1-cost) , find (dy)/(dx) .

A curve is represented paramtrically by the equations x=e^(t)cost and y=e^(t)sint where t is a parameter. Then The value of (d^(2)y)/(dx^(2)) at the point where t=0 is