26. The points of contact of the tangents drawn from the origin to the curve y=sinx, lie on the curve

The points of contact of the tangents drawn from the point (4, 6) to the parabola y^(2) = 8x

Tangents are drawn from the origin to the curve y=cos X . Their points of contact lie on

The equation of the tangents at the origin to the curve y^2=x^2(1+x) are

The number of tangents with positive slope that can be drawn from the origin to the curve y = sinx is

The slope of the tangent (other than the x - axis) drawn from the origin to the curve y=(x-1)^(6) is

Find the point of intersection of the tangents drawn to the curve x^2y=1-y at the points where it is intersected by the curve x y=1-ydot

Statement I Tangent drawn at the point (0, 1) to the curve y=x^(3)-3x+1 meets the curve thrice at one point only. statement II Tangent drawn at the point (1, -1) to the curve y=x^(3)-3x+1 meets the curve at one point only.

Tangents are drawn from origin to the curve y = sin+cos x ·Then their points of contact lie on the curve

The number of tangents that can be drawn from (2, 0) to the curve y=x^(6) is/are

Tangents are drawn from the origin to the curve y = sin x . Prove that their points of contact lie on the curve x^(2) y^(2) = (x^(2) - y^(2))