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

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

If tangents are drawn from the origin to the curve y= sin x , then their points of contact lie on-

3.(1) x + y = 0(2) x - y = 0If tangents are drawn from the origin to the curve y = sin x, then their points of contact lie on the curve(3) x2 - y2 = x2y2 (4) x2 + y2 = x2y2(2) x + y = xy(1) X- y = xy

Tangents are drawn from the origin to curve y=sin x. Prove that points of contact lie on y^(2)=(x^(2))/(1+x^(2))

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

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

Tangents are drawn from the origin to curve y=sinxdot Prove that points of contact lie on y^2=(x^2)/(1+x^2)

Tangents are drawn from the origin to curve y=sinxdot Prove that points of contact lie on y^2=(x^2)/(1+x^2)