If the tangentat P of the curve `y^2 = x^3` intersect the curve again at Q and the straigta line `OP, OQ` have inclinations `alpha and beta` where O is origin, then `tanalpha/tan beta` has the value equals to

If the tangentat P of the curve y^(2)=x^(3) intersect the curve again at Q and the straigta line OP,OQ have inclinations alpha and beta where O is origin,then (tan alpha)/(tan beta) has the value equals to

Tangent at P(2,8) on the curve y=x^(3) meets the curve again at Q. Find coordinates of Q.

Tangent at P(2,8) on the curve y=x^(3) meets the curve again at Q.Find coordinates of Q.

If the tangent at the point (p,q) to the curve x^(3)+y^(2)=k meets the curve again at the point (a,b), then

If the normals to the parabola y^(2)=4ax at P meets the curve again at Q and if PQ and the normal at Q make angle alpha and beta respectively,with the x-axis,then tan alpha(tan alpha+tan beta) has the value equal to 0 (b) -2( c) -(1)/(2)(d)-1

Tangent at point on the curve y^(2)=x^(3) meets the curve again at point Q. Find (m_(op))/(moq), where O is origin.

The tangents to x^(2)+y^(2)=a^(2) having inclinations alpha and beta intersect at P. If cot alpha+cot beta=0, then find the locus of P.