" Q."5" For the curve "y=xe^(x)" ,the point "

The curve y=xe^x has

The point for the curve, y=xe^(x) ,

The point for the curve, y=xe^(x) ,

The tangent to the curve y=x^(3) at the point P(t, t^(3)) cuts the curve again at point Q. Then, the coordinates of Q are

Tangent to the curve y=x^(2)+6 at the point P(1,7) touches the circle x^(2)+y^(2)+16x+12y+c=0 at a point Q. Show that Q=(-6,-7)

The tangent to the curve y=x-x^(3) at a point p meets the curve again at Q. Prove that one point of trisection of PQ lies on the Y-axis. Find the locus of the other points of trisection.

The tangent to the curve y=x-x^(3) at a point P meets the curve again at Q. Prove that one point of trisection of PQ lies on the Y-axis. Find the locus of the other points of trisection.

The ratio of the length of tangent to the length of normal to the curve y=3e^(5x) at the intersection point of curve and y -axis is

The ratio of the length of tangent to the length of normal to the curve y=3e^(5x) at the intersection point of curve and y-axis is