If the tangent at the point `(x_1, y_1)` on the curve `y=x^3 +3x^2 +5` passes through the origin, then `(x_1, y_1)` does NOT lie on the curve :

The tangent line at (-1,15) to the curve y=2x^(3)+13x^(2)+5x+9 passes through

The point on the curve 3y=6x-5x^(3) the normal at Which passes through the origin,is

The tangent at the point (2,-2) to the curve,x^(2)y^(2)-2x=4(1-y) does not pass through the point:

The slope of the tangent at a point P(x, y) on a curve is (- (y+3)/(x+2)) . If the curve passes through the origin, find the equation of the curve.

A point on the curve y=2x^(3)+13x+5x+9 the tangent at which,passes through the origin is

The slope of tangent at a point P(x, y) on a curve is - x/y . If the curve passes through the point (3, -4) , find the equation of the curve.

Find the coordinates of the points on the curve y=x^2+3x+4 , the tangents at which pass through the origin.

The tangent at (1,3) to the curve y=x^(2)+x+1 is also passing though point

Find the coordinates of the points on the curve y=x^(2)+3x+4, the tangents at which pass through the origin.

The tangent to the curve y=xe^(x^2) passing through the point (1,e) also passes through the point