IF slope of tangent to curve `y=x^3` at a point is equal to ordinate of point , then point is

The slope of the tangent to the curve at any point is equal to y + 2x. Find the equation of the curve passing through the origin .

The x-intercept of the tangent to a curve is equal to the ordinate of the point of contact. The equation of the curve through the point (1,1) is

For the curve y=x e^x , the point

If the tangent to the curve y=2x^2-x+1 at a point P is parallel to y=3x+4, the co-ordinates of P are: a)(2,1) b)(1,2) c)(2,-1) d)(-1,2)

If the function f(x) = x^(3) – 6ax^(2) + 5x satisfies the conditions of Lagrange’s mean theorem for the interval [1, 2] and the tangent to the curve y = f(x) at x = 7//4 is parallel to the chord joining the points of intersection of the curve with the ordinates x = 1 and x = 2 . Then the value of a is

If the tangent to the circle x^2+y^2=r^2 at the point (a,b) meets the co-ordinate axes at the points A and B, and O is the origin, then the area of the triangle OAB is

Find the equation of the curve passing through the point (0,1) if the slope of the tangent of the curve at each of it's point is sum of the abscissa and the product of the abscissa and the ordinate of the point.

The slope of the tangent to the curves x=3t^2+1,y=t^3-1 at t=1 is