A curve passes through `(2, 1)` and is such that the square of the ordinate is twice the rectangle contained by the abscissa and the intercept of the normal. Then the equation of curve is

The curve y=ax^2+bx +c passes through the point (1,2) and its tangent at origin is the line y=x . The area bounded by the curve, the ordinate of the curve at minima and the tangent line is

The area between the curve y=2x^4-x^2, the axis, and the ordinates of the two minima of the curve is

Find the slope of the normal to the curve y = x^3 at the point whose abscissa is 2.

Find the equation of a curve passing through the point (0, 2) given that the sum of the coordinates of any point on the curve exceeds the magnitude of the slope of the tangent to the curve at that point by 5.

Find the equation of a curve passing through the origin if the slope of the tangent to the curve at any point (x,y) is equal to the square of the difference of the abscissa and the ordinate of the point.

Find the equation of a curve passing through the point (0, 1). If the slope of the tangent to the curve at any point (x, y) is equal to the sum of the x coordinate (abscissa) and the product of the x coordinate and y coordinate (ordinate) of that point.

At any point (x, y) of a curve, the slope of the tangent is twice the slope of the line segment joining the point of contact to the point (– 4, –3). Find the equation of the curve given that it passes through (–2, 1).

Let a curve y=f(x) pass through (1,1), at any point p on the curve tangent and normal are drawn to intersect the X-axis at Q and R respectively. If QR = 2 , find the equation of all such possible curves.

Find the slope of normal to the curve if equation of the curve is y^2=4x at ( 4, 5)