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

The tangent at any point of a circle is perpendicular to the radius through the point of contact.

A curve y=f(x) has the property that the perpendicular distance of the origin from the normal at any point P of the curve is equal to the distance of the point P from the x-axis. Then the differential equation of the curve

Prove that perpendicular at the point of contact to the tangent to circle passes through the centre.

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 f(x,y) be a curve in the x-y plane having the property that distance from the origin of any tangent to the curve is equal to distance of point of contact from the y-axis. It f(1,2)=0, then all such possible curves are

Find the slope of the tangent to curve y=x^(3)-x+1 at the point whose x- coordinate is 2.

Consider f(x)=int_1^x(t+1/t)dt and g(x)=f'(x) If P is a point on the curve y=g(x) such that the tangent to this curve at P is parallel to the chord joining the point (1/2,g(1/2)) and (3,g(3)) of the curve then the coordinates of the point P

Find the equation of the normal to the curve x^(2)=4y which passes through the point (1, 2).