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.

Let y=f(x)be curve passing through (1,sqrt3) such that tangent at any point P on the curve lying in the first quadrant has positive slope and the tangent and the normal at the point P cut the x-axis at A and B respectively so that the mid-point of AB is origin. Find the differential equation of the curve and hence determine f(x).

The equation of a curve is given as y=x^(2)+2-3x . The curve intersects the x-axis at

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

At what points on the curve x^(2)+y^(2)-2x-4y+1=0 , the tangents are parallel to the Y-axis ?

Consider a curve y=f(x) in xy-plane. The curve passes through (0,0) and has the property that a segment of tangent drawn at any point P(x,f(x)) and the line y = 3 gets bisected by the line x + y = 1 then the equation of curve, is

A curve y=f(x) passes through the origin. Through any point (x , y) on the curve, lines are drawn parallel to the co-ordinate axes. If the curve divides the area formed by these lines and co-ordinates axes in the ratio m : n , find the curve.

Find the equation of the tangent and normal to the curve y^(2)(a+x)=x^(2)(3a-x) at x = a.

The curve y= a sqrt(x) + bx is passing through (1,2) the area of the region bounded by the curve line x=4 and X - axis is 8 Sq. units then

Let a curve y=f(x),f(x)ge0, AA x in R has property that for every point P on the curve length of subnormal is equal to abscissa of p. If f(1)=3 , then f(4) is equal to

Find the equation of a curve passing through the point (0, -2) given that at any point (x,y) on the curve, the product of the slope of its tangent and y coordinate of the point is equal to the x coordinate of the point.