A point P moves such that the sum of the slopes of the normals drawn from it to the hyperbola xy = 16 is equal to the sum of ordinates of feet of normals . The locus of P is a curve C.
the equation of the curve `C` is

A point P moves such that the sum of the slopes of the normals drawn from it to the hyperbola xy=4 is equal to the sum of the ordinates of feet of normals. The locus of P is a curve C. Q. The area of the equilateral triangle inscribed in the curve C having one vertex as the vertex of curve C is

The locus of points such that two of the three normals drawn from them to the parabola y^ 2 =4ax coincide is

Three normals are drawn from the point (14,7) to the curve y^2-16x-8y=0 . Find the coordinates of the feet of the normals.

If the sum of the slopes of the normal from a point P to the hyperbola x y=c^2 is equal to lambda(lambda in R^+) , then the locus of point P is (a) x^2=lambdac^2 (b) y^2=lambdac^2 (c) x y=lambdac^2 (d) none of these

Find the slope of normal to the curve if equation of the curve is y^2=4ax at (0 , 0)

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

Find the slope of the normal to the curve y = 1/x at the point (1/3,3)

If two tangents drawn from a point P to the parabola y2 = 4x are at right angles, then the locus of P is

Find the slope of the normal to curve xy = 6 at point (1,6)

Find the slope of normal to the curve if equation of the curve is y= x^2+x-2 at (1,2)