If the subnormal at any point on the curve `y^(n) = ax` is a constant, then n=

The sub normals at any point of the curve y = x^(n) is constant. Then n=

The length of the subnormal at any point(x,y) on the curve y^(2) = 4ax is

If the length of the sub-tanget at any point to the curve xy^(n) = a is proportional to the abscissa, then 'n' is

Show that the normal at any point θ to the curve x = a costheta + a theta sin theta, y = a sintheta – atheta costheta is at a constant distance from the origin.

For the curve y^(n) -=a^(n-1)x if the subnormal at any point is a constant then n=

The length of the subnormal at 't' on the curve x = a (t + sin t), y = a(1-cos t) is

The locus of the midpoints of the line joining the focus and any point on the parabola y^(2)=4ax is a parabola with the equation of directrix as

If ST and SN are the lengths of the subtangent and the subnormal at the point theta =(pi)/(2) on the curve x = a (theta + sin theta), y = a (1 - cos theta), a ne1 then...

Subnormal to the curve xy = c^(2)/2 at (c/2,c) is