Find the value of k, so that the length of the subnormal at any point on the curve `xy^(k)=a^(k+1)` is a constant.

Find the value of k, so that the length of the subnormal at any point on the curve y=a^(1-k)x^(k) is a constant

Length of the subnormal at any point on y^n=a^(n-1)x is constant when n =

the length of the subnormal to the curve y^2=4ax at any point is

Find the lengths of subtangent and subnormal at a point on the curve y=bsin(x/a)

Show that the length of subnormal at any point on the curve xy=a^(2) varies as the cube of the ordinate of the point

Show that the square of the lengh of the subtangent at any point on the curve by^(2)=(x+a)^(3)( bne0) varies witht the length of the subnormal at that point