If at any point on the curve `y=f(x)`, the length of the subnormal is constant, then the curve will be a

At any point on the curve y=f(x), the length of the sub normal is constant, then the curve is

Show that at any point (x,y) on the curve y=b^((x)/(a)) , the length of the subtangent is a constant and the length of the subnormal is (y^(2))/(a) .

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

If at any point (x_1, y_1) on the curve y=f(x) the lengths of the subtangent and subnormal are equal, then the length of the tangent drawn to that curve at that point is

For the curve y=ax^(n) the length of the subnormal at any point is a constant. The value of n must be

For the curve xy^(m)=a^(m+1) the length of the subnormal at any point is a constant. Then the value of m must be

For the equation of the curve whose subnormal is constant then,