For the curve `xy=c^(2)` the subnormal at any point varies as

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

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

The abscissa of the point on the curve xy = (c+x)^(2) , the normal at which cuts off numerically equal intercepts from the axes of coordinates is

If the slope of the normal to the curve x^(3)=8a^(2)y, a gt 0 at a point in the first quadrant is -(2)/(3) , then the point is :

If the normal at (ct,c/t) on the curve xy=c^2 meets the curve again in 't' , then :

The points on the curve 9y^(2) = x^(3) where the normal to the curve makes equal intercepts with the axes are

The area of the triangle formed by the co-ordinate axes and a tangent to the curve xy=a^(2) at the point (x_(1), y_(1)) on it is :

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