The area of the triangle formed by the normal to the curve `x=e^(siny)` at `(1,0)` with the coordinate axes is

Area of the triangle formed by the normal to the curve x = e^(sin y) at (1,0) with the coordinate axes is

The area of the triangle formed by the tangent to the curve y=(8)/(4+x^(2)) at x=2 and the co-ordinate axes is

The area of the triangle formed by the tangent to the curve y=(8)/(4+x^(2)) at x=2 and the co-ordinate axes is

The area of the triangle formed by the tangent to the curve y=8//(4+x^2) at x=2 and the co-ordinates axes is

If the area of the triangle formed by a tangent to the curve x^(n)y=a^(n+1) and the coordinate axes is constant, then n=

Show that the area of the triangle formed by the tangent at any point on the curve xy=c, (c ne 0), with the coordinate axes is constant.

The area of the triangle formed by the tangent to the curve xy=a^2 at point on the curve, with the coordinate axes is

The triangle formed by the normal to the curve f(x)=x^2-ax+2a at the point (2,4) and the coordinate axes lies in second quadrant, if its area is 2 sq units, then a can be

The triangle formed by the normal to the curve f(x)=x^2-ax+2a at the point (2,4) and the coordinate axes lies in second quadrant, if its area is 2 sq units, then a can be