f(x) is a continuous and bijective funct...

`f(x)` is a continuous and bijective function on `Rdot` If `AAt in R ,` then the area bounded by `y=f(x),x=a-t ,x=a ,` and the x-axis is equal to the area bounded by `y=f(x),x=a+t ,x=a ,` and the x-axis. Then prove that `int_(-lambda)^lambdaf^(-1)(x)dx=2alambda(gi v e nt h a tf(a)=0)dot`

Similar Questions

Explore conceptually related problems

The area bounded by the curve a^(2)y=x^(2)(x+a) and the x-axis is

Find the area bounded by y=1/(x^2-2x+2) and x-axis.

The area bounded by the curve y=x(1-log_(e)x) and x-axis is

The area bounded by y = sin^(-1)x, y= cos^(-1)x and the x-axis, is given by

Find the area of the region bounded by 3x -2y+6=0,x= -3, x = 1 and x -axis.

Find the area of the region bounded by y_(2) = 9x, x = 2, x = 4 and the x-axis in the first quadrant.

Find the area of the region bounded by y^(2) = 9x, x = 2, x = 4 and the x-axis in the first quadrant.

Find the area bounded by x=1 and x=2 , x axis and the line 4x-3y =12 .