Statement I- Area bounded by `y=x(x-1)` and `y=x(1-x) "is" 1/3`.
Statement II- Area bounded by `y=f(x)` and `y=g(x)` "is" `|int_(a)^(b)(f(x)-g(x))dx|` is true when `f(x)` and `g(x)` lies above X-axis.(Where a and b are intersection of `y=f(x) and y=g(x))`.

The area bounded by y=x+1 and y=cos x and the x - axis, is

Statement-1: The area bounded by the curves y=x^2 and y=2/(1+x^2) is 2pi-2/3 Statement-2: The area bounded by the curves y=f(x), y=g(x) and two ordinates x=a and x=b is int_a^b[f(x)-g(x)]dx , if f(x) gt g(x) . (A) Both 1 and 2 are true and 2 is the correct explanation of 1 (B) Both 1 and 2 are true and 2 is not correct explanation of 1 (C) 1 is true but 2 is false (D) 1 is false but 2 is true

Let f(x)= minimum (x+1,sqrt(1-x) for all x<=1 then the area bounded by y=f(x) and the x -axis,is

Statement 1: The area bounded by parabola y=x^(2)-4x+3 and y=0 is (4)/(3) sq.units. Statement 2: The area bounded by curve y=f(x)>=0 and y=0 between ordinates x=a and x=b (where b>a) is int_(a)^(b)f(x)dx

The area bounded by y=f(x), x-axis and the line y=1, where f(x)=1+(1)/(x)int_(1)^(x)f(t)dt is

Let f(x) = minimum (x+1, sqrt(1-x))" for all "x le 1. Then the area bounded by y=f(x) and the x-"axis" is

The area of the shaded region bounded by two curves y =f (x), and y =g (x) and X-axis is | int _(a) ^(b) f (x) dx + int _(a) ^(b) g (x) dx |.

If f(x)=x-1 and g(x)=|f|(x)|-2| , then the area bounded by y=g(x) and the curve x^2=4y+8=0 is equal to

If the area bounded by y=f(x), the x -axis, the y-axis and x=t(t>0) is t^(2), then find f(x) .