Let `f(x) = x^2, g(x) = cos x and h(x) = f(g(x)).` Area bounded by `y = h(x)` and x-axis between `x=x_1 and x=x_2,` where `x_1 and x_2` are roots of the equation `18x^2–9pix + pi^2= 0,` is equal to

f(x)=x^(2),g(x)=cos x and h(x)=f(g(x))f(x)=x^(2),g(x)=cos x and h(x)=f(g(x)) Area bound by y=h(x) and x -and x_(2) are x=x_(1) and x=x_(2), where x_(1) and x_(2) are roots of the equation 18x^(29)pi x+pi^(2)=0, is equal to

Let f(x)=sinx,g(x)=x^2 and h(x) = log x. If F(x)=(h(f(g(x)))) , then F'(x) is:

Let f(x)={x-1,-1<=x<0 and x^(2),0<=x<=1,g(x)=sin x and h(x)=f(|g(x)|)+[f(g(x)) Then

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 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 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