Let `f(x)=min.[tanx, cotx, 1/sqrt(3)], x in [0, pi/2]`. If the area bounded by `y=f(x)` and x-axis is `ln(a/b)+pi/(6sqrt(3))`, where `a,b` are coprimes. Then `ab`=…..

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

Let f(x)=min{sin^(-1)x,cos^(-1) x, (pi)/6},x in [0,1] . If area bounded by y=f(x) and X-axis, between the lines x=0 and x=1 is (a)/(b(sqrt(3)+1)) . Then , (a-b) is "......." .

Let f(x)= minimum {e^(x),3//2,1+e^(-x)},0lexle1 . Find the area bounded by y=f(x) , X-axis and the line x=1.

Let f(x)=min (x+1,sqrt(1-x)) for all xlt=1. Then the area bounded by y=f(x) and the x-axis is (a) 7/3 sq units (b) 1/6 sq units (c) (11)/6 sq units (d) 7/6 sq units

Let f(x)="max"{sin x,cos x,1/2} , then determine the area of region bounded by the curves y=f(x) , X-axis, Y-axis and x=2pi .

If A is the area bounded by the curves y=sqrt(1-x^2) and y=x^3-x , then of pi/Adot

If A is the area bounded by the curves y=sqrt(1-x^2) and y=x^3-x , then of pi/Adot

If f(x) = max {sin x, cos x,1/2}, then the area of the region bounded by the curves y =f(x), x-axis, Y-axis and x=(5pi)/3 is

Let f(x)=min(x+1,sqrt(1-x))AA x le 1 . Then, the area (in sq. units( bounded by y=f(x), y=0 and x=0 from y=0 to x=1 is equal to

If f(x)= maximum (sinx,cosx,1/2) and the area bounded by y=f(x),x - axis, y - axis and x=2pi be lamda(pi)/12+sqrt(2)+sqrt(3) sq. units then the value of lamda is