If the area bounded by `f(x)=tan^(3)x+tanx` from x = 0 to `x=(pi)/(4)`is k square units, then the maximum value of `g(x)=k sin x` is `(AA x in [0, (pi)/(4)])`

The area bounded by y=||x|-1| with the x - axis from x =0 to x=1 is k square units, then 4k is equal to

Find the area bounded by y = sin x and axis of x in (0 , pi)

If the area bounded by the curves {(x, y)|x^(2)-y+1 ge 0} and {(x, y)|x+y-3 ge0} is k square units, then the value of 3k is equal to

If the area bounded by y=x, y=sinx and x=(pi)/(2) is ((pi^(2))/(k)-1) sq. units then the value of k is equal to

Area of the region bounded by y=|5 sin x| from x=0 to x=4pi and x-axis is

The area bounded by y = tan x, y = cot x, X-axis in 0 lt=x lt= pi/2 is

The minimum value of f(x)-sin^(4)x+cos^(4)x,0lexle(pi)/(2) is

Find the area bounded by y=1+2 sin^(2)x,"X-axis", X=0 and x=pi .

The area bounded by f(x)={{:(sin(2x),x ge 0),(cos(2x),xlt0):} with the x - axis, x=-(pi)/(4) and x=(pi)/(4) is k square units. Then, the value of 4k is equal to

The minimum value of the function f(x)=(tanx)/(3+2tanx), AA x in [0, (pi)/(2)) is