If the total area between the curves `f(x)=cos^-1(sinx)` and `g(x)=sin^-1(cosx)` on the interval `[-7pi,7pi]` is A, then find the value of 49A

If the area enclosed by the curves f(x)=cos^(-1)(cosx) and g(x)=sin^(-1)(cosx) in x in [(9pi)/4,(15pi)/4] is api^(2),//b (where a and b are coprime), then the value of (a-b) is

If the area enclosed by the curves f(x)=cos^(-1)(cosx) and g(x)=sin^(-1)(cosx)" in "x in [(9pi)/4, (15pi)/4] is api^(2)//b (where a and b are coprime), then the value of (a-b) is

The area enclosed by the curves y= sinx+cosx and y = | cosx-sin x | over the interval [0,pi/2]

Consider the functions f(x) = sin x and g(x) = cos x in the interval [0,2 pi] find the area enclosed by these curves in the given interval ?

Find the real roots of the equation cos^(4)x+sin^(7)x=1 in the interval [-pi,pi]

The area bounded by the curve y=|cos^-1(sinx)|+|pi/2-cos^-1(cosx)| and the x - axis , where pi/2lexlepi , is equal to

The maximum value of f(x)=(sin2x)/(sinx+cosx) in the interval (0, (pi)/(2)) is

The maximum value of f(x)=(sin2x)/(sinx+cosx) in the interval (0, (pi)/(2)) is

The area bounded by the curve y=|cos^(-1)(sinx)|-|sin^(-1)(cosx)| and axis from (3pi)/(2)lex le 2pi

The area bounded by the curve y=|cos^(-1)(sinx)|-|sin^(-1)(cosx)| and axis from (3pi)/(2)lex le 2pi