Let f(x)=max{tanx, cotx}. Then the number of roots of the equation `f(x)=1/(sqrt(3))` in `(0,2pi)` is

The number of roots fo the equation tan(x+(pi)/6)=2tann x for x in (0,3pi) is

The number of solutions of the equation x+2tanx=(pi)/2 in the interval [0,2pi] is

Consider the function f(x) satisfying the identity f(x) + f((x-1)/( x)) = 1+ x AA x in R - {0,1} , and g(x) =2f ( x)- x+1 The number of roots of the equation g(x)= 1 is

Let f(x)=x^(2)- x+1, x ge 1//2 , then the solution of the equation f^(-1)(x)=f(x) is

The number of distinct real roots of the equation tan ( 2 pi x)/( x^(2) + x + 1) = - sqrt(3) is

Let f:[0,4pi] to [0, pi] be defined by f(x)=cos^(-1)(cosx) . The number of points x in [0,4pi] satisfying the equation f(x)=(10-x)/10 is

Let f:[0,4pi]to[0,pi] be defined by f(x)=cos^(-1)(cosx) . The number of points x in [0,4pi] satisfying the equation f(x)=(10-x)/10 is

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

The minimum value of the function f(x)=3tanx+4cotx where x in(0,pi/2)