`f_(n,m)(x)=cos^(2n)(m!)pix,xepsilon[0,1]` be a sequence of real-valued function Then,

Let f(x)=sin x cos^(2)x,x in[0,pi] .Let m be the number of values of x at which f(x) is minimum and n be the number of values of x at which f(x) is maximum. Then the value of m+n will be

The function f(x)=lim_(nrarroo)cos^(2n)(pix)+[x] is (where, [.] denotes the greatest integer function and n in N )

f(x)=lim_(nrarroo)cos^(2n)(pix^(2))+[x] (where, [.] denotes the greatest integer function and n in N ) is

Given x in(-1,0)uu(0,1) and f(x)=sum_(n=0)^(oo)x^(n)(-1)^((n(n+1))/(2)) The function f(x) is equivalent to a rational function

If f(n)=int_(0)^(x)[cos t]dt, where x in(2n pi,2n pi+(pi)/(2));n in N and [*] denotes the greatest integer function.Then, the value of f((1)/(pi))| is ...