`f(x)=(cosx)/([(2x)/(pi)]+(1)/(2))`, where x in not an integral multiple of `pi` and [.] denotes the greatest integer function, is

f(x)=(cosx)/([(2x)/pi]+1/2), where x is not an integral multiple of pi and [dot] denotes the greatest integer function, is an odd function an even function neither odd nor even none of these

f(x)=(cosx)/([(2x)/pi]+1/2), where x is not an integral multiple of pi and [dot] denotes the greatest integer function, is an odd function an even function neither odd nor even none of these

f(x)= cosx/([2x/pi]+1/2) where x is not an integral multiple of pi and [ . ] denotes the greatest integer function, is (a)an odd function (b)an even function (c)neither odd nor even (d)none of these

If [.] denotes the greatest integer function, then f(x)=[x]+[x+(1)/(2)]

Draw the graph of [y] = sin x, x in [0,2pi] where [*] denotes the greatest integer function

The range of the function f(x) =[sinx+cosx] (where [x] denotes the greatest integer function) is f(x) in :

f(x) = 1 + [cosx]x in 0 leq x leq pi/2 (where [.] denotes greatest integer function) then

Draw the graph of [y] = cos x, x in [0, 2pi], where [*] denotes the greatest integer function.

The function f(x)=[x]^(2)+[-x^(2)] , where [.] denotes the greatest integer function, is

f(x)=sin^-1[log_2(x^2/2)] where [ . ] denotes the greatest integer function.