Let `f : R->R` be given by `f(x) = {|x-[x]|`, when [x] is odd and `|x-[x]-1|` , when [x] is even ,where [.] denotes the greatest integer function , then `int_-2^4 f(x) dx` is equal to

Let f(x)=(-1)^([x]) where [.] denotes the greatest integer function),then

If f(x) = [x] - [x/4], x in R where [x] denotes the greatest integer function, then

If f:Irarr I be defined by f(x)=[x+1] ,where [.] denotes the greatest integer function then f(x) is equal to

Let f : R to R is a function defined as f(x) where = {(|x-[x]| ,:[x] "is odd"),(|x - [x + 1]| ,:[x] "is even"):} [.] denotes the greatest integer function, then int_(-2)^(4) dx is equal to

Let f : R to R is a function defined as f(x) where = {(|x-[x]| ,:[x] "is odd"),(|x - [x + 1]| ,:[x] "is even"):} [.] denotes the greatest integer function, then int_(-2)^(4) dx is equal to

Let f(x) = 1 + |x|,x = -1, where [*] denotes the greatest integer function.Then f { f (- 2.3)} is equal to

Let f(x)=1+|x|,x =-1, where [* denotes the greatest integer function.Then f{f(-2.3)} is equal to

Let f:R rarr R defined as f(x){[|x-[x]|quad ;when [x] is odd ],[|x-[x]-1| ; when [x] is even ]] , Where [.] denotes the greatest integer function what will be the area bounded by the curve y=f(x), within [0,4]

f(x)={3[x]-5(|x|)/(x),x!=0 and 2,x=0 where [.] denotes the greatest integer function,then int_(-(3)/(2))^(2)f(x)dx equals