The value of `int_(1)^(4){x}^([x]) dx` (where , [.] and {.} denotes the greatest integer and fractional part of x) is equal to

The value of int_(0)^(|x|){x} dx (where [*] and {*} denotes greatest integer and fraction part function respectively) is

The value of int_(0)^(2)[x^(2)-x+1] dx (where , [.] denotes the greatest integer function ) is equal to

Find the value of int_(-1)^(1)[x^(2)+{x}]dx, where [.] and {.} denote the greatest function and fractional parts of x respectively.

the value of int_(0)^([x]) dx (where , [.] denotes the greatest integer function)

If int_(0)^(x)[x]dx=int_(0)^(|x|)x dx, (where [.] and {.} denotes the greatest integer and fractional part respectively), then

The value of int_(1)^(10pi)([sec^(-1)x]) dx (where ,[.] denotes the greatest integer function ) is equal to

The value of x satisfying int_(0)^(2[x+14]){(x)/(2)} dx=int_(0)^({x})[x+14] dx is equal to (where, [.] and {.} denotes the greates integer and fractional part of x)

The value of int_(-1)^(3){|x-2|+[x]} dx , where [.] denotes the greatest integer function, is equal to

The value of int_(0)^(2)[x+[x+[x]]] dx (where, [.] denotes the greatest integer function )is equal to

The value of int_(-1)^(10)sgn(x-[x])dx is equal to (where,[:] denotes the greatest integer function