The value of `int({[x]})dx` where {.} and [.] denotes the fractional part of x and greatest integer function equals

The solution set for [x]{x}=1, where {x} and [x] denote fractional part and greatest integer functions, is

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

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

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

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

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

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

If F(x)=(sinpi[x])/({x}) then F(x) is (where {.} denotes fractional part function and [.] denotes greatest integer function and sgn(x) is a signum function)

If F(x)=(sinpi[x])/({x}) then F(x) is (where {.} denotes fractional part function and [.] denotes greatest integer function and sgn(x) is a signum function)