Let `{x} and [x]` denote the fractional and integral part of x, respectively. So `4{x}=x+[x].`

Let {x} and [x] denote the fractional and integral parts of a real number x respectively. Solve 4{x}=x+[x] .

Let{x} and [x] denote the fractional and integral parts of a real number x respectively.Solve 4{x}=x+[x]

Let {x} and [x] denote the fractional and integral part of a real number x respectively. The value (s) of x satisfying 4{x} = x + [x] is/are

Let {x} and [x] denote the fractional and integral part of a real number x respectively. The value (s) of x satisfying 4{x} = x + [x] is/are

Let {x} and [x] denotes the fractional and integral part of a real number (x) , respectively. Solve |2x-1|=3[x]+2{x} .

Let f(x)=e^({e^(|x|sgnx)})a n dg(x)=e^([e^(|x|sgnx)]),x in R , where { } and [ ] denote the fractional and integral part functions, respectively. Also, h(x)=log(f(x))+log(g(x)) . Then for real x , h(x) is

Let f(x)=e^({e^(|x|sgnx)})a n dg(x)=e^([e^(|x|sgnx)]),x in R , where { } and [ ] denote the fractional and integral part functions, respectively. Also, h(x)=ln(f(x))+ln(g(x)) . Then for real x , h(x) is

Let f(x)=e^({e^(|x|sgnx)})a n dg(x)=e^([e^(|x|sgnx)]),x in R , where { } and [ ] denote the fractional and integral part functions, respectively. Also, h(x)=log(f(x))+log(g(x)) . Then for real x , h(x) is

Let {x} and [x] denotes the fraction fractional and integral part of a real number (x) , respectively. Solve |2x-1|=3[x]+2[x] .

Let {x} and [x] denotes the fraction fractional and integral part of a real number (x) , respectively. Solve |2x-1|=3[x]+2{x} .