Let `R=(2+sqrt(3))^(2n)` and `f=R-[R]` where `[ ]` denotes the greatest integer function, then `R(1-f)` is equal to

Let R=(2+sqrt3)^(2n) and f=R-[R] where [ ] denotes the greatest integer function , then R(1-f)=

Let R=(5sqrt(5)+11)^(2n+1) and f=R-[R], where [ ] denotes the greater integer function, then Rf is equal to :

If R = (sqrt(2) + 1)^(2n+1) and f = R - [R] , where [ ] denote the greatest integer function, then [R] equal

Let R=(5sqrt(5)+11)^(2n+1) and f=R-[R] where [1 denotes the greatest integer function,prove that Rf=4^(n+1)

Let R = (sqrt2+1)^(2n+1),ninN and f= R- [R], where [] denote the greatest integer function, Rf is equal to

Let R =(5 sqrt5+11)^(2n+1) and and f=R-[R], where [ ] denotes the greatest integer function, prove that Rf=4^(2n+1) .

If R = (sqrt(2) + 1)^(2n+1) and f = R - [R] , where [ ] denote the greatest integer function, then [R] equal (a) f+1/f (b) f-1/f (c) 1/f-f (d) None of these

Let R=(5 sqrt 5+11)^(2n+1) and f=R-[R] where [] is the greatest integer function. Prove that Rf= 4^(2n+1)

Let R=(5sqrt(5)+11)^(2n+1)a n df=R-[R]w h e r e[] denotes the greatest integer function, prove that Rf=4^(2n+1)