Let `(6sqrt(6)+14)^(2n+1)=R`, if R be the fractional part of R, then prove that `Rf=20^(2n+1)`

Let (6sqrt(6)+14)^(2n+1)=R, if R be the fractional part of R, then prove that Rf=20^(n+1)

Let (6sqrt(6)+14)^(2n+1)=R , if f be the fractional part of R, then prove that Rf=20^(2n+1)

Let R=(5sqrt(5)+11)^(31)=1+f, where I is an integer and f is the fractional part of R then Rf is equal to

Let R=(5 sqrt5+11)^(2n+1) , f=R-[R] . Then Rf=

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)

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)

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

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