If `(6sqrt(6)+14 )^(2n+1)` = [N]+F and F=N -[N] , where [.] denotes greatest interger function then NF 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=(2+sqrt(3))^(2n) and f=R-[R] where [ denotes the greatest integer function,then R(1-f) is equal to

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

f(x)=1/sqrt([x]^(2)-[x]-6) , where [*] denotes the greatest integer function.

If p=(8+3sqrt(7))^n a n df=p-[p],w h e r e[dot] denotes the greatest integer function, then the value of p(1-f) is equal to a.1 b. 2 c. 2^n d. 2^(2n)

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 f :(4,6) uu (6,8) be a function defined by f(x) = x+[(x)/(2)] where [.] denotes the greatest integer function, then f^(-1)(x) is equal to

show that [(sqrt(3) +1)^(2n)] + 1 is divisible by 2^(n+1) AA n in N , where [.] denote the greatest integer function .