If I, n are positive integers , `0 lt f lt 1` and if `(7 + 4sqrt3)^n = I +f`, then show that `(I+f) (1 - f) = 1`

If I, n are positive integers , 0 lt f lt 1 and if (7 + 4sqrt3)^n = I +f , then show that I is an odd integer

If R, n are positive integers, n is odd, 0lt F lt1" and if "(5sqrt(5)+11)^(n)=R+F, then prove that (R+F).F=4^(n)

If R, n are positive integers, n is odd, 0lt F lt1" and if "(5sqrt(5)+11)^(n)=R+F, then prove that R is an even integer and

If (3+sqrt8)^n - I+F where I_n are positive integer , 0 lt F lt 1 then I is

If n is a positive integer, then (1+i)^n+(1-i)^n=

If (4+sqrt15)^n=I+F when I, n are positive integers, 0 lt F lt 1 then (I+F)(1-F)=

Prove that : Suppose that n is a natural number and I, F are respectively the integral part and fractional part of (7+4sqrt(3))^(n) . Then show that (i) I is an odd integer (ii) (I+F)(I-F)=1

If f(x) = 1 + x + x^(2) + …… for |x| lt 1 then show that f^(-1)(x) = (x-1)/(x) .