Hint: Can you say if this function is monotone increasing or decreasing? For example, suppose f is monotone increasing. Then since f(4)=3 and f(5)=5, we know that 4 is not in the image of f! ...

F_{k} = \frac{\phi^k + \psi^k}{\sqrt{5}} F_{k-1} + F_{k-2} = \frac{\phi^{k-1} + \psi^{k-1}}{\sqrt{5}} + \frac{\phi^{k-2} + \psi ^{k-2}}{\sqrt{5}} = \frac{1}{\sqrt{5}} \left(\phi^{k-2} + \psi ^{k-2} + \phi^{k-1} + \psi^{k-1}\right) ...

let a=\dfrac{1+\sqrt{5}}{2}\Longrightarrow \dfrac{\sqrt{5}-1}{2}=a^{-1} so I=\sum_{n=0}^{\infty}\dfrac{\sqrt{5}}{a^{2^n}-a^{-2^n}} so let a^{2^n}=x then \dfrac{1}{a^{2^n}-a^{-2^n}}=\dfrac{x}{x^2-1}=\dfrac{1}{x-1}-\dfrac{1}{x^2-1}=\dfrac{1}{a^{2^n}-1}-\dfrac{1}{a^{2^{n+1}}-1} ...

The problem that you’ve been given uses a less-standard indexing of the Fibonacci numbers. The usual definition has initial values F_0=0 and F_1=1; your F_n is the usual F_{n+1}, and the usual ...

Your number is \sqrt{\frac{10^{1998}-1}9}=\frac{10^{999}}3\sqrt{1-10^{-1998}}. By the Taylor expansion (or the generalized binomial theorem), this evaluates to \frac{10^{999}}3\left(1-\frac1210^{-1998}-\frac1810^{-3996}+\cdots\right)=\frac{10^{999}}3-\frac1610^{-999}-\frac1{24}10^{-2997}+\cdots ...

Substitute and eliminate. You already know how to solve a recurrence on one function; eliminate functions from the system until you get to only one, by substituting one function for another. For ...