Your recurrence is a linear homogenous one. There is a standart method of solving them. For the general information you can follow this link: ...

You're on the right road. I'll denote \text{GCD}(a,b) by a\wedge b . So assuming F_{k+1}\wedge F_k=1 , you want to show that F_{k+2}\wedge F_{k+1}=1 . A common technique is to consider an ...

Induction proves . . . whatever it proves. For instance: We might use an induction argument to show that some f is a solution to a functional equation E. In the absence of any other arguments, ...

Since it's recursive, it makes sense for f(n) to be somehow related to f(n-1). Of course, you need to start somewhere, so you might as well define f(1). Note that the original function satisfies ...

The horrible truth is that there is no single "Ackermann's function". There's a (for lack of a better word) family of possible Ackermann's-functions. They all share the central recursion equation ...

Hint: In \mathbb{R}^3 the equation y=x does not represents a line but represents the plane that contain the z axis and the line in the xy-plane that bisects the angle between the x and the y ...