1 .
As you all know, Nick has been dreaming to be like Spiderman. Spiderman can climb up the outside of a building;
if he is at a particular floor, then, in one step, Spiderman can move up several floors.
Since having finished marking assignment 2, Nick has been working hard to improve his Spiderman-skills:
In one step, Nick can move up either two floors or three floors. (Nick lost his ability to move up one floor in one step.)
Let $n \geq 2$ be an integer and consider a building with $n$ floors, numbered $1,2,\dots,n$. (The first floor has number 1;
this is not the ground floor.) Nick is standing in front of this building, at the ground level.
Let $N_n$ be the number of different ways in which Nick can climb to the $n$-th floor.
Which of the following is true for any $n \geq 5$?