I have many parabolas that are intersecting each other. I am generating a list *S* from the upper segments of these parabolas. Since the corresponding two edges of a parabola intersect each other at most at 2 points, the list *S* can contain at most *2n – 1* items.

I want to prove this by induction. What I can think of is this:

Assume I have *f(x) ≤ 2n – 1*.

Base case is *n = 1, f(1) ≤ 2 · 1 – 1*, so *f(1) <= 1*.

Then assume *n = k* holds, so *f(k) ≤ 2k – 1*.

We can show that for *n = k+1* holds *f(k+1) ≤ 2(k+1) – 1*.

Am I supposed to continue like that, e.g. for *n = k+2*, *n = k+3*, …? If I continue like this, then does it mean I proved it by induction?