I'm trying to prove the following:
If G is a Context Free Grammar in the Chomsky Normal Form, then for any string w belongs L(G) of length n ≥ 1, it requires exactly 2n1 steps to make any derivation of w.
How would I go about proving this?
I'm trying to prove the following:
How would I go about proving this? 


As a hint  since every production in Chomsky Normal Form either has the form
Then deriving a string would work in the following way:
Applying productions of the first form will increase the number of nonterminals from k to k + 1, since you replace one nonterminal (1) with two nonterminals (+2) for a net gain of +1 nonterminal. Since your start with one nonterminal, this means you need to do n  1 productions of the first form. You then need n more of the second form to convert the nonterminals to terminals, giving a total of n + (n  1) = 2n  1 productions. To show that you need exactly this many, I would suggest doing a proof by contradiction and showing that you can't do it with any more or any fewer. As a hint, try counting the number of productions of each type that are made and showing that if it isn't 2n  1, either the string is too short, or you will still have nonterminals remaining. Hope this helps! 

