Flip 100 coins. What is a probability that you never get two heads in a row?
Let H(n) be the number of ways of flipping n coins in a row, never getting two heads in a row and ending with a head. Let T(n) be the number of ways of flipping n coins in a row, never getting two heads in a row and ending with a tail.
To start with:
H(1) = 1 T(1) = 1 H(2) = 1 (it can only by TH) T(2) = 2 (can be HT or TT)
Let's establish some recurrences. First of all:
T(n+1) = T(n) + H(n)
since we can add a tail to any sequence ending with a head or a tail.
H(n+1) = T(n)
since we can only add a head to a sequence ending with a tail. Hence:
H(n+1) = T(n) = T(n-1) + H(n-1) = H(n) + H(n-1)
Together with H(1) = H(2) = 1, this establishes that H(n) is the nth Fibonacci number, so:
| H(100) | = | F(100) / 2100 |
| = | 316912650057057350374175801344 / 2100 |