# Permutation of NBA playoffs

I have a the link below to show the Bracket I was given(the teams are different, that should not make a difference) There is 16 teams on the Sheet i was given, with what it looks like if the brackets are correct, 13 games. I need to find 2 answers

1). How many possible wasy are there for how the entire NBA playoffs could play out?

2). How many possible ways are there for how the entire NBA plays could play out WITH the ATLANTA HAWKS winning?

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I'm pretty sure the (practical) answer to the second question is ZERO. – Quinn Culver Oct 15 '12 at 0:52

There should be $15$ matches, not $13.$ Hint: Each match has $2$ possible results. If the Hawks win, how many of the matches are determined. How many are left?
@John: It’s not permutations at all: it’s something much simpler. You have a sequence of $15$ ‘choices’, and each ‘choice’ can be made in $2$ ways; how many different ways are there to make the sequence of ‘choices’? For your other question, if the Hawks are champions, they must win every one of their matches. How many matches is that? How many other matches are there that can go either way? – Brian M. Scott Oct 14 '12 at 23:44
@John: Not $15\cdot2=30$. You need the multiplication rule, sometimes called the Chinese menu rule: you multiply the numbers of choices to get the total number of ways that a sequence of choices can be made. In this case that gives you $2^{15}$ different ways for the tournament to play out. The Hawks must beat four opponents, not three. – Brian M. Scott Oct 14 '12 at 23:54