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Based on this slide:

Q1> why N! different orderings => at least N! leaves?

Q2> why #leaves >= N!?

The reason why 2^h >= #leaves is that 2^h represents the number of leaves in a complete binary tree and #leave is most time come from an incomplete binary tree.

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up vote 2 down vote accepted

There are N! different orderings. The algorithm has to determine exactly, which ordering is present and therefore its decision tree has to have at least N! leaves. Otherwise, it would not be able to distinguish all possible orderings.

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