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I am having trouble understanding the tree height portion. The height cannot be greater than lg N, where N is the number of items.

lg 10 = 1

Therefore, a set of 10 items cannot have a height greater than 1. But I am able quick union values 0-9 (the ten items) and have heights up to 3.

Can someone clarify?

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I guess log is to the base 2 –  user1990169 Nov 10 '13 at 16:54
Splendid! Everything makes more sense now. Thanks! –  Marco Lau Nov 10 '13 at 16:57

1 Answer 1

up vote 2 down vote accepted

Logarithm, as a function has two parameters, the first being the base and the second the number. So:

logarithm(base, number) = power

means that if you take the base as base and raise it to the power of power, then your result will be the number. logarithm answers you the question:

which power should I raise the base to to get the number as a result.

If all your nodes have n children, then your branches have an exponentiality of the base n, so k nodes would need a height of no less than log(n, k). Or you can define the height in your own way as well.

If you have a binary tree, then n = 2.

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I do believe a quick-union tree is log base 2, but it's not a binary tree. A node can, in fact, have any number of children. –  Dukeling Nov 10 '13 at 17:29
I am sorry, I believe I have missed the part where you have defined the concept of quick-union tree or pointed us to the right direction. –  Lajos Arpad Nov 10 '13 at 19:15
en.wikipedia.org/wiki/Disjoint-set_data_structure. Well, I don't believe it's actually called a "quick-union tree", but that's what OP called it. –  Dukeling Nov 10 '13 at 20:21
Yes, you are right, I have edited my answer. –  Lajos Arpad Nov 10 '13 at 22:12

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