# What is the minimum number of a valid B+tree?

I'm trying to appeal on a question I had on my exam the other day, about a B+tree.

The question was:

Consider a B+tree with l as factor (assuming l is positive and even), h>=0 as height (the root is considerto be 0) and n>=1 as the number of records.

There were 5 answers. 3 of them I eliminated immediately, and had to choose between these two:

1. `h>1 ==> n >= 0.5*l*(l+1)`. The second direction is not guaranteed: it depends on the arrival order of the keys.
2. None of the above.

I chose (2) and the lecturer says its option (1). I have the following example that I think contradicts it:

``````                      7
/              \
3                9
/     \           /   \
1 2      3 4 5     7 8    9 10
``````

With `l=4`, and `h=2`:

• Does this b+tree represent a valid B+tree?
• Is my lecturer actually wrong?

I would really appreciate some help here. Is this example a good one to base my appeal on?

In general, what is the minimum number of records `n` in a B+tree with height `h` and factor `l`?

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Welcome to Stack Overflow. Please read the About page soon. Using lower-case ell as a symbol is icky; it is difficult to distinguish from upper-case I in sans serif fonts. 'The second direction' is unusual English; did you (or the lecturer) mean 'second condition'? Why would the B+ Tree shown not be a valid B+ Tree? (A possible answer is 'because the root node doesn't meet the normal requirements that there are between `l/2` and `l` nodes in it (when `n >= l/2`), but then why didn't you suggest that?) –  Jonathan Leffler Jul 10 '13 at 23:26
Thanks for the quick answer. As far as I know, the root node in my example does(!) meet the normal requirements. It has 2 childs (`l=4` so `l/2` is good) The B+ Tree shown is not part of the question, it is my way of trying to proove the lecturer's mistake. 'The second direction' means: 'Assumin A gives us B, but assuming B does'nt necessarily gives us A' Thanks in advance. –  goldengil Jul 11 '13 at 19:48

## 1 Answer

Well, apparently I was right... The tree I showed is legal and is contrasting the lecturer's answer.

By inserting the following keys in that order: `1, 2, 3, 4, 5, 6, 7, 8, 9, 10` and then taking `6` out of the tree will create a valid B+tree of `height > 1` and `n<10`.

This contradicts the `h>1 ==> n >= 0.5*l*(l+1)` rule in the answer...

After many tries and lots of bureaucracy the lecturer accepted my answer and I got the points :)

Thanks for the try @Jonathan Leffler...

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