Let the number of binary trees with `N`

leaves be `T(N)`

.

We have `T(1) = T(2) = 1`

, as can be immediately seen, and for `N > 2`

we can split at the root, obtaining two subtrees with fewer leaves. Or, equivalently, we can assemble a binary tree with `N`

leaves from two non-empty binary trees with `k`

and `N-k`

leaves respectively. The condition that both subtrees are non-empty translates to `1 <= k <= N-1`

. So we have the recursion

```
N-1
T(N) = ∑ T(k) * T(N-k)
k=1
```

If the recursion is not yet known, it is not difficult to compute the first few values

```
1,1,2,5,14,42,132,429,1430,4862,16796
```

and google them. One finds that these are the Catalan numbers,

```
C(n) = (2*n)! / (n! * (n+1)!)
```

offset by one, so

```
T(N) = C(N-1)
```

which can be computed much faster than the recursion.

Clarify please how you do that? – ypercubeᵀᴹ Dec 31 '12 at 14:18"Let's represent the tree via list."