Evgeny's solution is quite nice, but here's a simpler solution that works for Trees and whose correctness is easy to see.

Let `L`

be the (original) leaves of the tree `T`

. Let `n`

be any node in the tree such that each of the subtrees obtained by removing `n`

have at most `|L|/2`

original leaves. Note that it is always possible to find such a node `n`

.

Let `T`

_{1}, `T`

_{2}, .. ,`T`

_{k} be the subtrees obtained by removing `n`

. Every original leaf (in `L`

) is present in one of the `T`

_{i}s. Construct maximum disjoint pairs from the original leaves, with the constraint that the two original leaves in any pair belong to distinct subtrees. (This is conceptually same as constructing a maximum matching in a complete k-partite graph whose parts are the original leaves present in the subtrees).

If `|L|`

is even, then every original leaf would be present in some pair and adding the edges corresponding to each of these pairs would make the resulting graph 2-connected. So we need to add `|L|/2`

edges in this case.

If `|L|`

is odd, one original leaf would be not be paired, so we can connect this leaf to some arbitrary original leaf that is present in a different subtree. In this case we need to add `(|L|+1)/2`

edges.