## Idea:

The recursive function called from node `v`

should return 3 values:

`1. Maximum descending path which goes always left or always right in subtree rooted in v`

`2. Maximum length of path which goes always left starting from v`

`3. Maximum length of path which goes always right starting from v`

Let's call these values respectively `(V1, V2, V3)`

## Base case:

Clearly, for any leaf in the tree, all above values are equal 0.

## Recursive call:

Let's consider any internal node `v`

.

Let `(L1, L2, L3)`

be the values returned by a recursive call to left child of `v`

.

Let `(R1, R2, R3)`

be the values returned by a recursive call to right child of `v`

.

Then `v`

, in order to compute `(V1, V2, V3)`

only has to combine results returned from the left and the right child:

`V2`

is equal to `L2 + 1`

if the left child exists. Otherwise, it's 0.

`V3`

is equal to `R3 + 1`

if the right child exists. Otherwise, it's 0.

`V1`

is equal to `max(L1, R1, V2, V3)`