Well, I am asked to do the next thing:

To define a binary tree which can contain 2 different types: ('a,'b) abtree and these are the requirements:

- Any inner vertex (not a leaf) must be of the type 'a or 'b and the leafs have no value.
For every path in the tree all 'a values must appear before the 'b value: examples of paths:

`'a->'a->'a-'b (legal) 'a->'b->'b (legal) 'a->'a->'a (legal) 'b->'b->'b (legal) 'a->'b->'a (ILLEGAL)`

and also I need to define another tree which is like the one described above but now I have got also 'c and in the second requirement it says that for every path I 'a values appear before the 'b values and all the 'b values appear before the 'c values.

First, I am not sure how to define binary trees to have more than 1 type in them. I mean the simplest binary tree is:

```
datatype 'a tree =
leaf
| br of 'a * 'a tree * 'a tree;
```

And also how I can define a tree to have these requirements.

Any help will be appreciated.

Thanks.

OK, thanks a lot. So you mean something like that:

```
datatype 'b bTree =
leaf
| bBranch of 'b * 'b bTree * 'b bTree
;
datatype ('a,'b) abTree =
leaf
| aBranch of 'a * ('a, 'b) abTree * ('a,'b) abTree
| bBranch of 'b * 'b bTree * 'b bTree
;
```

and that's what I did for the case it's a 3 type tree as I mentioned above:

```
datatype 'c cTree =
leaf
| cBranch of 'c * 'c cTree * 'c cTree
;
datatype ('b, 'c) bcTree =
leaf
| bBranch of 'b * ('b, 'c) bcTree * ('b,'c) bcTree
| cBranch of 'c * 'c cTree * 'c cTree
;
datatype ('a, 'b, 'c) abcTree =
leaf
| aBranch of 'a * ('a, 'b, 'c) abcTree * ('a, 'b, 'c) abcTree
| bBranch of 'b * ('b, 'c) bcTree * ('b, 'c) bcTree
| cBranch of 'c * 'c cTree * 'c cTree
;
```

Am I right?

Also, what does the requirement of leafs means? The one that says that the leafs should have no value?