# Help inserting a list of values into a binary tree..?

Well, I've been at it for a while...trying to figure out an algorithm to insert my list of random numbers into a binary tree.

This is what I have gotten so far:

NodePtr and Tree are pointers to a node

``````NodePtr CreateTree(FILE * fpData)
{
int in;

fscanf(fpData, "%i", &in);
Tree T = (NodePtr)malloc(sizeof(Node));
T->Left = NULL;
T->Right = NULL;
T->value = in;

while((fscanf(fpData, "%i", &in)) != EOF)
{
InsertInTree(in, T);
printf("\n %p", T);
}

return T;

}

void InsertInTree(int value,Tree T)
{
if(T == NULL)
{
T->Left = (NodePtr)malloc(sizeof(Node));
T->Left->Left = NULL;
T->Left->Right = NULL;
T->Left->value = value;
printf("\n %i ", value);
return;
}
if(T->Left == NULL)
{
InsertInNull(value, T->Left);
}
else if(T->Right == NULL)
{
InsertInNull(value, T->Right);
}
else
{
if(T->Left->Left == NULL || T->Left->Right == NULL) InsertInTree(value, T->Left);
else InsertInTree(value, T->Right);
}
}
``````

I'm lost on what to do if the both children of a particular node are not null. What I did here works for a small amount of numbers (1,2,3,5,6) but if the list is larger it becomes unbalanced and wrong.

-
What's the purpose of this binary tree? In a binary search tree, for example, at each node you compare the value you're inserting to the value at the node. If it's less than (or equal, for argument's sake) the value you inspect the left subtree. If it's greater, you inspect the right. Any time you try to inspect a subtree that is empty, you create a new leaf node and give it the value you're inserting. You seem to always be going whichever way isn't currently populated? – Tommy Nov 7 '10 at 23:11
Your options are to either rebalance yourself. Or to use a slighly different algorithm like a [Red-Black tree][1] which automatically rebalances. [1]: en.wikipedia.org/wiki/Red-black_tree – Wolph Nov 7 '10 at 23:11
I think I know what I need to do now....I might have misunderstood what I am suppose to with this binary tree. I need to order it. Thanks everyone. – Bri Nov 7 '10 at 23:14

Is it meant to be a search-tree? I don't see any `if (value < T->Value)` conditions.

And you have an InsertNull (not shown). That shouldn't be necessary, 1 function should be enough.

To address your main problem, use a pointer-to-pointer parameter or, more elegant, always return a new Tree:

``````//untested, no balancing
Tree InsertValue(Tree t, int value)
{
if (t == null)
t = // create and return new node
else
{
if (value < t->Value)
t->Left = InsertValue(t->Left, value);
else
t->Right = InsertValue(t->Left, value);
}
return t;
}
``````

And in CreateTree:

``````Tree t = InsertValue(null, in);
``````
-
What is the variable `old`? Surely you meant `t` instead? – Adam Rosenfield Nov 7 '10 at 23:22
So, I tried this... but if I have something that is sorted already ... like 1,2,3,4,5,6 it just chains them together.....how do i put it into likes a binary tree... :\ – Bri Nov 7 '10 at 23:33
@Bri: What you want is a balanced binary search tree, which is a lot more challenging than just a bare-bones binary search tree. See en.wikipedia.org/wiki/Balanced_binary_search_tree for links to a number of different algorithms for balancing a binary search tree. – Adam Rosenfield Nov 7 '10 at 23:41
Ah geez, I'm really about to give up on my CS degree... I'll check that out...(I'm literally in tears over this...) – Bri Nov 7 '10 at 23:44
If this is for class, check the assignment again. The first tree most CS students are required to write is not a self balancing tree. Get the basics down by writing an unbalanced binary tree and then you will have the proper foundation for a balanced tree (probably an AVR tree). Just like anything else in life, programming is a gradual process. Take one step at a time and you will be fine. Don't give up. – Brian Clements Nov 8 '10 at 0:02

Since the assignment is not for a sorted tree, you can populate it in a breadth-first manner. This means the first thing inserted is always the root, the next is the first node at the next level so it looks like this:

``````   0
1 2
3 4 5 6
``````

Here is an article that explains it further: