# Difference between “Complete binary tree”, “strict binary tree”,“full binary Tree”?

I am confused about the terminology of the these trees, I have been studying the Tree,and didn't able to distinguish between there tree viz.

a) Complete Binary Tree

b) Strict Binary Tree

c) full Binary Tree

please help me to differentiate among these trees? When and where these trees are used in Data Structure/

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Does en.wikipedia.org/wiki/Binary_tree#Types_of_binary_trees not answer your question? –  rodion Sep 10 '12 at 21:26
no its not ,a lot of confusion among these –  kTiwari Sep 10 '12 at 21:28
Strict Binary Tree: Every node can have 2 child or no nodes at all –  vikkyhacks Feb 18 at 17:44

wikipedia yeilded

A full binary tree (sometimes proper binary tree or 2-tree or strictly binary tree) is a tree in which every node other than the leaves has two children.

so you have no leaves with only 1 child. Appears to be the same as strict binary tree.

here is an image of a full/strict binary tree, from google

A complete binary tree is a binary tree in which every level, except possibly the last, is completely filled, and all nodes are as far left as possible.

it seems to mean a balanced tree.

here is an image of a complete binary tree, from google, full tree part of image is bonus

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Perfect:

``````       x
/   \
/     \
x       x
/ \     / \
x   x   x   x
/ \ / \ / \ / \
x x x x x x x x
``````

Complete:

``````       x
/   \
/     \
x       x
/ \     / \
x   x   x   x
/ \ /
x x x
``````

Strict:

``````       x
/   \
/     \
x       x
/ \
x   x
/ \
x x
``````
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Consider a binary tree whose nodes are drawn in a tree fashion. Now start numbering the nodes from top to bottom and left to right. A complete tree has these properties:

If n has children then all nodes numbered less than n have two children.

If n has one child it must be the left child and all nodes less than n have two children. In addition no node numbered greater than n has children.

If n has no children then no node numbered greater than n has children.

A complete binary tree can be used to represent a heap. It can be easily represented in contiguous memory with no gaps (i.e. all array elements are used save for any space that may exist at the end).

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