# Introduction to Hash Maps

Let’s go over the Hash Maps pattern, its real-world applications, and some problems we can solve with it.

## We'll cover the following

## About the pattern

A **hash map**, also known as a hash table, is a data structure that stores key-value pairs. It provides a way to efficiently map keys to values, allowing for quick retrieval of a value associated with a given key. Hash maps achieve this efficiency by using a hash function behind the scenes to compute an index (or hash code) for each key. This index determines where the corresponding value will be stored in an underlying array.

Below is an explanation of the staple methods of a hash map:

**Insert(key, value):**When a key-value pair is inserted into a hash map, the hash function computes an index based on the key. This index is used to determine the location in the hash map where the value will be stored. Because different keys may hash to the same index (collision), hash maps typically include a collision resolution strategy. Common methods include orchaining Collision resolution strategy where each slot in the hash table contains a linked list of entries that hash to the same index. . In the average case, inserting a key-value pair takesopen addressing Collision resolution strategy where collisions are resolved by probing through the hash table to find an empty slot, typically using methods like linear probing or quadratic probing. $O(1)$ time, assuming the hash function distributes keys uniformly across the array. However, in the worst case (when all the keys hash to the same index), insertion can take up to$O(n)$ time, where$n$ is the number of elements in the hash map.**Search(key):**To retrieve a value from the hash map, the hash function is applied to the key to compute its index. Then, the value stored at that index is returned. In the average case, searching for a value takes$O(1)$ time. In the worst case, it can take up to$O(n)$ time due to resizing and handling collisions.**Remove(key):**Removing a key-value pair typically involves finding the index based on the key’s hash and then removing the value stored at that index. In the average case, removing a key-value pair takes$O(1)$ time. In the worst case, it can take up to$O(n)$ time due to resizing and handling collisions.

The following illustration shows an example of these methods being used in a hash map:

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