Big O notation denotes the limiting factor of an algorithm. Its a simplified expression of how run time of an algorithm scales with relation to the input.

For example (in Java):

```
/** Takes an array of strings and concatenates them
* This is a silly way of doing things but it gets the
* point across hopefully
* @param strings the array of strings to concatenate
* @returns a string that is a result of the concatenation of all the strings
* in the array
*/
public static String badConcat(String[] Strings){
String totalString = "";
for(String s : strings) {
for(int i = 0; i < s.length(); i++){
totalString += s.charAt(i);
}
}
return totalString;
}
```

Now think about what this is actually doing. It is going through every character of input and adding them together. This seems straightforward. The problem is that **String is immutable**. So every time you add a letter onto the string you have to create a new String. To do this you have to copy the values from the old string into the new string and add the new character.

This means you will be copying the first letter *n* times where *n* is the number of characters in the input. You will be copying the character `n-1`

times, so in total there will be `(n-1)(n/2)`

copies.

This is `(n^2-n)/2`

and for Big O notation we use only the highest magnitude factor (usually) and drop any constants that are multiplied by it and we end up with `O(n^2)`

.

Using something like a `StringBuilder`

will be along the lines of O(nLog(n)). If you calculate the number of characters at the beginning and set the capacity of the `StringBuilder`

you can get it to be `O(n)`

.

So if we had 1000 characters of input, the first example would perform roughly a million operations, `StringBuilder`

would perform 10,000, and the `StringBuilder`

with `setCapacity`

would perform 1000 operations to do the same thing. This is rough estimate, but `O(n)`

notation is about orders of magnitudes, not exact runtime.

It's not something I use per say on a regular basis. It is, however, constantly in the back of my mind when trying to figure out the best algorithm for doing something.