# Time complexity of append operation in simple array

In the worst case while appending an element(inserting at end) array can be full. So a new array is created and n elements are copied from this array to the new array.

I read in literature that worst case time complexity of this operation is O(1), why so? shouldn't it be O(n)?

I did read this question. But did not make any sense to me!

## 2 Answers

The operation itself is O(n).

If you get the average operations per element, you get O(1), this is the amortized cost.

• I think this is the line at the heart: "The basic idea is that a worst case operation can alter the state in such a way that the worst case cannot occur again for a long time, thus "amortizing" its cost." – DDC Mar 4 '14 at 14:07
• that's why exponential growth is used when resizing. – Karoly Horvath Mar 4 '14 at 14:08
• Are you telling that when I will create new array it would exponentially larger than previous one? If so how to choose exponent values? – DDC Mar 4 '14 at 14:10
• double the size. that should be good for most applications. – Karoly Horvath Mar 4 '14 at 14:12
• Is there any such rules? Can you point to some literature please? – DDC Mar 4 '14 at 14:13

I see it the same way that you do.

If it was a List, then it was O(1) to add an element at the end.

But in the case of an array, if it´s full you need to create a new one, copy all the elements in the old array, and then add the new element.

For me it´s O(n) too.