# Find the average of a list of numbers in O(1) notation - constant time

Here's the thing, I have a task to make an array with some numbers, after that the array can accept any other numbers of the the same type inside on any position. When I get the final array (with the added numbers) I need to find the average of the numbers inside with a constant O(1) time. How do I do that?! Here's what I have as an example

Elements: 5 12 7 9 31 Average: 12.8

• I'm pretty sure this is provably impossible. Unless of course you consider only the time for retrieving an already calculated value which is amended on every change to the values.
– user395760
Nov 14, 2012 at 19:40
• So you need to accumulate the data as elements are added, making the addition (or removal) of an element more complex. There's an O(N) cost during the addition of elements; there's an O(1) cost when you need the average. You can't avoid the O(N) cost somewhere along the line (but you were incurring O(N) cost as you add elements anyway). Nov 14, 2012 at 19:42
• You question is unclear. If you are trying to find the average of an arbitrary list of `n` numbers, this will obviously take `O(n)` time because you can't know the average until you see all the numbers. If you have an array with known average and length, then updating the average and length for an addition or change in one element is obviously `O(1)`. What are you asking? Nov 14, 2012 at 19:43
• @JonathanLeffler An O(N) cost to add one element isn't necessary. It's possible to have O(1), but as you said, O(N) is still encountered while adding items. Nov 14, 2012 at 19:44
• @KendallFrey: It's an O(1) cost to add 1 element; it's an O(N) cost to add N elements. Nov 14, 2012 at 19:46