I am not sure what he had in mind.

If you just want to find the number one time, and you have no guarantees about whether the array is sorted, then I don't think you can beat linear search. On average you will need to seek halfway through the array before you find the value, i.e. expected running time O(N); when sorting you have to touch every single value at least once and probably more than that, i.e. expected running time O(N log N).

But if you need to find multiple values then the time spent sorting it pays off quickly. With a sorted array, you can binary search in O(log N) time, so for sure by the third search you are ahead if you invested the time to sort.

You can do even better if you are allowed to build different data structures to help with the problem. You could build some sort of index, such as a hash table; but the champion data structure for this sort of problem probably would be some sort of tree structure. Then you can insert new values into the tree faster than you could append new values and re-sort the array, and the lookup is still going to be O(log N) to find any value. There are different sorts of trees available: binary tree, B-tree, trie, etc.

But as @Hot Licks said, a hash table is often used for this sort of thing, and it's pretty cheap to update: you just append a value on the main array, and update the hash table to point to the new value. And a hash table is very close to O(1) time, which you can't beat. (A hash table *is* O(1) if there are no hash collisions; assuming a good hash algorithm and a big enough hash table there will be almost no collisions. I think you could say that a hash table is O(N) where N is the average number of hash collisions per "bucket". If I'm wrong about that I expect to be corrected very quickly; this is StackOverflow!)