The selected answer isn't optimal. If you're trying to minimize the number of probes (array lookups), you can do better than searching from the beginning and a taking steps as small as
`target - array[i]
Since you're allowed to do random access using indexed lookup, you can make far larger strides. For example if you looking for 9 in an array that starts with
a = 0, you could examine
a to see if it is less-than or equal to 0. If not, then none of
a[0 .. 16] can reach 9.
Bigger strides give you more information per probe (each probe lets you exclude indicies both to the left and to the right). This lets you gain twice as much information per probe when to compared to minimum strides when searching from the left.
To demonstrate the advantages of search-from-the-middle over search-from-the-left, here's some working code in written in the Python programming language:
def find(arr, value, bias=2):
# With the bias at 2, new probes are in the middle of the range.
# Increase the bias to force the search leftwards.
# A very large bias does the same as searching from left side of the range.
todo = [(0, len(arr)-1)] # list of ranges where the value is possible
low, high = todo.pop()
if low == high:
if arr[low] == value: return low
mid = low + (high - low) // bias
diff = abs(arr[mid] - value)
if mid+diff <= high: todo.append([mid + diff, high])
if mid-diff >= low: todo.append([low, mid - diff])
raise ValueError('Value is not in the array')
Conceptually, what the algorithm is doing is trying to gain the maximum amount of information possible with each probe. Sometimes, it will get lucky and exclude large ranges all at once; sometimes, it will be unlucky and only be able to exclude a tiny subrange. Regardless of luck, its exclusion zone will be twice as large as the search-from-the-left approach.
Simple test code:
arr = [10, 11, 12, 13, 14, 13, 12, 11, 10, 9, 8, 7, 6, 7, 8]
for i in range(min(arr), max(arr)+1):
assert arr.index(i) == find(arr, i)