I am trying to figure out what the time complexity of my algorithm is, I have algorithm with binary search, which is in general O(log n), I know. But I search between two constants, namely x=1 and x = 2^31 - 1 (size of integer). I think that in the worst case my time complexity is log2(2^31) = 31, so binary search takes 31 steps in the worst case. However every step in binary search I call a function, which has O(n) runtime (just one loop of the size of the input). Will my algorithm simply be of order O(31n)=O(n)?
The input of my algorithm: a key, two arrays a and b of size n.
In code it will look something like this:
binarySearch(key, a, b)
min = 0, max = 2^31 - 1
mid = (min + max) / 2
while (min<=max) {
x = function(mid, a, b); //this function has O(n)
if (x==key) {
return mid;
} else if (x < key) {
min = mid + 1
} else {
max = mid - 1
}
mid = (min + max) / 2
}
return KEY_NOT_FOUND
I just want to be sure, please if you come with a time complexity (reduced ones) explain your answer.