Interview questions like this are designed to see how you think. So I would probably mention a O(N^0.5) solution as above, but also I would give the following discussion...

Since the coconuts may have internal cracking over time, the results may not be so consistent to a O(N^0.5) solution. Although the O(N^0.5) solution is efficient, it is not entirely reliable.

I would recommend a linear O(N) solution with the first coconut, and then verify the result with the second coconut. Where N is the number of floors in the building. So for the first coconut you try the 1st floor, then the 2nd, then the 3rd, ...

Assuming both coconuts are built structurally exactly the same and are dropped on the exact same angle, then you can throw the second coconut directly on the floor that the first one broke. Call this coconut breaking floor B.

For coconut #2, you don't need to test on 1..B-1 because you already know that the first cocounut didn't break on floor B-1, B-2, ... 1. So you only need to try it on B.

If the 2nd coconut breaks on B, then you know that B is the floor in question. If it doesn't break you can deduce that there were internal cracking and degradation of the coconut over time and that the test is flawed to begin with. You need more coconuts.

Given that building sizes are pretty limited, the extra confidence in your solution is worth the O(N) solution.

As @Rafał Dowgird mentioned, the solution also depends on whether the monkey in question is an African monkey or a European monkey. It is common knowledge that African monkeys throw with a much greater force. Hence making the breaking floor B only accurate with a variance of +/- 2 floors.

To guarantee that the monkey doesn't get tired from all those stairs, it would also be advisable to attach a string to the first coconut. That way you don't need to do 1+2+..+B = B*(B+1)/2 flights of stairs for the first coconut. You would only need to do exactly B flights of stairs.

It may seem that the number of flights of stairs is not relevant to this problem, but if the monkey gets tired out in the first place, we may never come to a solution. This gives new considerations for the halting problem.

We are also making the assumption that the building resides on earth and the gravity is set at 9.8m/s^2. We'll also assume that no gravitation waves exist.