-3

I have such a binary search to find square root of a positive integer

In [95]: find_square_root??                         
Signature: find_square_root(x)
Docstring: <no docstring>
Source:   
def find_square_root(x):
    if x < 2:
        return x

    lo = 0
    hi = x

    while lo < hi:
        mid = (lo + hi) // 2 #

        if mid ** 2 == x:
            lo = mid
            return lo
        if mid ** 2 < x:
            lo = mid + 1
        if mid ** 2 > x:
            hi = mid
        print(f"mid={mid}, lo={lo}, hi={hi}")

    return lo -1
File:      /tmp/ipython_edit_um5dfgck/ipython_edit_sdk9u57g.py
Type:      function

I tested up to 50**5 cases which works properly

for i in range(50, 50**5):
    res = find_square_root(i**2)
    assert res == i, f"res={res}, i={i}"

However, there exist a logic bug there roughly.

Suppose only two numbers left finally, lo and hi which are adjacent to each other surely and they are not tested yet.
According to the algorithms, mid = (lo + hi) // 2, since it floor division, mid is actually equals to lo, so one of the left two number is tested,
additionally if mid ** 2 > x:, then hi = mid = lo,
this way, the function quit safely.

However, if if mid ** 2 < x:, then lo = mid + 1 which means lo = hi and the loop quit with hi left untested.
It seems like a solid logic bug.

but I am not sure because it passed mass of testings.

  • testing up to 50**50 would take a supercomputer quite some time, so how did you do it since the last question you asked about the same function 40 minutes ago? – Ofer Sadan Oct 23 '19 at 9:49
  • 1
    You should not add a conclusion to your question based on the answer(s). The purpose of a question is that it remains a question. Answers should remain in the answer section. That is how this site works. – trincot Oct 23 '19 at 15:08
  • okay, I got the idea. @trincot – Calculus Oct 23 '19 at 15:13
  • 1
    @Algebra: if you want to show an answer that builds upon another answer, you are entitled to add an answer below. Just attribute the work to the relevant authors. – halfer Oct 23 '19 at 15:24
1

However, if mid ** 2 < x:, then lo = mid + 1 which means lo = hi and the loop quit with hi left untested.
It seems like a solid logic bug.

There is no bug here. hi is not left untested, as hi is the value that mid had in a previous iteration, when hi = mid was executed, and so it was already tested there.

If there was never such previous iteration where hi was modified, then this means hi equals x, and that in each iteration mid ** 2 < x is true, until and including when mid == x - 2 (which would assign li = x - 1). But this can only happen when x < 4. In those few cases the solution is 1. As we know x > 1 after the first if, we have hi > 1, so no problem for those cases either. You could even change the first if to if x < 4...

|improve this answer|||||
  • I feel this the right answer, need a while to think thoroughly, thank you. I assured that I am not alone stuck on the problem, see my question on Leetcode's official solution to such a template. stackoverflow.com/questions/58515399/… – Calculus Oct 23 '19 at 11:31
  • Leetcode official template does not think very clearly on the problem. – Calculus Oct 23 '19 at 11:32
  • thank you very much for editing the linked question, I 'd prefer to keep your name of editing to that question and move the edited question here. so in that question, just do remove the unnecessary lines of ` if left != len(nums) and nums[left] == target:` – Calculus Oct 23 '19 at 14:45
  • You can edit this question yourself. Copy whatever you like from that linked question into this one. It's yours ;-) – trincot Oct 23 '19 at 15:06
0

The way to think about it is that hi is one past the end of the range you're searching. So the numbers being searched are the range lo to hi-1, and there is never any need to test hi. Once lo == hi, the range is empty so the number wasn't found, and there is no need to continue testing. So there is no logic error in this code.

|improve this answer|||||
  • ty, I am considering that there is no slicing, slicing is half close half open; is it also the inferior machaniam python do (lo +hi)/2 ? hi is excluded? – Calculus Oct 23 '19 at 11:02
  • If you are referring to list slicing, there is no list here. And even if there was, slicing would copy the data and make things slow. I don't know what you mean by "inferior mechanism". The choice to make the range [lo,hi) is that of the algorithm writer and has nothing to do with python's slicing. – interjay Oct 23 '19 at 11:07
  • I should wrap my mind around for a while, one thing is that hi is not within a range function. – Calculus Oct 23 '19 at 11:19

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.