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.

`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