# Integer square root in python

Is there an integer square root somewhere in python, or in standard libraries? I want it to be exact (i.e. return an integer), and bark if there's no solution.

At the moment I rolled my own naive one:

``````def isqrt(n):
i = int(math.sqrt(n) + 0.5)
if i**2 == n:
return i
raise ValueError('input was not a perfect square')
``````

But it's ugly and I don't really trust it for large integers. I could iterate through the squares and give up if I've exceeded the value, but I assume it would be kinda slow to do something like that. Also I guess I'd probably be reinventing the wheel, something like this must surely exist in python already...

• It's not a requirement that comes up often so there's no built-in. There's nothing wrong with the solution you have, but I'd make one stylistic change - reverse the condition of the `if` so the `return` comes last. Mar 13 '13 at 16:22
• Can't it overflow/screw up for large inputs because of working with floats?
– wim
Mar 13 '13 at 16:24
• @wim: it can and will.
– DSM
Mar 13 '13 at 16:24
• It will overflow when `n` becomes too large to fit in a float without truncation, which is at 2**53. Even so it might still work because of the rounding you do to the result. Are you really going to be working with numbers that large? Mar 13 '13 at 16:32
• Yes I'm going to be working with numbers MUCH larger than 2**53.
– wim
Mar 13 '13 at 16:40

Newton's method works perfectly well on integers:

``````def isqrt(n):
x = n
y = (x + 1) // 2
while y < x:
x = y
y = (x + n // x) // 2
return x
``````

This returns the largest integer x for which x * x does not exceed n. If you want to check if the result is exactly the square root, simply perform the multiplication to check if n is a perfect square.

I discuss this algorithm, and three other algorithms for calculating square roots, at my blog.

• You can get a much better initial approximation using `y = 1 << (n.bit_length()>>1)` (thx to mathmandan). Jul 6 '15 at 16:32
• @greggo This is a good idea, but it isn't compatible with the rest of user448810's algorithm. It causes the function to return 8 for the square root of 100. Sep 17 '15 at 6:02
• Yes, the algorithm as stated requires the x,y estimates to start > than the true square root, and work down. so my formula needs to be adjusted; off the top of my head, `y = 2 << ((n.bit_length()>>1)` should work, may be a way to slice it a bit finer though. Sep 18 '15 at 14:37
• @greggo That nearly works, but fails for n = 2, 3, 4, or 8. `y = (2 ** ((n.bit_length()+1) // 2)) - 1` will work for all non-negative integers, including 0. Dec 3 '15 at 20:28
• `y = 1<<b-1-(b+1)%2`, where `b = math.frexp(n)[1]`, which is equal to `ceil(log2(n))`. Works for all non-negative integers, including 0. Highest power of 4 <= n. Mar 7 '16 at 18:30

Update: Python 3.8 has a `math.isqrt` function in the standard library!

I benchmarked every (correct) function here on both small (0…222) and large (250001) inputs. The clear winners in both cases are `gmpy2.isqrt` suggested by mathmandan in first place, followed by Python 3.8’s `math.isqrt` in second, followed by the ActiveState recipe linked by NPE in third. The ActiveState recipe has a bunch of divisions that can be replaced by shifts, which makes it a bit faster (but still behind the native functions):

``````def isqrt(n):
if n > 0:
x = 1 << (n.bit_length() + 1 >> 1)
while True:
y = (x + n // x) >> 1
if y >= x:
return x
x = y
elif n == 0:
return 0
else:
raise ValueError("square root not defined for negative numbers")
``````

Benchmark results:

(* Since `gmpy2.isqrt` returns a `gmpy2.mpz` object, which behaves mostly but not exactly like an `int`, you may need to convert it back to an `int` for some uses.)

• I haven't checked them all out, but `gmpy2.isqrt` Is a C extension module, so it's not really doing it in Python. Dec 31 '18 at 8:20
• @martineau Which is why I spent effort optimizing a pure Python answer too. Some readers will want pure Python, some will want the fastest thing regardless of technology, some will want something small and clear to copy and paste, some will want a solution they can just import, who knows—I’m just presenting the options in a way that allows them to be compared. Dec 31 '18 at 8:28
• I'm the `gmpy2` maintainer and I have a couple comments on related functions in `gmpy2`. `gmpy2.is_square()`is usually the fastest method to determine if a number is a perfect square. It performs some very quick tests that can identify most non-perfect squares quickly and only calculates the square root if needed. `gmpy2.isqrt_rem()` will return the integer square root and the remainder. Jan 2 '19 at 5:47
• You should credit Fredrik Johansson instead of ActiveState. The code there is just a Python implementation of his answer here: stackoverflow.com/a/1624602/4311651
– Wood
Jun 4 '19 at 9:00
• See the math theory. Jul 27 at 13:04

Sorry for the very late response; I just stumbled onto this page. In case anyone visits this page in the future, the python module gmpy2 is designed to work with very large inputs, and includes among other things an integer square root function.

Example:

``````>>> import gmpy2
>>> gmpy2.isqrt((10**100+1)**2)
mpz(10000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001L)
>>> gmpy2.isqrt((10**100+1)**2 - 1)
mpz(10000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000L)
``````

Granted, everything will have the "mpz" tag, but mpz's are compatible with int's:

``````>>> gmpy2.mpz(3)*4
mpz(12)

>>> int(gmpy2.mpz(12))
12
``````

See my other answer for a discussion of this method's performance relative to some other answers to this question.

Long-hand square root algorithm

It turns out that there is an algorithm for computing square roots that you can compute by hand, something like long-division. Each iteration of the algorithm produces exactly one digit of the resulting square root while consuming two digits of the number whose square root you seek. While the "long hand" version of the algorithm is specified in decimal, it works in any base, with binary being simplest to implement and perhaps the fastest to execute (depending on the underlying bignum representation).

Because this algorithm operates on numbers digit-by-digit, it produces exact results for arbitrarily large perfect squares, and for non-perfect-squares, can produce as many digits of precision (to the right of the decimal place) as desired.

There are two nice writeups on the "Dr. Math" site that explain the algorithm:

And here's an implementation in Python:

``````def exact_sqrt(x):
"""Calculate the square root of an arbitrarily large integer.

The result of exact_sqrt(x) is a tuple (a, r) such that a**2 + r = x, where
a is the largest integer such that a**2 <= x, and r is the "remainder".  If
x is a perfect square, then r will be zero.

The algorithm used is the "long-hand square root" algorithm, as described at
http://mathforum.org/library/drmath/view/52656.html

Tobin Fricke 2014-04-23
Max Planck Institute for Gravitational Physics
Hannover, Germany
"""

N = 0   # Problem so far
a = 0   # Solution so far

# We'll process the number two bits at a time, starting at the MSB
L = x.bit_length()
L += (L % 2)          # Round up to the next even number

for i in xrange(L, -1, -1):

# Get the next group of two bits
n = (x >> (2*i)) & 0b11

# Check whether we can reduce the remainder
if ((N - a*a) << 2) + n >= (a<<2) + 1:
b = 1
else:
b = 0

a = (a << 1) | b   # Concatenate the next bit of the solution
N = (N << 2) | n   # Concatenate the next bit of the problem

return (a, N-a*a)
``````

You could easily modify this function to conduct additional iterations to calculate the fractional part of the square root. I was most interested in computing roots of large perfect squares.

I'm not sure how this compares to the "integer Newton's method" algorithm. I suspect that Newton's method is faster, since it can in principle generate multiple bits of the solution in one iteration, while the "long hand" algorithm generates exactly one bit of the solution per iteration.

Source repo: https://gist.github.com/tobin/11233492

• I rewrote your solution for Python3 and made it ~2.4 times faster! The single biggest optimization was re-writing the range function to do half as many iterations, but I massaged every line to squeeze out whatever performance I could. Please check out my version here and have my gratitude for providing a great starting point. Sep 26 '16 at 0:39

Here's a very straightforward implementation:

``````def i_sqrt(n):
i = n.bit_length() >> 1    # i = floor( (1 + floor(log_2(n))) / 2 )
m = 1 << i    # m = 2^i
#
# Fact: (2^(i + 1))^2 > n, so m has at least as many bits
# as the floor of the square root of n.
#
# Proof: (2^(i+1))^2 = 2^(2i + 2) >= 2^(floor(log_2(n)) + 2)
# >= 2^(ceil(log_2(n) + 1) >= 2^(log_2(n) + 1) > 2^(log_2(n)) = n. QED.
#
while m*m > n:
m >>= 1
i -= 1
for k in xrange(i-1, -1, -1):
x = m | (1 << k)
if x*x <= n:
m = x
return m
``````

This is just a binary search. Initialize the value `m` to be the largest power of 2 that does not exceed the square root, then check whether each smaller bit can be set while keeping the result no larger than the square root. (Check the bits one at a time, in descending order.)

For reasonably large values of `n` (say, around `10**6000`, or around `20000` bits), this seems to be:

All of these approaches succeed on inputs of this size, but on my machine, this function takes around 1.5 seconds, while @Nibot's takes about 0.9 seconds, @user448810's takes around 19 seconds, and the gmpy2 built-in method takes less than a millisecond(!). Example:

``````>>> import random
>>> import timeit
>>> import gmpy2
>>> r = random.getrandbits
>>> t = timeit.timeit
>>> t('i_sqrt(r(20000))', 'from __main__ import *', number = 5)/5. # This function
1.5102493192883117
>>> t('exact_sqrt(r(20000))', 'from __main__ import *', number = 5)/5. # Nibot
0.8952787937686366
>>> t('isqrt(r(20000))', 'from __main__ import *', number = 5)/5. # user448810
19.326695976676184
>>> t('gmpy2.isqrt(r(20000))', 'from __main__ import *', number = 5)/5. # gmpy2
0.0003599147067689046
>>> all(i_sqrt(n)==isqrt(n)==exact_sqrt(n)[0]==int(gmpy2.isqrt(n)) for n in (r(1500) for i in xrange(1500)))
True
``````

This function can be generalized easily, though it's not quite as nice because I don't have quite as precise of an initial guess for `m`:

``````def i_root(num, root, report_exactness = True):
i = num.bit_length() / root
m = 1 << i
while m ** root < num:
m <<= 1
i += 1
while m ** root > num:
m >>= 1
i -= 1
for k in xrange(i-1, -1, -1):
x = m | (1 << k)
if x ** root <= num:
m = x
if report_exactness:
return m, m ** root == num
return m
``````

However, note that `gmpy2` also has an `i_root` method.

In fact this method could be adapted and applied to any (nonnegative, increasing) function `f` to determine an "integer inverse of `f`". However, to choose an efficient initial value of `m` you'd still want to know something about `f`.

Edit: Thanks to @Greggo for pointing out that the `i_sqrt` function can be rewritten to avoid using any multiplications. This yields an impressive performance boost!

``````def improved_i_sqrt(n):
assert n >= 0
if n == 0:
return 0
i = n.bit_length() >> 1    # i = floor( (1 + floor(log_2(n))) / 2 )
m = 1 << i    # m = 2^i
#
# Fact: (2^(i + 1))^2 > n, so m has at least as many bits
# as the floor of the square root of n.
#
# Proof: (2^(i+1))^2 = 2^(2i + 2) >= 2^(floor(log_2(n)) + 2)
# >= 2^(ceil(log_2(n) + 1) >= 2^(log_2(n) + 1) > 2^(log_2(n)) = n. QED.
#
while (m << i) > n: # (m<<i) = m*(2^i) = m*m
m >>= 1
i -= 1
d = n - (m << i) # d = n-m^2
for k in xrange(i-1, -1, -1):
j = 1 << k
new_diff = d - (((m<<1) | j) << k) # n-(m+2^k)^2 = n-m^2-2*m*2^k-2^(2k)
if new_diff >= 0:
d = new_diff
m |= j
return m
``````

Note that by construction, the `k`th bit of `m << 1` is not set, so bitwise-or may be used to implement the addition of `(m<<1) + (1<<k)`. Ultimately I have `(2*m*(2**k) + 2**(2*k))` written as `(((m<<1) | (1<<k)) << k)`, so it's three shifts and one bitwise-or (followed by a subtraction to get `new_diff`). Maybe there is still a more efficient way to get this? Regardless, it's far better than multiplying `m*m`! Compare with above:

``````>>> t('improved_i_sqrt(r(20000))', 'from __main__ import *', number = 5)/5.
0.10908999762373242
>>> all(improved_i_sqrt(n) == i_sqrt(n) for n in xrange(10**6))
True
``````
• There is a way to eliminate all multiplies in the square root op, basically you keep track of the difference between n and m**2, and adjust that difference downwards whenever m is increased. If you look up the source code for a software version of sqrt e.g. netlib.org/fdlibm/e_sqrt.c you will find this method in use (and that one has a good explanation in the comments). Jul 6 '15 at 16:30
• @greggo Excellent! I have posted an improved (multiplication-free) version of the integer square root function--let me know if you have further suggestions. Thanks so much for your help! Jul 6 '15 at 23:40

One option would be to use the `decimal` module, and do it in sufficiently-precise floats:

``````import decimal

def isqrt(n):
nd = decimal.Decimal(n)
with decimal.localcontext() as ctx:
ctx.prec = n.bit_length()
i = int(nd.sqrt())
if i**2 != n:
raise ValueError('input was not a perfect square')
return i
``````

which I think should work:

``````>>> isqrt(1)
1
>>> isqrt(7**14) == 7**7
True
>>> isqrt(11**1000) == 11**500
True
>>> isqrt(11**1000+1)
Traceback (most recent call last):
File "<ipython-input-121-e80953fb4d8e>", line 1, in <module>
isqrt(11**1000+1)
File "<ipython-input-100-dd91f704e2bd>", line 10, in isqrt
raise ValueError('input was not a perfect square')
ValueError: input was not a perfect square
``````
• You can improve on this slightly, by letting `decimal` do the work of raising exceptions. Just add `ctx.traps = [decimal.Rounded, decimal.Inexact]` to set the trap conditions and it will raise exceptions if either occurs; no need to test and `raise` yourself. You can also improve performance a great deal by changing `ctx.prec = n.bit_length()` to something like `ctx.prec = int(math.ceil(math.log10(n))) + 1` which dramatically reduces precision, but should still always provide enough precision. Of course, this assumes you don't have `math.isqrt` and can't update to Python 3.8+ to get it. Dec 27 '19 at 21:11
• @ShadowRanger As noted in some other comments the math module is not an option here because it cannot handle arbitrary large integers Jun 7 at 20:41
• @miracle173: `math.isqrt` can. The other comments (which predate the existence of `math.isqrt`) are referring to `math.sqrt` (or equivalently, just doing `** 0.5`, both of which produce `float` outputs. `math.isqrt` is pure integer to integer, and handles arbitrarily large integers just fine. Jun 8 at 0:44
• @ShadowRanger Yes, you are right. math.isqrt is able to handle arbitrarily large integers Jun 8 at 3:03

Seems like you could check like this:

``````if int(math.sqrt(n))**2 == n:
print n, 'is a perfect square'
``````

Update:

As you pointed out the above fails for large values of `n`. For those the following looks promising, which is an adaptation of the example C code, by Martin Guy @ UKC, June 1985, for the relatively simple looking binary numeral digit-by-digit calculation method mentioned in the Wikipedia article Methods of computing square roots:

``````from math import ceil, log

def isqrt(n):
res = 0
bit = 4**int(ceil(log(n, 4))) if n else 0  # smallest power of 4 >= the argument
while bit:
if n >= res + bit:
n -= res + bit
res = (res >> 1) + bit
else:
res >>= 1
bit >>= 2
return res

if __name__ == '__main__':
from math import sqrt  # for comparison purposes

for i in range(17)+[2**53, (10**100+1)**2]:
is_perfect_sq = isqrt(i)**2 == i
print '{:21,d}:  math.sqrt={:12,.7G}, isqrt={:10,d} {}'.format(
i, sqrt(i), isqrt(i), '(perfect square)' if is_perfect_sq else '')
``````

Output:

``````                    0:  math.sqrt=           0, isqrt=         0 (perfect square)
1:  math.sqrt=           1, isqrt=         1 (perfect square)
2:  math.sqrt=    1.414214, isqrt=         1
3:  math.sqrt=    1.732051, isqrt=         1
4:  math.sqrt=           2, isqrt=         2 (perfect square)
5:  math.sqrt=    2.236068, isqrt=         2
6:  math.sqrt=     2.44949, isqrt=         2
7:  math.sqrt=    2.645751, isqrt=         2
8:  math.sqrt=    2.828427, isqrt=         2
9:  math.sqrt=           3, isqrt=         3 (perfect square)
10:  math.sqrt=    3.162278, isqrt=         3
11:  math.sqrt=    3.316625, isqrt=         3
12:  math.sqrt=    3.464102, isqrt=         3
13:  math.sqrt=    3.605551, isqrt=         3
14:  math.sqrt=    3.741657, isqrt=         3
15:  math.sqrt=    3.872983, isqrt=         3
16:  math.sqrt=           4, isqrt=         4 (perfect square)
9,007,199,254,740,992:  math.sqrt=9.490627E+07, isqrt=94,906,265
100,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,020,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,001:  math.sqrt=      1E+100, isqrt=10,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,001 (perfect square)
``````
• @wim: True...I believe the last update I made to my answer fixes that shortcoming and is therefore a very usable solution. Mar 14 '13 at 15:41
• The `4 ** int(ceil(log(n, 4)))` construction still relies on floating-point math, and thus may fail for large inputs. Use `4 ** ((n - 1).bit_length() + 1 >> 1)` instead, or better, `1 << ((n - 1).bit_length() + 1 & -2)`. Dec 31 '18 at 3:15
• @AndersKaseorg: I'll look into it. FWIW, `bit_length()` doesn't exist in Python 2, which is the version that was used to develop the code currently in the answer. Dec 31 '18 at 8:28
• It exists in 2.7. (Not saying I don’t believe that you weren’t using 2.7 back then—but I hope I’m only being slightly optimistic to say that nobody’s developing for pre-2.7 now.) Dec 31 '18 at 8:31
• `(n - 1).bit_length()``len(bin(n - 1)) - 2` was the typical workaround from that era. Dec 31 '18 at 8:59

Python's default `math` library has an integer square root function:

### `math.isqrt(n)`

Return the integer square root of the nonnegative integer n. This is the floor of the exact square root of n, or equivalently the greatest integer a such that a² ≤ n.

• I think my comment is wrong, it will be able to handle arbitrary length integers Jun 7 at 21:43
• i cannot remove my downvote until you edit your post and notify me Jun 7 at 22:07
• @miracle173 done. Jun 7 at 22:36
• this is available for Python 3.8 and higher. For this versions it is the best solution Jun 8 at 3:00

Your function fails for large inputs:

``````In [26]: isqrt((10**100+1)**2)

ValueError: input was not a perfect square
``````

There is a recipe on the ActiveState site which should hopefully be more reliable since it uses integer maths only. It is based on an earlier StackOverflow question: Writing your own square root function

Floats cannot be precisely represented on computers. You can test for a desired proximity setting epsilon to a small value within the accuracy of python's floats.

``````def isqrt(n):
epsilon = .00000000001
i = int(n**.5 + 0.5)
if abs(i**2 - n) < epsilon:
return i
raise ValueError('input was not a perfect square')
``````
• This too seems to fail for larger values of n. Newton's method looks promising or the decimal.Decimal solution. Mar 13 '13 at 17:14

I have compared the different methods given here with a loop:

``````for i in range (1000000): # 700 msec
r=int(123456781234567**0.5+0.5)
if r**2==123456781234567:rr=r
else:rr=-1
``````

finding that this one is fastest and need no math-import. Very long might fail, but look at this

``````15241576832799734552675677489**0.5 = 123456781234567.0
``````
• please look at this 1000000000000000000000053646891100000000000000011928482406771 (=nextprime(10^29+5342347)*nextprime(10^31+2232788)) from A ONE LINE FACTORING ALGORITHM Jun 7 at 20:48

Try this condition (no additional computation):

``````def isqrt(n):
i = math.sqrt(n)
if i != int(i):
raise ValueError('input was not a perfect square')
return i
``````

If you need it to return an `int` (not a `float` with a trailing zero) then either assign a 2nd variable or compute `int(i)` twice.

• An alternative can be `if not i.is_integer()`. Anyway, this function fails for big inputs, where the number cannot be represented as float(and probably even before that). Mar 13 '13 at 16:28
• Try calling this function with `(10**10)**2-1` and see it mistakenly think that the argument is a perfect square.
– NPE
Mar 13 '13 at 16:28