What are its smallest and biggest values in python?
6 Answers
>>> import sys
>>> sys.float_info
sys.float_info(max=1.7976931348623157e+308, max_exp=1024, max_10_exp=308,
min=2.2250738585072014e308, min_exp=1021, min_10_exp=307, dig=15,
mant_dig=53, epsilon=2.2204460492503131e16, radix=2, rounds=1)
The smallest is sys.float_info.min
(2.2250738585072014e308) and the biggest is sys.float_info.max
(1.7976931348623157e+308). See documentation for other properties.
sys.float_info.min
is the normalized min. You can usually get the denormalized min as sys.float_info.min * sys.float_info.epsilon
. Note that such numbers are represented with a loss of precision. As expected, the denormalized min is less than the normalized min.


Normalized floating number starts with leftmost bit of mantissa set Commented Aug 1, 2023 at 16:27

I think it's better explained by the exponent part in double precision format. Here, the subnormal numbers have all bits set to
0
, see Wikipedia for examples.– WolfCommented May 17 at 12:04
See this post.
Relevant parts of the post:
In [2]: import kinds In [3]: kinds.default_float_kind.M kinds.default_float_kind.MAX kinds.default_float_kind.MIN kinds.default_float_kind.MAX_10_EXP kinds.default_float_kind.MIN_10_EXP kinds.default_float_kind.MAX_EXP kinds.default_float_kind.MIN_EXP In [3]: kinds.default_float_kind.MIN Out[3]: 2.2250738585072014e308

Note that Numeric has been largely superseded by NumPy. I wonder if a more modern equivalent of the kinds modules exists, though… Commented Dec 2, 2009 at 21:32
As a kind of theoretical complement to the previous answers, I would like to mention that the "magic" value ±308 comes directly from the binary representation of floats. Double precision floats are of the form ±c*2**q with a "small" fractional value c (~1), and q an integer written with 11 binary digits (including 1 bit for its sign). The fact that 2**(2**101) has 308 (decimal) digits explains the appearance of 10**±308 in the extreme float values.
Calculation in Python:
>>> print len(repr(2**(2**101)).rstrip('L'))
308
Technically speaking, the smallest float is inf
and the max float inf
:
>>> (float('inf') # negative infinity
< 1.7976931348623157e+308 #* smallest float that is not negative infinity
< 4.9406564584124654e324 #* biggest negative float that is not zero
< 0 # zero duh
< 4.9406564584124654e324 #* smallest positive float that is not zero
< 1.7976931348623157e+308 #* biggest float that is not positive infinity
< float('inf')) # positive infinity
True
numbers with *
are machinedependent and implementationdependent.

How did you get
4.9406564584124654e324
? To me, it seems not like a normalized number, so I would rather go with2.2250738585072014e308
which is documented bysys.float_info.min
.– WolfCommented May 17 at 11:56 
The smallest positive number is 2**(52) * 2**(1022) as per IEEE754 double precision floats subnormal numbers– Benoît PCommented May 22 at 17:41

You can actually run the code I gave above it will show you that 4.9406564584124654e324 is greater than 0– Benoît PCommented May 22 at 17:46
Python uses doubleprecision floats, which can hold values from about 10 to the 308 to 10 to the 308 power.
http://en.wikipedia.org/wiki/Double_precision_floatingpoint_format
Try this experiment from the Python prompt:
>>> 1e308
1e+308
>>> 1e309
inf
10 to the 309 power is an overflow, but 10 to the 308 is not. QED.
Actually, you can probably get numbers smaller than 1e308 via denormals, but there is a significant performance hit to this. I found that Python is able to handle 1e324
but underflows on 1e325
and returns 0.0
as the value.

1And how's 1e+308 supposed to be bigger (see question) than infinity? ;) Commented Dec 3, 2009 at 11:22

@sfussenegger: The answer "inf and +inf" is certainly a valid response to the question. Please post it as a separate answer. Commented Apr 15, 2017 at 10:28
Just playing around; here is an algorithmic method to find the minimum and maximum positive float, hopefully in any python implementation where float("+inf")
is acceptable:
def find_float_limits():
"""Return a tuple of min, max positive numbers
representable by the platform's float"""
# first, make sure a float's a float
if 1.0/10*10 == 10.0:
raise RuntimeError("Your platform's floats aren't")
minimum= maximum= 1.0
infinity= float("+inf")
# first find minimum
last_minimum= 2*minimum
while last_minimum > minimum > 0:
last_minimum= minimum
minimum*= 0.5
# now find maximum
operands= []
while maximum < infinity:
operands.append(maximum)
try:
maximum*= 2
except OverflowError:
break
last_maximum= maximum= 0
while operands and maximum < infinity:
last_maximum= maximum
maximum+= operands.pop()
return last_minimum, last_maximum
if __name__ == "__main__":
print (find_float_limits()) # python 2 and 3 friendly
In my case,
$ python so1835787.py
(4.9406564584124654e324, 1.7976931348623157e+308)
so denormals are used.