# What is the range of values a float can have in Python?

What are its smallest and biggest values in python?

>>> import sys
>>> sys.float_info
sys.float_info(max=1.7976931348623157e+308, max_exp=1024, max_10_exp=308,
min=2.2250738585072014e-308, min_exp=-1021, min_10_exp=-307, dig=15,

The smallest is sys.float_info.min (2.2250738585072014e-308) 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.

• What is "normalized" min? Commented Jul 28, 2023 at 9:16
• 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.
– Wolf
Commented 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]: 2.2250738585072014e-308
• Note that Numeric has been largely superseded by NumPy.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**10-1) has 308 (decimal) digits explains the appearance of 10**±308 in the extreme float values.

Calculation in Python:

>>> print len(repr(2**(2**10-1)).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
< -4.9406564584124654e-324    #*  biggest negative float that is not zero
< 0                           #   zero duh
< 4.9406564584124654e-324     #*  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 machine-dependent and implementation-dependent.

• How did you get 4.9406564584124654e-324? To me, it seems not like a normalized number, so I would rather go with 2.2250738585072014e-308 which is documented by sys.float_info.min.
– Wolf
Commented May 17 at 11:56
• The smallest positive number is 2**(-52) * 2**(-1022) as per IEEE-754 double precision floats subnormal numbers Commented May 22 at 17:41
• You can actually run the code I gave above it will show you that 4.9406564584124654e-324 is greater than 0 Commented May 22 at 17:46

Python uses double-precision floats, which can hold values from about 10 to the -308 to 10 to the 308 power.

http://en.wikipedia.org/wiki/Double_precision_floating-point_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 1e-308 via denormals, but there is a significant performance hit to this. I found that Python is able to handle 1e-324 but underflows on 1e-325 and returns 0.0 as the value.

• And 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:

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
(4.9406564584124654e-324, 1.7976931348623157e+308)

so denormals are used.