I want a to be rounded to 13.95. I tried using round, but I get:

>>> a
>>> round(a, 2)

For the analogous issue with the standard library Decimal class, see How can I format a decimal to always show 2 decimal places?.

  • 13
    Hmm... Are you trying to represent currency? If so, you should not be using floats for dollars. You could probably use floats for pennies, or whatever the smallest common unit of currency you're trying to model happens to be, but the best practice is to use a decimal representation, as HUAGHAGUAH suggested in his answer. Commented Apr 13, 2009 at 3:39
  • 92
    It is important not to represent currency in float. Floats are not precise. But penny or cent amounts are integers. Therefore integers are the correct way of representing currency. Commented Jul 15, 2012 at 22:44
  • 6
    @Basic, it depends(mostly no). Using integers in cents, or pennies is fool prove. Its the industry standard of representing money. If you know what you are doing, have a sound understanding of floating point arithmetic and python's decimal class, you might use decimal. But it depends much of your problem. Do you need arbitrary precision decimals? Or only two digits? If two digits: integer. It keeps you out of trouble. Source I worked in a software consultancy for banking. Commented Apr 17, 2014 at 17:56
  • 36
    I'm coming probably too late here, but I wanted to ask, have the developers of Python solved this problem? Because when I do round(13.949999999999999, 2), I simply get 13.95. I've tried it in Python 2.7.6, as well as 3.4. It works. Not sure if 2.7 even was there in 2009. Maybe it's a Python 2.5 thing? Commented Sep 22, 2015 at 5:51
  • 10
    @bad_keypoints: Yes, the rounding problem has been solved by by Python 2.7.0+. More in my answer here
    – hynekcer
    Commented Jul 29, 2016 at 17:55

36 Answers 36


You are running into the old problem with floating point numbers that not all numbers can be represented exactly. The command line is just showing you the full floating point form from memory.

With floating point representation, your rounded version is the same number. Since computers are binary, they store floating point numbers as an integer and then divide it by a power of two so 13.95 will be represented in a similar fashion to 125650429603636838/(2**53).

Double precision numbers have 53 bits (16 digits) of precision and regular floats have 24 bits (8 digits) of precision. The floating point type in Python uses double precision to store the values.

For example,

>>> 125650429603636838/(2**53)

>>> 234042163/(2**24)

>>> a = 13.946
>>> print(a)
>>> print("%.2f" % a)
>>> round(a,2)
>>> print("%.2f" % round(a, 2))
>>> print("{:.2f}".format(a))
>>> print("{:.2f}".format(round(a, 2)))
>>> print("{:.15f}".format(round(a, 2)))

If you are after only two decimal places (to display a currency value, for example), then you have a couple of better choices:

  1. Use integers and store values in cents, not dollars and then divide by 100 to convert to dollars.
  2. Or use a fixed point number like decimal.
  • 44
    @Christian There's a fundamental difference between the value stored and how you display that value. Formatting the output should allow you to add padding as required, as well as adding comma separators, etc.
    – Basic
    Commented Apr 8, 2013 at 11:03
  • 31
    worth mention that "%.2f" % round(a,2) you can put in not only in printf, but also in such things like str()
    – andilabs
    Commented Nov 1, 2013 at 1:15
  • 32
    why is it that people always assume currency on floating-point rounding? sometimes you just want to work with less precision.
    – worc
    Commented Jan 11, 2014 at 23:56
  • 11
    @radtek: You need to understand that the binary value (of type float) is just the closest available approximation of the decimal number (that you are familiar with as a human being). There is no such (finitely representable) binary value as 0.245. It simply does not exist, and mathematically cannot exist. The binary value which is closest to 0.245 is slightly less than 0.245, so naturally it rounds down. Likewise, there is no such thing as 0.225 in binary, but the binary value which is closest to 0.225 is slightly greater than 0.225, so naturally it rounds up.
    – John Y
    Commented Jun 14, 2016 at 19:06
  • 18
    @radtek: You did literally ask for an explanation. The most straightforward solution is indeed to use Decimal, and that was one of the solutions presented in this answer. The other was to convert your quantities to integer and use integer arithmetic. Both of these approaches also appeared in other answers and comments.
    – John Y
    Commented Jun 15, 2016 at 19:45

There are new format specifications, String Format Specification Mini-Language:

You can do the same as:


Note 1: the above returns a string. In order to get as float, simply wrap with float(...):


Note 2: wrapping with float() doesn't change anything:

>>> x = 13.949999999999999999
>>> x
>>> g = float("{:.2f}".format(x))
>>> g
>>> x == g
>>> h = round(x, 2)
>>> h
>>> x == h
  • 28
    to add commas as well you can '{0:,.2f}'.format(1333.949999999) which prints '1,333.95'. Commented Jun 20, 2014 at 2:41
  • @OnurYıldırım: yes, but you can wrap it with float(); float("{0:.2f}".format(13.9499999)) Commented Aug 17, 2014 at 13:22
  • 5
    @JossefHarush you can wrap it with float(), but you haven't gained anything. Now you have a float again, with all the same imprecision. 13.9499999999999 and 13.95 are the same float. Commented Aug 17, 2014 at 13:52
  • 4
    @NedBatchelder: i agree that they are equal, but this limits the float to two decimal points :) Commented Aug 17, 2014 at 14:09
  • 56
    By the way, since Python 3.6 we can use f-strings: f"Result is {result:.2f}" Commented Feb 20, 2019 at 12:54

The built-in round() works just fine in Python 2.7 or later.


>>> round(14.22222223, 2)

Check out the documentation.

  • 1
    So am I to understand that this is a Python 2.7 fail? Why would such a fundamental function yield different results from v 2.7 to v 3?
    – Michael M
    Commented Sep 2, 2017 at 23:50
  • 1
    but round(2.16, 1) give 2.2 why python just offer a truncate func
    – jiamo
    Commented Jan 8, 2018 at 3:31
  • 2
    For example, if you try to round the value 2.675 to two decimal places, you get this >>> round(2.675, 2) 2.67 docs.python.org/2/tutorial/floatingpoint.html Commented Nov 6, 2018 at 17:41
  • 10
    From Python 3 documentation page: Note The behavior of round() for floats can be surprising: for example, round(2.675, 2) gives 2.67 instead of the expected 2.68. This is not a bug: it’s a result of the fact that most decimal fractions can’t be represented exactly as a float. Commented May 18, 2019 at 22:14
  • 3
    Note that if you try to use this method to print out a number such as 1.00000 it will only print out 1.0, regardless of how many decimal points you specify. Commented Aug 3, 2019 at 16:36

Let me give an example in Python 3.6's f-string/template-string format, which I think is beautifully neat:

>>> f'{a:.2f}'

It works well with longer examples too, with operators and not needing parentheses:

>>> print(f'Completed in {time.time() - start:.2f}s')
  • All these solutions are converting the number into string after format. How to keep the number as float after format ?
    – NKM
    Commented Dec 22, 2023 at 3:53

I feel that the simplest approach is to use the format() function.

For example:

a = 13.949999999999999
format(a, '.2f')


This produces a float number as a string rounded to two decimal points.


Most numbers cannot be exactly represented in floats. If you want to round the number because that's what your mathematical formula or algorithm requires, then you want to use round. If you just want to restrict the display to a certain precision, then don't even use round and just format it as that string. (If you want to display it with some alternate rounding method, and there are tons, then you need to mix the two approaches.)

>>> "%.2f" % 3.14159
>>> "%.2f" % 13.9499999

And lastly, though perhaps most importantly, if you want exact math then you don't want floats at all. The usual example is dealing with money and to store 'cents' as an integer.




instead of


Because the latter may lead to output errors when trying to output multiple variables (see comments).

  • 1
    I mean, print"{0:.2f} {0:.2f}".format(a, b) will lead to mistake in output - it will output 'a' value twice. While print"{:.2f} {:.2f}".format(a, b) will output 'a' and 'b' values. Commented Feb 1, 2018 at 17:30
  • 2
    For Python 3, you just need to add brackets print(...). And within them all I wrote is right. Commented Feb 1, 2018 at 17:31
  • 3
    You would be after print("{0:.2f} {1:.2f}".format(a, b)) if you have two variables
    – Hovo
    Commented Feb 10, 2018 at 23:12


The rounding problem of input and output has been solved definitively by Python 3.1 and the fix is backported also to Python 2.7.0.

Rounded numbers can be reversibly converted between float and string back and forth:
str -> float() -> repr() -> float() ... or Decimal -> float -> str -> Decimal

>>> 0.3
>>> float(repr(0.3)) == 0.3

A Decimal type is not necessary for storage anymore.

Results of arithmetic operations must be rounded again because rounding errors could accumulate more inaccuracy than that is possible after parsing one number. That is not fixed by the improved repr() algorithm (Python >= 3.1, >= 2.7.0):

>>> 0.1 + 0.2
>>> 0.1, 0.2, 0.3
(0.1, 0.2, 0.3)

The output string function str(float(...)) was rounded to 12 valid digits in Python < 2.7x and < 3.1, to prevent excessive invalid digits similar to unfixed repr() output. That was still insufficientl after subtraction of very similar numbers and it was too much rounded after other operations. Python 2.7 and 3.1 use the same length of str() although the repr() is fixed. Some old versions of Numpy had also excessive invalid digits, even with fixed Python. The current Numpy is fixed. Python versions >= 3.2 have the same results of str() and repr() function and also output of similar functions in Numpy.


import random
from decimal import Decimal
for _ in range(1000000):
    x = random.random()
    assert x == float(repr(x)) == float(Decimal(repr(x)))  # Reversible repr()
    assert str(x) == repr(x)
    assert len(repr(round(x, 12))) <= 14         # no excessive decimal places.


See the Release notes Python 2.7 - Other Language Changes the fourth paragraph:

Conversions between floating-point numbers and strings are now correctly rounded on most platforms. These conversions occur in many different places: str() on floats and complex numbers; the float and complex constructors; numeric formatting; serializing and de-serializing floats and complex numbers using the marshal, pickle and json modules; parsing of float and imaginary literals in Python code; and Decimal-to-float conversion.

Related to this, the repr() of a floating-point number x now returns a result based on the shortest decimal string that’s guaranteed to round back to x under correct rounding (with round-half-to-even rounding mode). Previously it gave a string based on rounding x to 17 decimal digits.

The related issue

More information: The formatting of float before Python 2.7 was similar to the current numpy.float64. Both types use the same 64 bit IEEE 754 double precision with 52 bit mantissa. A big difference is that np.float64.__repr__ is formatted frequently with an excessive decimal number so that no bit can be lost, but no valid IEEE 754 number exists between 13.949999999999999 and 13.950000000000001. The result is not nice and the conversion repr(float(number_as_string)) is not reversible with numpy. On the other hand: float.__repr__ is formatted so that every digit is important; the sequence is without gaps and the conversion is reversible. Simply: If you perhaps have a numpy.float64 number, convert it to normal float in order to be formatted for humans, not for numeric processors, otherwise nothing more is necessary with Python 2.7+.

  • Why downvoted? The question was about Python float (double precision) and normal round, not about numpy.double and its conversion to string. Plain Python rounding really can not be done better than in Python 2.7. The most of answers has been written before 2.7, but they are obsoleted, though they were very good originally. This is the reason of my answer.
    – hynekcer
    Commented Apr 15, 2016 at 11:02
  • 53 bits when you include the "hidden bit", which is implicitly 1, except during "gradual underflow".
    – Rick James
    Commented May 17, 2017 at 4:16
  • It's not round's fault, it's the display fault.
    – Rick James
    Commented May 17, 2017 at 4:22
  • Yes, it's well known. I miss however a context if you object to something in Python 2.7 Release notes or in my text or to nothing at all. It is more complicated than was necessary the purpose of this question. It should be added that also conversion from string to float has been fixed in Python 2.7 due to rounding bug on certain 32-bit Intel chips and that "The round() function is also now correctly rounded." (Release notes - 3.1 features backported to 2.7). Can you agree?
    – hynekcer
    Commented May 17, 2017 at 9:26
  • 1
    Oops, that was a*b vs b*a. Thanks for the links -- Nostalgia.
    – Rick James
    Commented May 17, 2017 at 20:11

Try the code below:

>>> a = 0.99334
>>> a = int((a * 100) + 0.5) / 100.0 # Adding 0.5 rounds it up
>>> print a
  • But be cautioned, value of a is still an imprecise float. Take a look here - repl.it/LJs (Click "Run Session" on the top of the Right section). Commented Oct 2, 2013 at 19:23
  • 3
    If you go with this approach, you should add a 0.5 for a more accurate representation. int(a * 100 + 0.5) / 100.0 ; Using math.ceil is another option.
    – arhuaco
    Commented Nov 8, 2013 at 0:11
  • 3
    @ShashankSawant: Well, for one thing, the answer as presented does not round, it truncates. The suggestion to add half at the end will round, but then there is no benefit to doing this over just using the round function in the first place. For another thing, because this solution still uses floating point, the OP's original problem remains, even for the "corrected" version of this "solution".
    – John Y
    Commented Jun 17, 2014 at 22:54
  • 3
    -1, this is just an unnecessary reimplementation of the round function (which was used in the question).
    – interjay
    Commented Sep 12, 2014 at 22:55
  • 5
    @interjay which is necessary if the round() doesn't work as the OP mentioned.
    – Pithikos
    Commented Feb 18, 2015 at 13:28


float_number = 12.234325335563
round(float_number, 2)

This will return;



The round function takes two arguments; The number to be rounded and the number of decimal places to be returned. Here I returned two decimal places.

  • 2
    But how did you get an additional 0 to show up if we have say, 0.093. This is giving me 0.1 as the answer
    – Naman Jain
    Commented Nov 25, 2020 at 0:40
  • If you return 2 decimal places or in general 1 place more than the number of zeroes present in the decimal part on left side, then you will get the correct result as you want.e.g, if you apply simply my answer to the number 0.093, it will return 0.09 but if you want to get only 1 decimal place, then of course, it will return 0.1 as 0.0 is completely wrong.(and my code works in the same way. Maybe you want to get only 1 decimal place. If you want to get more accurate results, you must have to increase the number of decimal places.)
    – Irfan wani
    Commented Nov 25, 2020 at 9:53
  • It's not true that it will return decimal, according to the documentation ` The return value is an integer if ndigits is omitted or None. Otherwise the return value has the same type as the number. ndigits may be negative.`
    – Arar
    Commented Mar 9, 2021 at 1:53
  • All these bogus up votes. Your answer just repeats the code the OP posted when asking the question a decade ago. The OP knows the round function. You didn't solve his problem with it at all. (The problem doesn't even exist today.)
    – aamarks
    Commented Jun 29, 2021 at 17:25
  • This doesn't work for larger numbers. Round doesn't behave like what people want. We want a decimal format not a round. 99.9999999987 should not turn into 100 it should be 99.99. That is the issue people want resolved. Simple small math is a no brainer.
    – Eric
    Commented Dec 9, 2021 at 13:45

You can modify the output format:

>>> a = 13.95
>>> a
>>> print "%.2f" % a

With Python < 3 (e.g. 2.6 or 2.7), there are two ways to do so.

# Option one 
older_method_string = "%.9f" % numvar

# Option two (note ':' before the '.9f')
newer_method_string = "{:.9f}".format(numvar)

But note that for Python versions above 3 (e.g. 3.2 or 3.3), option two is preferred.

For more information on option two, I suggest this link on string formatting from the Python documentation.

And for more information on option one, this link will suffice and has information on the various flags.

Reference: Convert floating point number to a certain precision, and then copy to string

  • How do you represent an integer? If I use "{i3}".format(numvar) I get an error.
    – skytux
    Commented Dec 12, 2013 at 15:29
  • This is what I mean: If numvar=12.456, then "{:.2f}".format(numvar) yields 12.46 but "{:2i}".format(numvar) gives an error and I'm expecting 12.
    – skytux
    Commented Dec 12, 2013 at 15:47

You can use format operator for rounding the value up to two decimal places in Python:

print(format(14.4499923, '.2f')) // The output is 14.45
  • 6
    This returns string
    – Jemshit
    Commented Mar 22, 2019 at 19:15
  • if we just want to truncate, how to get that. Commented May 24, 2021 at 23:19
  • Operator? Isn't it a function? Commented Sep 29, 2022 at 21:00

As Matt pointed out, Python 3.6 provides f-strings, and they can also use nested parameters:

value = 2.34558
precision = 2
width = 4

print(f'result: {value:{width}.{precision}f}')

which will display result: 2.35


In Python 2.7:

a = 13.949999999999999
output = float("%0.2f"%a)
print output
  • 1
    This doesn't help at all. output has the exact same value as a, so you might as well have written print a instead of print output in the last line. Commented May 26, 2018 at 6:12
  • @MarkDickinson Could you please try again. Because It is running as expected in my compiler. Commented Sep 23, 2018 at 8:07
  • 1
    You're missing my point. Yes, your code prints 13.95. But so does print a, for this particular value of a, in Python 2.7, so it's not really clear what the point of the formatting step was. Commented Sep 23, 2018 at 11:13
  • @MarkDickinson I have edited the code. I agree that 'print a' does print the same value as "print output". But if you compare "a==output", the result will be "False" because formatting step does round off the floating value "a" to two decimal points. Commented Sep 23, 2018 at 11:45
  • 1
    Did you actually try a == output for the code you show? It gives True for me, and I suspect it does for you, too. Commented Sep 23, 2018 at 11:46

We multiple options to do that:

Option 1:

x = 1.090675765757
g = float("{:.2f}".format(x))

Option 2: The built-in round() supports Python 2.7 or later.

x = 1.090675765757
g = round(x, 2)
  • 2
    The question specifically says that the round method does not do what he wants. Check this answer for more info on why is that Commented Oct 5, 2020 at 1:43

The Python tutorial has an appendix called Floating Point Arithmetic: Issues and Limitations. Read it. It explains what is happening and why Python is doing its best. It has even an example that matches yours. Let me quote a bit:

>>> 0.1

you may be tempted to use the round() function to chop it back to the single digit you expect. But that makes no difference:

>>> round(0.1, 1)

The problem is that the binary floating-point value stored for “0.1” was already the best possible binary approximation to 1/10, so trying to round it again can’t make it better: it was already as good as it gets.

Another consequence is that since 0.1 is not exactly 1/10, summing ten values of 0.1 may not yield exactly 1.0, either:

>>> sum = 0.0
>>> for i in range(10):
...     sum += 0.1
>>> sum

One alternative and solution to your problems would be using the decimal module.


Use combination of Decimal object and round() method.

Python 3.7.3
>>> from decimal import Decimal
>>> d1 = Decimal (13.949999999999999) # define a Decimal
>>> d1 
>>> d2 = round(d1, 2) # round to 2 decimals
>>> d2

For Raw Python:

For float to string converted 2 decimal points:

a = 13.949999999999999
format(a, '.2f')

For float to float converted 2 decimal points:

a = 13.949999999999999
round(float(a), 2)
float(format(a, '.2f'))
  • round() works fine - it keeps the number as float (does not format into string)
    – NKM
    Commented Dec 22, 2023 at 3:55

It's doing exactly what you told it to do and is working correctly. Read more about floating point confusion and maybe try decimal objects instead.

from decimal import Decimal

def round_float(v, ndigits=2, rt_str=False):
    d = Decimal(v)
    v_str = ("{0:.%sf}" % ndigits).format(round(d, ndigits))
    if rt_str:
        return v_str
    return Decimal(v_str)


Python 3.6.1 (default, Dec 11 2018, 17:41:10)
>>> round_float(3.1415926)
>>> round_float(3.1445926)
>>> round_float(3.1455926)
>>> round_float(3.1455926, rt_str=True)
>>> str(round_float(3.1455926))
  • Instead of Decimal can we return float? like: def round_float(v, ndigits=2) -> float: d = Decimal(v); v_str = ("{0:.%sf}" % ndigits).format(round(d, ndigits)); return float(v_str)
    – alper
    Commented Jul 18, 2021 at 10:01
  • @alper you can return whatever you prefer to
    – weaming
    Commented Jul 19, 2021 at 16:54

Use a lambda function like this:

arred = lambda x,n : x*(10**n)//1/(10**n)

This way you could just do:

arred(3.141591657, 2)

and get

  • What is "arred" for? Is it a Portuguese word? Commented Sep 29, 2022 at 20:58
  • @PeterMortensen just a name for the function, which could just as easily be written with def. Creating a lambda here is really just showing off for no particular gain. Commented Sep 29, 2022 at 20:59
  • @PeterMortensen arred is short for "arredondamento", which is "rounding" in portuguese Commented Oct 9, 2022 at 23:04
  • @Karl Knechtel if you use 'lambda' you get the same result with less lines of code.This is why I prefer using it (whenever possible) instead of 'def' Commented Oct 21, 2022 at 15:20

It's simple like:

  1. use decimal module for fast correctly-rounded decimal floating point arithmetic:

     d = Decimal(10000000.0000009)

    to achieve rounding:


    will result with Decimal('10000000.00')

  2. make the above DRY:

    def round_decimal(number, exponent='0.01'):
        decimal_value = Decimal(number)
        return decimal_value.quantize(Decimal(exponent))


    def round_decimal(number, decimal_places=2):
        decimal_value = Decimal(number)
        return decimal_value.quantize(Decimal(10) ** -decimal_places)

PS: critique of others: formatting is not rounding.


The simple solution is here

value = 5.34343
rounded_value = round(value, 2) # 5.34
  • 2
    There's a lot of unnecessary stuff here. 8/3 is already of type float, so the float call does nothing useful. And calling dunder methods directly is a bit odd - instead, simply call the function that delegates to those dunder methods. So a better way to spell the first line is simply value = round(8/3, 2). And at that point you're not really adding anything that isn't already in other answers. Commented Feb 19, 2022 at 19:03
  • Sorry for the irrelevant answer. I thought it is the correct method. Also, In the question section, he mentioned that the round method was not working and so I didn't check it. Commented Feb 19, 2022 at 20:41
orig_float = 232569 / 16000.0


short_float = float("{:.2f}".format(orig_float)) 



For fixing the floating point in type-dynamic languages such as Python and JavaScript, I use this technique

# For example:
a = 70000
b = 0.14
c = a * b

print c # Prints 980.0000000002
# Try to fix
c = int(c * 10000)/100000
print c # Prints 980

You can also use Decimal as following:

from decimal import *
getcontext().prec = 6
Decimal(1) / Decimal(7)
# Results in 6 precision -> Decimal('0.142857')

getcontext().prec = 28
Decimal(1) / Decimal(7)
# Results in 28 precision -> Decimal('0.1428571428571428571428571429')
  • 1
    getcontext().prec = 6 works for just the scope of the function or all places? Commented Oct 4, 2017 at 20:12
  • 1
    Contexts are environments for arithmetic operations. They govern precision, set rules for rounding, determine which signals are treated as exceptions, and limit the range for exponents. Each thread has its own current context @JulioMarins
    – Siamand
    Commented Oct 4, 2017 at 20:32

Here is the simple solution using the format function.

float(format(num, '.2f'))

Note: We are converting numbers to float, because the format method is returning a string.


If you want to handle money, use the Python decimal module:

from decimal import Decimal, ROUND_HALF_UP

# 'amount' can be integer, string, tuple, float, or another Decimal object
def to_money(amount) -> Decimal:
    money = Decimal(amount).quantize(Decimal('.00'), rounding=ROUND_HALF_UP)
    return money
  • I tried to use this with a column of a DateFrame. got the message: TypeError: conversion from Series to Decimal is not supported Commented Feb 5, 2022 at 16:35
lambda x, n:int(x*10^n + 0.5)/10^n

has worked for me for many years in many languages.

  • seems like two '*' in a row disappears.
    – Ray Tayek
    Commented Feb 6, 2022 at 21:28

To round a number to a resolution, the best way is the following one, which can work with any resolution (0.01 for two decimals or even other steps):

>>> import numpy as np
>>> value = 13.949999999999999
>>> resolution = 0.01
>>> newValue = int(np.round(value/resolution))*resolution
>>> print newValue

>>> resolution = 0.5
>>> newValue = int(np.round(value/resolution))*resolution
>>> print newValue
  • doesn't work for me on python 3.4.3 and numpy 1.9.1 ? >>> import numpy as np >>> res = 0.01 >>> value = 0.184 >>> np.round(value/res) * res 0.17999999999999999
    – szeitlin
    Commented Apr 11, 2016 at 16:34
  • 1
    Looking for documentation I see the problem comes from numpy.round accuracy/precision. So it requires to define it as int before multiplication with resolution. I updated the code. Thank you for that!
    – iblasi
    Commented Apr 13, 2016 at 16:28
  • The only necessary is to convert numpy.float64 result of np.round to float or simply to use round(value, 2). No valid IEEE 754 number exists between 13.949999999999999 (= 1395 / 100.) and 3.950000000000001 (= 1395 * .01). Why do you think that your method is the best? The original value 13.949999999999999289 (= value = round(value, 2)) is even more exact than your 13.95000000000000178 (printed by np.float96). More info also for numpy is now added to my answer that you probably downvoted by mistake. It wasn't about numpy originally.
    – hynekcer
    Commented Apr 15, 2016 at 13:04
  • @hynekcer I do not think that my answer is the best. Just wanted to add an example of limit float to n decimals but the nearest of a defined resolution. I checked as you said, that instead of intyou can also use floatfor @szeitlin example. Thank you for your extra comment. (Sorry but I did not downvote you)
    – iblasi
    Commented Apr 15, 2016 at 20:49
  • Adding whole new dependency for numeric processing (pandas) is the "best way"?
    – Hejazzman
    Commented Apr 18, 2019 at 14:13