# How do I use a decimal step value for range()?

How do I iterate between 0 and 1 by a step of 0.1?

This says that the step argument cannot be zero:

``````for i in range(0, 1, 0.1):
print(i)
``````
• int(0.1) == 0, so the step actually is zero. It may be unexpected, but it is zero. You might want to restate your question to reflect that fact that it's you didn't expect this. Saying "it's not" is false and misleading. Commented Jan 25, 2009 at 13:34
• BTW A short one-liner can be rolled up using `itertools.takewhile` and `itertools.count`. It isn't better than `drange` performance-wise, though.
– Kos
Commented Nov 29, 2012 at 16:15
• It's embarrassing that python's range dosen't allow this, given how easy it is to implement a generator that does this even without accumulating rounding errors. Heck, even the `seq` tool in GNU coreutils allows one to do `seq 0 0.1 1` without rounding errors! Commented Aug 20, 2016 at 5:55
• @josch: `seq` uses the C `long double` type internally, and is subject to rounding errors. For example on my machine, `seq 0 0.1 1` gives `1` as its last output (as expected), but `seq 1 0.1 2` gives `1.9` as the last output (rather than the expected `2`). Commented Oct 24, 2017 at 18:39
• For convenience, @Kos's suggestion can be implemented as `itertools.takewhile(lambda x: (x+0.05)<1, itertools.count(0,0.1))` or `itertools.islice(itertools.count(0,0.1), 10)` (after you have `import itertools`), though I haven't tested which is more efficient Commented Sep 19, 2019 at 14:13

Rather than using a decimal step directly, it's much safer to express this in terms of how many points you want. Otherwise, floating-point rounding error is likely to give you a wrong result.

Use the `linspace` function from the NumPy library (which isn't part of the standard library but is relatively easy to obtain). `linspace` takes a number of points to return, and also lets you specify whether or not to include the right endpoint:

``````>>> np.linspace(0,1,11)
array([ 0. ,  0.1,  0.2,  0.3,  0.4,  0.5,  0.6,  0.7,  0.8,  0.9,  1. ])
>>> np.linspace(0,1,10,endpoint=False)
array([ 0. ,  0.1,  0.2,  0.3,  0.4,  0.5,  0.6,  0.7,  0.8,  0.9])
``````

If you really want to use a floating-point step value, use `numpy.arange`:

``````>>> import numpy as np
>>> np.arange(0.0, 1.0, 0.1)
array([ 0. ,  0.1,  0.2,  0.3,  0.4,  0.5,  0.6,  0.7,  0.8,  0.9])
``````

Floating-point rounding error will cause problems, though. Here's a simple case where rounding error causes `arange` to produce a length-4 array when it should only produce 3 numbers:

``````>>> numpy.arange(1, 1.3, 0.1)
array([1. , 1.1, 1.2, 1.3])
``````
• numpy is such an ubiquitous component of python that I consider this answer to be the most 'pythonic' of all. Commented Sep 11, 2013 at 19:20
• @AndreTerra The problem is that @numpy@ is a third party package and adds a lot of overhead in terms of dependency-management, storage (for the package itself) etc. Depending on what the developer is doing, it may be impossible to use it. Commented May 24, 2017 at 13:56
• Pardon me, but I didn't understand the floating point rounding error in the last part since `np.linspace(1.,1.3,4)` and `np.arange(1.,1.3,0.1)` give exactly the same output Commented Oct 12, 2018 at 21:09
• @deadcode The reason is that np.arange is defined to produce a range `[start,stop)` (i.e. excluding `stop`), so one would not expect 1.3 to be included in the list. See this question for why it is still included and what to do against it. Commented Nov 16, 2018 at 12:48
• How much a package is used is arguably not any indicator of whether it is "Pythonic." Commented Feb 11, 2019 at 0:59

`range()` can only do integers, not floating point.

Use a list comprehension instead to obtain a list of steps:

``````[x * 0.1 for x in range(0, 10)]
``````

More generally, a generator comprehension minimizes memory allocations:

``````xs = (x * 0.1 for x in range(0, 10))
for x in xs:
print(x)
``````
• Even better, you could just use a generator comprehension if you're working with Python 2.4+. `(x * 0.1 for x in range(0, 10))`.
– JAB
Commented Jun 25, 2010 at 18:02
• Even better, put `x/10` instead of `x * 0.1` :D Nothing special actually, but some numbers in there will be more precise, e.g. for `3*0.1` you get `0.30000000000000004`, while for 3/10 you get `0.3` :) Commented May 26, 2012 at 18:22
• 3/10 gives me 0, not 0.3. 3/10.0 gives 0.29999999999999999. Python 2.6.
– user25148
Commented May 27, 2012 at 8:19
• @LarsWirzenius: in Python 2.2+, `from __future__ import division; 3/10` returns 0.3. This behaviour is the default in Python 3.x. Commented Sep 14, 2012 at 11:15
• round function can also be used lst = [round(x* 0.10,2) for x in range(0,10)]
– MARK
Commented Jan 30, 2014 at 8:34

Building on 'xrange([start], stop[, step])', you can define a generator that accepts and produces any type you choose (stick to types supporting `+` and `<`):

``````>>> def drange(start, stop, step):
...     r = start
...     while r < stop:
...         yield r
...         r += step
...
>>> i0=drange(0.0, 1.0, 0.1)
>>> ["%g" % x for x in i0]
['0', '0.1', '0.2', '0.3', '0.4', '0.5', '0.6', '0.7', '0.8', '0.9', '1']
>>>
``````
• This has roundoff problems. Please look here: code.activestate.com/recipes/66472 Commented Oct 12, 2009 at 20:50
• I would extend it a bit for the other direction with a (while r > stop) and a corresponding r -= step for giving the opposite direction. Commented Nov 8, 2010 at 3:59
• I did a xfrange function without the float precision problems referred above. Check it out ;) stackoverflow.com/questions/477486/… Commented Dec 12, 2013 at 17:05
• You're accumulating rounding errors. Please use this instead: ` i = 0; r = start while r < stop: i += 1; r = start + i * step; yield r` Commented Apr 11, 2016 at 11:56
• This is from pythoncentral.io/pythons-range-function-explained (and other Python documentation sources) Commented Jan 5, 2018 at 17:31

Increase the magnitude of `i` for the loop and then reduce it when you need it.

``````for i * 100 in range(0, 100, 10):
print i / 100.0
``````

EDIT: I honestly cannot remember why I thought that would work syntactically

``````for i in range(0, 11, 1):
print i / 10.0
``````

That should have the desired output.

• I think you'll find that range() works off integers, in which case this would be the only solution, using the same function atleast. Commented Jan 25, 2009 at 10:33
• @cmsjr creative :D Just one little thing: divide by 100.0 to keep Python from truncating the result if you're using Python 2.x. I think in 3.0, it'll work as you've coded it.
– Dana
Commented Jan 25, 2009 at 10:35
• `for i * 100 in range(0, 100, 10)`: SyntaxError: can't assign to operator Commented Jan 6, 2015 at 15:02

NumPy is a bit overkill, I think.

``````[p/10 for p in range(0, 10)]
[0.0, 0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9]
``````

Generally speaking, to do a step-by-`1/x` up to `y` you would do

``````x=100
y=2
[p/x for p in range(0, int(x*y))]
[0.0, 0.01, 0.02, 0.03, ..., 1.97, 1.98, 1.99]
``````

(`1/x` produced less rounding noise when I tested).

• Cleanest solution imo. List comprehension also makes it look very short and simple. Commented Mar 19, 2022 at 12:56

`scipy` has a built in function `arange` which generalizes Python's `range()` constructor to satisfy your requirement of float handling.

`from scipy import arange`

• This is actually the exact same `arange` you can find in numpy: `>>> import scipy >>> import numpy >>> numpy.arange is scipy.arange` will return `True`. Commented Jul 10, 2017 at 11:17

Similar to R's `seq` function, this one returns a sequence in any order given the correct step value. The last value is equal to the stop value.

``````def seq(start, stop, step=1):
n = int(round((stop - start)/float(step)))
if n > 1:
return([start + step*i for i in range(n+1)])
elif n == 1:
return([start])
else:
return([])
``````

### Results

``````seq(1, 5, 0.5)
``````

[1.0, 1.5, 2.0, 2.5, 3.0, 3.5, 4.0, 4.5, 5.0]

``````seq(10, 0, -1)
``````

[10, 9, 8, 7, 6, 5, 4, 3, 2, 1, 0]

``````seq(10, 0, -2)
``````

[10, 8, 6, 4, 2, 0]

``````seq(1, 1)
``````

[ 1 ]

• This is a great answer for someone who wants to get it one without getting too much into python. Commented Aug 3, 2014 at 11:40
• That was almost what I was looking for - note that `seq(0.5, 3.0)` returns `[0.5, 1.5, 2.5, 3.5]`. To avoid last entries being out-of-range, replace `n = int(round(...` with `n = int(floor(...` with the line `from math import floor` at the top (above `def seq(...`). Commented Nov 9, 2015 at 4:44
• @FriendFX Don't do this! If `floor` is used, `seq(0.2, 0.9, 0.1)` will fail to reach right endpoint and will return `[0.2, 0.30000000000000004, 0.4, 0.5, 0.6000000000000001, 0.7, 0.8]` Commented Jan 25, 2016 at 11:58
• @user502144: Nice catch, thanks. I guess I have to settle for one of the more complex solutions in order to keep it general. Commented Jan 27, 2016 at 2:33

The range() built-in function returns a sequence of integer values, I'm afraid, so you can't use it to do a decimal step.

I'd say just use a while loop:

``````i = 0.0
while i <= 1.0:
print i
i += 0.1
``````

If you're curious, Python is converting your 0.1 to 0, which is why it's telling you the argument can't be zero.

Here's a solution using itertools:

``````import itertools

def seq(start, end, step):
if step == 0:
raise ValueError("step must not be 0")
sample_count = int(abs(end - start) / step)
return itertools.islice(itertools.count(start, step), sample_count)
``````

Usage Example:

``````for i in seq(0, 1, 0.1):
print(i)
``````
• For the sake of completeness, you should calculate the absolute value for the sample_count variable, that way your function will also work for a negative start (i.e from -10 to 10) Commented Mar 18, 2015 at 12:31
``````[x * 0.1 for x in range(0, 10)]
``````

in Python 2.7x gives you the result of:

[0.0, 0.1, 0.2, 0.30000000000000004, 0.4, 0.5, 0.6000000000000001, 0.7000000000000001, 0.8, 0.9]

but if you use:

``````[ round(x * 0.1, 1) for x in range(0, 10)]
``````

gives you the desired:

[0.0, 0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9]

``````import numpy as np
for i in np.arange(0, 1, 0.1):
print i
``````

Best Solution: no rounding error

``````>>> step = .1
>>> N = 10     # number of data points
>>> [ x / pow(step, -1) for x in range(0, N + 1) ]

[0.0, 0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1.0]
``````

Or, for a set range instead of set data points (e.g. continuous function), use:

``````>>> step = .1
>>> rnge = 1     # NOTE range = 1, i.e. span of data points
>>> N = int(rnge / step
>>> [ x / pow(step,-1) for x in range(0, N + 1) ]

[0.0, 0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1.0]
``````

To implement a function: replace `x / pow(step, -1)` with `f( x / pow(step, -1) )`, and define `f`.
For example:

``````>>> import math
>>> def f(x):
return math.sin(x)

>>> step = .1
>>> rnge = 1     # NOTE range = 1, i.e. span of data points
>>> N = int(rnge / step)
>>> [ f( x / pow(step,-1) ) for x in range(0, N + 1) ]

[0.0, 0.09983341664682815, 0.19866933079506122, 0.29552020666133955, 0.3894183423086505,
0.479425538604203, 0.5646424733950354, 0.644217687237691, 0.7173560908995228,
0.7833269096274834, 0.8414709848078965]
``````

And if you do this often, you might want to save the generated list `r`

``````r=map(lambda x: x/10.0,range(0,10))
for i in r:
print i
``````

`more_itertools` is a third-party library that implements a `numeric_range` tool:

``````import more_itertools as mit

for x in mit.numeric_range(0, 1, 0.1):
print("{:.1f}".format(x))
``````

Output

``````0.0
0.1
0.2
0.3
0.4
0.5
0.6
0.7
0.8
0.9
``````

This tool also works for `Decimal` and `Fraction`.

My versions use the original range function to create multiplicative indices for the shift. This allows same syntax to the original range function. I have made two versions, one using float, and one using Decimal, because I found that in some cases I wanted to avoid the roundoff drift introduced by the floating point arithmetic.

It is consistent with empty set results as in range/xrange.

Passing only a single numeric value to either function will return the standard range output to the integer ceiling value of the input parameter (so if you gave it 5.5, it would return range(6).)

Edit: the code below is now available as package on pypi: Franges

``````## frange.py
from math import ceil
# find best range function available to version (2.7.x / 3.x.x)
try:
_xrange = xrange
except NameError:
_xrange = range

def frange(start, stop = None, step = 1):
"""frange generates a set of floating point values over the
range [start, stop) with step size step

frange([start,] stop [, step ])"""

if stop is None:
for x in _xrange(int(ceil(start))):
yield x
else:
# create a generator expression for the index values
indices = (i for i in _xrange(0, int((stop-start)/step)))
# yield results
for i in indices:
yield start + step*i

## drange.py
import decimal
from math import ceil
# find best range function available to version (2.7.x / 3.x.x)
try:
_xrange = xrange
except NameError:
_xrange = range

def drange(start, stop = None, step = 1, precision = None):
"""drange generates a set of Decimal values over the
range [start, stop) with step size step

drange([start,] stop, [step [,precision]])"""

if stop is None:
for x in _xrange(int(ceil(start))):
yield x
else:
# find precision
if precision is not None:
decimal.getcontext().prec = precision
# convert values to decimals
start = decimal.Decimal(start)
stop = decimal.Decimal(stop)
step = decimal.Decimal(step)
# create a generator expression for the index values
indices = (
i for i in _xrange(
0,
((stop-start)/step).to_integral_value()
)
)
# yield results
for i in indices:
yield float(start + step*i)

## testranges.py
import frange
import drange
list(frange.frange(0, 2, 0.5)) # [0.0, 0.5, 1.0, 1.5]
list(drange.drange(0, 2, 0.5, precision = 6)) # [0.0, 0.5, 1.0, 1.5]
list(frange.frange(3)) # [0, 1, 2]
list(frange.frange(3.5)) # [0, 1, 2, 3]
list(frange.frange(0,10, -1)) # []
``````
• How can `frange` work if stop is `None`? That part of the code doesn't even consider the step size anymore. Commented Aug 20, 2016 at 6:26
• @josch `range` has two signatures: `range(stop)`, which assumes a default `start=0, step=1`, and `range(start, stop, step)`, where no assumptions are made. `frange` reflects that. When using the `range(stop)` signature, both `frange` and `drange` start at 0 and increment by 1, so their behaviour is identical to regular `range(stop)` behaviour with stop rounded up to the nearest integer. Commented Aug 24, 2016 at 22:09

Suprised no-one has yet mentioned the recommended solution in the Python 3 docs:

• The linspace recipe shows how to implement a lazy version of range that suitable for floating point applications.

Once defined, the recipe is easy to use and does not require `numpy` or any other external libraries, but functions like `numpy.linspace()`. Note that rather than a `step` argument, the third `num` argument specifies the number of desired values, for example:

``````print(linspace(0, 10, 5))
# linspace(0, 10, 5)
print(list(linspace(0, 10, 5)))
# [0.0, 2.5, 5.0, 7.5, 10]
``````

I quote a modified version of the full Python 3 recipe from Andrew Barnert below:

``````import collections.abc
import numbers

class linspace(collections.abc.Sequence):
"""linspace(start, stop, num) -> linspace object

Return a virtual sequence of num numbers from start to stop (inclusive).

If you need a half-open range, use linspace(start, stop, num+1)[:-1].
"""
def __init__(self, start, stop, num):
if not isinstance(num, numbers.Integral) or num <= 1:
raise ValueError('num must be an integer > 1')
self.start, self.stop, self.num = start, stop, num
self.step = (stop-start)/(num-1)
def __len__(self):
return self.num
def __getitem__(self, i):
if isinstance(i, slice):
return [self[x] for x in range(*i.indices(len(self)))]
if i < 0:
i = self.num + i
if i >= self.num:
raise IndexError('linspace object index out of range')
if i == self.num-1:
return self.stop
return self.start + i*self.step
def __repr__(self):
return '{}({}, {}, {})'.format(type(self).__name__,
self.start, self.stop, self.num)
def __eq__(self, other):
if not isinstance(other, linspace):
return False
return ((self.start, self.stop, self.num) ==
(other.start, other.stop, other.num))
def __ne__(self, other):
return not self==other
def __hash__(self):
return hash((type(self), self.start, self.stop, self.num))
``````

Lots of the solutions here still had floating point errors in Python 3.6 and didnt do exactly what I personally needed.

Function below takes integers or floats, doesnt require imports and doesnt return floating point errors.

``````def frange(x, y, step):
if int(x + y + step) == (x + y + step):
r = list(range(int(x), int(y), int(step)))
else:
f = 10 ** (len(str(step)) - str(step).find('.') - 1)
rf = list(range(int(x * f), int(y * f), int(step * f)))
r = [i / f for i in rf]

return r
``````
• Nice solution of v3.9 as well. Lack of imports is good. Cheers Commented Jul 8, 2021 at 20:47
• If wanting the output list to be inclusive of the entire range, change to rf = list(range(int(x * f), int((y+step) * f), int(step * f))) Commented Jul 8, 2021 at 20:53
• This is so good, except if you can make `frange(end, start=0, step=1)` and it will work similar to `range` Commented Apr 5, 2022 at 14:05

This is my solution to get ranges with float steps.
Using this function it's not necessary to import numpy, nor install it.
I'm pretty sure that it could be improved and optimized. Feel free to do it and post it here.

``````from __future__ import division
from math import log

def xfrange(start, stop, step):

old_start = start #backup this value

digits = int(round(log(10000, 10)))+1 #get number of digits
magnitude = 10**digits
stop = int(magnitude * stop) #convert from
step = int(magnitude * step) #0.1 to 10 (e.g.)

if start == 0:
start = 10**(digits-1)
else:
start = 10**(digits)*start

data = []   #create array

#calc number of iterations
end_loop = int((stop-start)//step)
if old_start == 0:
end_loop += 1

acc = start

for i in xrange(0, end_loop):
data.append(acc/magnitude)
acc += step

return data

print xfrange(1, 2.1, 0.1)
print xfrange(0, 1.1, 0.1)
print xfrange(-1, 0.1, 0.1)
``````

The output is:

``````[1.0, 1.1, 1.2, 1.3, 1.4, 1.5, 1.6, 1.7, 1.8, 1.9, 2.0]
[0.1, 0.2, 0.3, 0.4, 0.5, 0.6, 0.7, 0.8, 0.9, 1.0, 1.1]
[-1.0, -0.9, -0.8, -0.7, -0.6, -0.5, -0.4, -0.3, -0.2, -0.1, 0.0]
``````
• There is an error with missing the last value if it is within 1 step of the stop value. i.e. xfrange(1,10,2) only does 1,3,5,7, missing 9
– Lobe
Commented May 25, 2014 at 1:39
• For reference and other readers, please compare this implementation to this stackoverflow.com/a/477610/54964. This does not seem to have big float problems. Commented Feb 12, 2015 at 12:20
• @carlosvega Can you confirm why Lobe gets his result? Commented Feb 12, 2015 at 12:30

For completeness of boutique, a functional solution:

``````def frange(a,b,s):
return [] if s > 0 and a > b or s < 0 and a < b or s==0 else [a]+frange(a+s,b,s)
``````

You can use this function:

``````def frange(start,end,step):
return map(lambda x: x*step, range(int(start*1./step),int(end*1./step)))
``````
• Doesn't seem to work correctly, e.g. `list(frange(99.8, 100.1, 0.1)) => [99.7, 99.80000000000001, 99.9]` Commented Jul 29, 2018 at 19:16
• @ShaiColeman That's general floating point rounding, not a flaw of this particular method. If you worry about this, several answers here contain workarounds; see perhaps also stackoverflow.com/questions/588004/… Commented Jul 2, 2020 at 8:38
• @tripleee , It's wrong even ignoring the rounding errors. expected: `[99.8, 99.9, 100.0]` actual: `[99.7, 99.8, 99.9]` Commented Oct 15, 2020 at 12:05

It can be done using Numpy library. arange() function allows steps in float. But, it returns a numpy array which can be converted to list using tolist() for our convenience.

``````for i in np.arange(0, 1, 0.1).tolist():
print i
``````

start and stop are inclusive rather than one or the other (usually stop is excluded) and without imports, and using generators

``````def rangef(start, stop, step, fround=5):
"""
Yields sequence of numbers from start (inclusive) to stop (inclusive)
by step (increment) with rounding set to n digits.

:param start: start of sequence
:param stop: end of sequence
:param step: int or float increment (e.g. 1 or 0.001)
:param fround: float rounding, n decimal places
:return:
"""
try:
i = 0
while stop >= start and step > 0:
if i==0:
yield start
elif start >= stop:
yield stop
elif start < stop:
if start == 0:
yield 0
if start != 0:
yield start
i += 1
start += step
start = round(start, fround)
else:
pass
except TypeError as e:
yield "type-error({})".format(e)
else:
pass

# passing
print(list(rangef(-100.0,10.0,1)))
print(list(rangef(-100,0,0.5)))
print(list(rangef(-1,1,0.2)))
print(list(rangef(-1,1,0.1)))
print(list(rangef(-1,1,0.05)))
print(list(rangef(-1,1,0.02)))
print(list(rangef(-1,1,0.01)))
print(list(rangef(-1,1,0.005)))
# failing: type-error:
print(list(rangef("1","10","1")))
print(list(rangef(1,10,"1")))
``````

Python 3.6.2 (v3.6.2:5fd33b5, Jul 8 2017, 04:57:36) [MSC v.1900 64 bit (AMD64)]

I know I'm late to the party here, but here's a trivial generator solution that's working in 3.6:

``````def floatRange(*args):
start, step = 0, 1
if len(args) == 1:
stop = args[0]
elif len(args) == 2:
start, stop = args[0], args[1]
elif len(args) == 3:
start, stop, step = args[0], args[1], args[2]
else:
raise TypeError("floatRange accepts 1, 2, or 3 arguments. ({0} given)".format(len(args)))
for num in start, step, stop:
if not isinstance(num, (int, float)):
raise TypeError("floatRange only accepts float and integer arguments. ({0} : {1} given)".format(type(num), str(num)))
for x in range(int((stop-start)/step)):
yield start + (x * step)
return
``````

then you can call it just like the original `range()`... there's no error handling, but let me know if there is an error that can be reasonably caught, and I'll update. or you can update it. this is StackOverflow.

• As a warning, this solution doesn't implement the `__contains__` operator, and depending on your use case, it could be very VERY slow to call `if x in list(floatRange(a,b,c)):...` Commented Jan 12, 2021 at 17:47

To counter the float precision issues, you could use the `Decimal` module.

This demands an extra effort of converting to `Decimal` from `int` or `float` while writing the code, but you can instead pass `str` and modify the function if that sort of convenience is indeed necessary.

``````from decimal import Decimal

def decimal_range(*args):

zero, one = Decimal('0'), Decimal('1')

if len(args) == 1:
start, stop, step = zero, args[0], one
elif len(args) == 2:
start, stop, step = args + (one,)
elif len(args) == 3:
start, stop, step = args
else:
raise ValueError('Expected 1 or 2 arguments, got %s' % len(args))

if not all([type(arg) == Decimal for arg in (start, stop, step)]):
raise ValueError('Arguments must be passed as <type: Decimal>')

if (start == stop) or (start > stop and step >= zero) or \
(start < stop and step <= zero):
return []

current = start
while abs(current) < abs(stop):
yield current
current += step
``````

Sample outputs -

``````from decimal import Decimal as D

list(decimal_range(D('2')))
# [Decimal('0'), Decimal('1')]
list(decimal_range(D('2'), D('4.5')))
# [Decimal('2'), Decimal('3'), Decimal('4')]
list(decimal_range(D('2'), D('4.5'), D('0.5')))
# [Decimal('2'), Decimal('2.5'), Decimal('3.0'), Decimal('3.5'), Decimal('4.0')]
list(decimal_range(D('2'), D('4.5'), D('-0.5')))
# []
list(decimal_range(D('2'), D('-4.5'), D('-0.5')))
# [Decimal('2'),
#  Decimal('1.5'),
#  Decimal('1.0'),
#  Decimal('0.5'),
#  Decimal('0.0'),
#  Decimal('-0.5'),
#  Decimal('-1.0'),
#  Decimal('-1.5'),
#  Decimal('-2.0'),
#  Decimal('-2.5'),
#  Decimal('-3.0'),
#  Decimal('-3.5'),
#  Decimal('-4.0')]
``````
• WIth similar `Decimal` inputs, `np.arange` works the same: `np.arange(Decimal('-2.0'), Decimal('2.0'), Decimal('0.1'))` Commented Apr 24, 2018 at 16:35
• Yep, thanks. Although, that would need an external (numpy) lib. Commented Apr 24, 2018 at 21:14
• I'd appreciate if you can provide feedback or reason for the downvote. Commented Aug 2, 2020 at 11:59
• Questions about downvotes are pointless, since voters aren't notified, and hance rarely see them. I was notified based on a 2 year old comment. Commented Aug 2, 2020 at 15:07
• Sorry to ping you, hoped it won't since I didn't tag. And yeah, my comment was just hopeful. Commented Aug 2, 2020 at 15:28

Add auto-correction for the possibility of an incorrect sign on step:

``````def frange(start,step,stop):
step *= 2*((stop>start)^(step<0))-1
return [start+i*step for i in range(int((stop-start)/step))]
``````

My solution:

``````def seq(start, stop, step=1, digit=0):
x = float(start)
v = []
while x <= stop:
v.append(round(x,digit))
x += step
return v
``````

Here is my solution which works fine with float_range(-1, 0, 0.01) and works without floating point representation errors. It is not very fast, but works fine:

``````from decimal import Decimal

def get_multiplier(_from, _to, step):
digits = []
for number in [_from, _to, step]:
pre = Decimal(str(number)) % 1
digit = len(str(pre)) - 2
digits.append(digit)
max_digits = max(digits)
return float(10 ** (max_digits))

def float_range(_from, _to, step, include=False):
"""Generates a range list of floating point values over the Range [start, stop]
with step size step
include=True - allows to include right value to if possible
!! Works fine with floating point representation !!
"""
mult = get_multiplier(_from, _to, step)
# print mult
int_from = int(round(_from * mult))
int_to = int(round(_to * mult))
int_step = int(round(step * mult))
# print int_from,int_to,int_step
if include:
result = range(int_from, int_to + int_step, int_step)
result = [r for r in result if r <= int_to]
else:
result = range(int_from, int_to, int_step)
# print result
float_result = [r / mult for r in result]
return float_result

print float_range(-1, 0, 0.01,include=False)

assert float_range(1.01, 2.06, 5.05 % 1, True) ==\
[1.01, 1.06, 1.11, 1.16, 1.21, 1.26, 1.31, 1.36, 1.41, 1.46, 1.51, 1.56, 1.61, 1.66, 1.71, 1.76, 1.81, 1.86, 1.91, 1.96, 2.01, 2.06]

assert float_range(1.01, 2.06, 5.05 % 1, False)==\
[1.01, 1.06, 1.11, 1.16, 1.21, 1.26, 1.31, 1.36, 1.41, 1.46, 1.51, 1.56, 1.61, 1.66, 1.71, 1.76, 1.81, 1.86, 1.91, 1.96, 2.01]
``````

I am only a beginner, but I had the same problem, when simulating some calculations. Here is how I attempted to work this out, which seems to be working with decimal steps.

I am also quite lazy and so I found it hard to write my own range function.

Basically what I did is changed my `xrange(0.0, 1.0, 0.01)` to `xrange(0, 100, 1)` and used the division by `100.0` inside the loop. I was also concerned, if there will be rounding mistakes. So I decided to test, whether there are any. Now I heard, that if for example `0.01` from a calculation isn't exactly the float `0.01` comparing them should return False (if I am wrong, please let me know).

So I decided to test if my solution will work for my range by running a short test:

``````for d100 in xrange(0, 100, 1):
d = d100 / 100.0
fl = float("0.00"[:4 - len(str(d100))] + str(d100))
print d, "=", fl , d == fl
``````

And it printed True for each.

Now, if I'm getting it totally wrong, please let me know.

The trick to avoid round-off problem is to use a separate number to move through the range, that starts and half the step ahead of start.

``````# floating point range
def frange(a, b, stp=1.0):
i = a+stp/2.0
while i<b:
yield a
a += stp
i += stp
``````

Alternatively, `numpy.arange` can be used.

My answer is similar to others using map(), without need of NumPy, and without using lambda (though you could). To get a list of float values from 0.0 to t_max in steps of dt:

``````def xdt(n):
return dt*float(n)
tlist  = map(xdt, range(int(t_max/dt)+1))
``````