# Is there a built-in product() in Python? [duplicate]

I've been looking through a tutorial and book but I can find no mention of a built in product function i.e. of the same type as sum(), but I could not find anything such as `prod()`.

Is the only way I could find the product of items in a list by importing the `mul()` operator?

## Pronouncement

Yes, that's right. Guido rejected the idea for a built-in prod() function because he thought it was rarely needed.

## Python 3.8 Update

In Python 3.8, prod() was added to the math module:

``````>>> from math import prod
>>> prod(range(1, 11))
3628800
``````

## Alternative with reduce()

As you suggested, it is not hard to make your own using reduce() and operator.mul():

``````def prod(iterable):
return reduce(operator.mul, iterable, 1)

>>> prod(range(1, 5))
24
``````

In Python 3, the reduce() function was moved to the functools module, so you would need to add:

``````from functools import reduce
``````

## Specific case: Factorials

As a side note, the primary motivating use case for prod() is to compute factorials. We already have support for that in the math module:

``````>>> import math

>>> math.factorial(10)
3628800
``````

## Alternative with logarithms

If your data consists of floats, you can compute a product using sum() with exponents and logarithms:

``````>>> from math import log, exp

>>> data = [1.2, 1.5, 2.5, 0.9, 14.2, 3.8]
>>> exp(sum(map(log, data)))
218.53799999999993

>>> 1.2 * 1.5 * 2.5 * 0.9 * 14.2 * 3.8
218.53799999999998
``````
• Source of the BDFL's statement: bugs.python.org/issue1093 Oct 30, 2011 at 22:23
• Of course, `prod(range(1, 5))` is more properly written `math.factorial(4)` :) Still too bad this function isn't in the `math` module either. Oct 30, 2011 at 22:24
• And of course, people who make frequent use of factorials should cache them in a list so they don't get recalculated on every call ;-) fact=[math.factorial(i) for i in range(100)] Oct 30, 2011 at 22:29
• @RaymondHettinger another fancy way is to use the memoize decorator on the factorial function wiki.python.org/moin/PythonDecoratorLibrary#Memoize Oct 31, 2011 at 3:42
• @bli in mathematical series factorials are almost everywhere. Aug 29, 2019 at 13:38

There is no `product` in Python, but you can define it as

``````def product(iterable):
return reduce(operator.mul, iterable, 1)
``````

Or, if you have NumPy, use `numpy.product`.

• Damn ok thanks for the help, is it possible to define one function inside another? Oct 30, 2011 at 22:26
• @GeorgeBurrows: yes, you can nest function definitions, though I wouldn't do that unless you're doing higher-order stuff. Oct 30, 2011 at 22:27
• Re `numpy.product`, be aware arithmetic is modular when using integer types, and no error is raised on overflow (source). Jul 3, 2014 at 12:14

Since the reduce() function has been moved to the module `functools` python 3.0, you have to take a different approach.

You can use `functools.reduce()` to access the function:

``````product = functools.reduce(operator.mul, iterable, 1)
``````

Or, if you want to follow the spirit of the python-team (which removed `reduce()` because they think `for` would be more readable), do it with a loop:

``````product = 1
for x in iterable:
product *= x
``````
• How did I not think of this ages ago? This is perfect, and Pythonic! Dec 28, 2017 at 15:24
• I wouldn't say that reduce() has been removed. It's just been moved from the list of standard functions to a module in the standard library (functools). You don't need to install anything; you'll just have to import the module. That's the same as the math library. Dec 4, 2018 at 20:54
• @BaconBits of course you are correct, thanks for pointing this out. I tried to change the wording to adress this better. Dec 11, 2018 at 21:30
``````from numpy import multiply, product
list1 = [2,2,2]
list2 = [2,2,2]
mult = 3
prod_of_lists = multiply(list1,list2)
>>>[4,4,4]
prod_of_list_by_mult = multiply(list1,mult)
>>>[6,6,6]
prod_of_single_array = product(list1)
>>>8
``````

numpy has many really cool functions for lists!

• I like that this answer points to a powerful numeric library — if the person asking the question really needs to do a product of a series of scalars for any reason other than homework, then the person probably needs to think about something like numbpy for the larger problem they're trying to solve. Oct 30, 2011 at 23:48
• I'm not sure that someone who is just starting with the Python tutorial should be pointed at numpy to solve such as simple problem. As they saying goes, "now they have two problems" :-) Once Python basics have be acquired, I do agree that numpy would we a powerful addition to the toolkit for anyone doing number crunching. Oct 31, 2011 at 21:43