# Creating a matrix of options using itertools

I am trying to produce a matrix of True and False values, which shows all the permutations for a given number of choices. So for 5 choices you would have the following output.

``````F F F F F
T F F F F
T T F F F
T T T F F
...
F T F F F
...
``````

I have been looking at using itertool's permutations and combinations, but these work off position and not value which results in duplicates.

I'm sure there is a standard algorithm for this problem, but I'm struggling to find its name.

-

``````itertools.product([False,True],repeat=5)
``````

example of `itertools.product([False,True],repeat=2)`:

``````(False, False)
(False, True)
(True, False)
(True, True)
``````
-
+1, thanks for reminding me about `repeat`. –  senderle Aug 12 '11 at 21:22
Accepting Fredik's answer as it uses the repeat option. –  pledge Aug 13 '11 at 15:47

You seem to want the n-dimensional cartesian product of `[False, True]`.

``````>>> print list(itertools.product(*(itertools.repeat((False, True), 3))))
[(False, False, False), (False, False, True), (False, True, False),
(False, True, True), (True, False, False), (True, False, True),
(True, True, False), (True, True, True)]
``````

Or more concisely (stealing from Frederick)

``````>>> print list(itertools.product((False, True), repeat=3))
[(False, False, False), (False, False, True), (False, True, False),
(False, True, True), (True, False, False), (True, False, True),
(True, True, False), (True, True, True)]
``````
-
Wow, that was just what I was after thanks. Please could you explain a little of what is happening there for a Python newbie? Is that * still acting as a multiplication operator? –  pledge Aug 12 '11 at 21:02
No, that unpacks the result of `itertools.repeat`. (Say you have `def foo(a, b, c)`. Then you can pass a sequence to `foo` like so `foo(*(a, b, c))` instead of passing in the args individually.) I forgot about the `repeat` keyword arg. –  senderle Aug 12 '11 at 21:20

This is the same form as the binary representation of integers between 0 to (2**n)-1. If you were inclined to such perversity, you could represent integers as zero-padded binary strings using str.format() and then coerce the string (of the form "00101") into a boolean list by doing something terrible like this:

``````>>> n = 5
>>> for i in xrange(2**n):
...     [bool(int(j)) for j in ("{0:0>%db}" % n).format(i)]
``````

`[bool(i & 2**j) for j in range(n)]` also works and don't require string formatting... –  JBernardo Aug 12 '11 at 23:31