8

I'm just working on Project Euler problem 12, so I need to do some testing against numbers that are multiples of over 500 unique factors.

I figured that the array [1, 2, 3... 500] would be a good starting point, since the product of that array is the lowest possible such number. However, numpy.prod() returns zero for this array. I'm sure I'm missing something obvious, but what the hell is it?

>>> import numpy as np
>>> array = []
>>> for i in range(1,100):
...   array.append(i)
... 
>>> np.prod(array)
0
>>> array.append(501)
>>> np.prod(array)
0
>>> array.append(5320934)
>>> np.prod(array)
0
  • 2
    Uhoh... numpy overflow ... – wim Aug 22 '16 at 22:27
  • 1
    I seem to recall that Python int is variable number of bits or at the very least greater than 64 bits integers. So maybe try using a normal Python list with Python int datatype (slower and uses more memory but should fix your issue). – Trevor Boyd Smith Aug 22 '16 at 22:32
  • Related question - why does np.array(array, dtype=np.object_).prod() not work here either? – Eric Aug 23 '16 at 3:01
  • "since the product of that array is the lowest possible such number" You might want to rethink this. The actual solution is much smaller than factorial(500). – Mark Dickinson Aug 23 '16 at 8:03
  • 1
    Already with the product of 8 different prime numbers you will get 512 different factors. – LutzL Aug 23 '16 at 11:42
6

Note that Python uses "unlimited" integers, but in numpy everything is typed, and so it is a "C"-style (probably 64-bit) integer here. You're probably experiencing an overflow.

If you look at the documentation for numpy.prod, you can see the dtype parameter:

The type of the returned array, as well as of the accumulator in which the elements are multiplied.

There are a few things you can do:

  1. Drop back to Python, and multiply using its "unlimited integers" (see this question for how to do so).

  2. Consider whether you actually need to find the product of such huge numbers. Often, when you're working with the product of very small or very large numbers, you switch to sums of logarithms. As @WarrenWeckesser notes, this is obviously imprecise (it's not like taking the exponent at the end will give you the exact solution) - rather, it's used to gauge whether one product is growing faster than another.

  • 2
    Using floats will lose precision. – Warren Weckesser Aug 22 '16 at 22:31
  • @WarrenWeckesser Thanks for the correct note, I've updated the answer based on your point. I also think it's a bit of an XY problem here, as the question is why is such a huge product needed, so tried to add a bit on alternatives as well. – Ami Tavory Aug 22 '16 at 22:38
  • I should be more emphatic: Don't use floats for this problem! Any correct solution will probably rely on performing exact arithmetic with integers. With (big enough) floats, you won't get exact arithmetic. – Warren Weckesser Aug 22 '16 at 22:39
  • @WarrenWeckesser OK, thanks, I dropped the original first option. – Ami Tavory Aug 22 '16 at 22:41
  • 1
    Using logarithms will also introduce floating point imprecision. (Sorry I'm being such a pest!) – Warren Weckesser Aug 22 '16 at 22:41
5

Those numbers get very big, fast.

>>> np.prod(array[:25])
7034535277573963776
>>> np.prod(array[:26])
-1569523520172457984
>>> type(_)
numpy.int64

You're actually overflowing numpy's data type here, hence the wack results. If you stick to python ints, you won't have overflow.

>>> import operator
>>> reduce(operator.mul, array, 1)
933262154439441526816992388562667004907159682643816214685929638952175999932299156089414639761565182862536979208272237582511852109168640000000000000000000000L
0

You get the result 0 due to the large number of factors 2 in the product, there are more than 450 of those factors. Thus in a reduction modulo 2^64, the result is zero.

Why the data type forces this reduction is explained in the other answers.


250+125+62+31+15+7+3+1 = 494 is the multiplicity of 2 in 500!

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