# Strong numbers in python

A number is strong number if the sum of the factorials of the individual digits is equal to the number itself. For example: 145 = 1! + 4! +5!

I wrote the following code in python for this:

``````import math
def strong_num():
return [x for x in range(1,1000) if x==int(reduce(lambda p,q:math.factorial(int(p))+math.factorial(int(q)),str(x)))]

print strong_num()
``````

but the interpreter never returns?? What is wrong with this code?

-
I am trying to use the `lambda` here.... i know there are other ways to do it.... check this ideone.com/8cERCb –  sasidhar Oct 31 '12 at 6:38
It's easier to understand what the code does if you do it in steps, instead of in one long near unreadable line. –  Lennart Regebro Oct 31 '12 at 7:30
just for the curiosity: `print "0, 1, 2, 145, 40585"` would solve the problem, too –  tb- Oct 31 '12 at 14:57

Your `reduce` input is wrong, the you shouldn't compute the factorial of `p`. In fact, it is easier to just use `sum`:

``````return [x for x in range(1, 1000)
if x == sum(math.factorial(int(q)) for q in str(x))]
``````

The `functools.reduce` function can be considered as:

``````reduce(f, [a, b, c, d, ...]) == f(f(f(a, b), c), d) ...
``````

So, for instance, if x == 145, then your `reduce` part will compute

``````   int(reduce(lambda p, q: factorial(int(p)) + factorial(int(q)), str(x)))
== int(reduce(lambda p, q: factorial(int(p)) + factorial(int(q)), "145"))
== int(factorial(factorial(1) + factorial(4)) + factorial(5))
== int(factorial(1 + 24) + 120)
== int(15511210043330985984000000 + 120)
== 15511210043330985984000120
``````

The interpreter doesn't finish likely because of needing to compute the factorial of an extremely large number (consider (2 × 9!)!...)

If you still need to keep the `reduce`, you should change it to:

`````` reduce(lambda p,q: p + math.factorial(int(q)),  str(x),  0)
#                   ^                                     ^
#                   No need to factorial                  Add initializer too
``````
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isn't what you said is a different way of doing it?? –  sasidhar Oct 31 '12 at 6:37
is it wrong to use `lambda` in this scenario?? we use it for sum of numbers right? y not here?? –  sasidhar Oct 31 '12 at 6:40
@sasidhar: No it is wrong to use `reduce`. See update. –  KennyTM Oct 31 '12 at 6:44