I am trying to sum all the numbers up
to a range, with all the numbers up to
the same range.

So you want to compute `limit**2`

sums.

because of the nested loops, if the
limit is too big it will take a lot of
time to compute the sums.

Wrong: it's **not** "because of the nested loops" -- it's because you're computing a quadratic number of sums, and therefore doing a quadratic amount of work.

Is there any way of doing this without
a nested loop?

You can mask the nesting, as in @aaron's answer, and you can halve the number of sums you compute due to the problem's simmetry (though that doesn't do the same thing as your code), but, to prepare a list with a quadratic number of items, there's absolutely no way to avoid doing a quadratic amount of work.

However, for your stated purpose

obtaining the sum of all abundant
numbers.

you're need an *infinite* amount of work, since there's an infinity of abundant numbers;-).

I think you have in mind problem 23, which is actually very different: it asks for the sum of all numbers that **cannot** be expressed as the sum of *two* abundant numbers. How the summation you're asking about would help you move closer to that solution really escapes me.

`xrange`

generally, but aaronasterling's recapitulation of Gauss' alleged simplification has O(1) complexity for the specific problem and O(1) <<< O(m*n). – msw Aug 13 '10 at 2:14`sums`

– Tim McNamara Aug 13 '10 at 2:18