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I'm trying to minimize overhead as much as possible when adding numbers in an arithmetic series. I'm talking about a very large set, such as from 1 to 2^128. Is there any fast way of doing this? If so, what would it be without actually using the arithmetic sequence sum formula? Just as a reference, the sum from 1 to 2^128 is:


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"without actually using the arithmetic sequence sum formula" – Nico Bellic Sep 4 '12 at 1:08
That sounds like an artificial limitation. That is in fact the only reasonable way to do this. Is there a particular reason why the formula can't be used? – Mysticial Sep 4 '12 at 1:09
Nope. I'm taking a digital logic class, and I was given this as a challenge question (not homework). Apparently my professor was able to compute the value in under 10 second (without the formula), and it's actually driving me crazy. – Nico Bellic Sep 4 '12 at 1:16
In this case, the sum is just 2^255 + 2^127. Is the puzzle just to output that in base 10? – Nemo Sep 4 '12 at 1:24

Only fast way is to use the formula:

n * (n+1) / 2

Any other method (adding naively) will take way too long! (Even if you had a million years on a supercomputer, you wouldn't finish the calculation).

For such a large integer though, you cannot use normal integers. You will need to use a big integer object. So get a Big Integer library, eg. Google search, https://mattmccutchen.net/bigint/.

Note: a 256-bit integer may be able to hold results up to around that scale, but it is quite platform and compiler-dependent, as to whether 256-bit integers are readily available, and how they are used.

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