# Big-O Space requirement for multiplication

Stack Overflow. I see some great resources on time complexity here, but so far I haven't been able to answer to this space complexity question using them. So:

If I am multiplying the first n primes together, what space would be required to store the answer? For example, multiplying the first thousand primes together and storing the resulting number (an integer, albeit a large one). Would it require n-squared or log(n) space?

Thanks so much!

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My initial thoughts are that the Big-O space requirement is probably the same as that for n! - but that's just a feeling... – Will A Dec 7 '10 at 23:50

The prime number theorem tells us that the nth prime is approximately n ln n, so the product of the first n primes is approximately

Πin(i ln i) = n! O((log n)n) = O((n log n)n)

And to represent this number you'd need space that's the logarithm of that, i.e.

O(n (log n + log log n)).

(Note that this is asymptotically bigger than the space needed to store n!, which is just O(n log n).)

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Thank you! Much appreciated. – ada.grace Dec 9 '10 at 0:17

Just taking the last part of your question. If you have a list of the first n primes, the # of digits in the final multiplication will be log(n^n) which is just n log n. Since the algorithm would just be to multiply each one with a single accumulator, i would say the total space requirement would be the final expected # of digits, which is: n log(n)

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Why would the number of digits in the final multiplication be log(n^n)? I'm not saying you're wrong, I'm just not seeing that crucial step...! – Will A Dec 7 '10 at 23:55
I reckon there are more than O(n log n) digits in the product of the first n primes. See my answer. – Gareth Rees Dec 8 '10 at 0:04