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I have a number in base 10 which has around 10k digits. I want to convert it into base 2 (1010101001...). All I can think of is primitive algorithm:

take last digit mod 2 -> write down bit

number divide by 2;

It's shouldn't be hard to implement primary school division on string, but i'm thinking that it very inefficiente. If i'm right it will be O(l^2), where l means length of number in base 10. Can that be done faster?

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It's the divisions that are slow. Divide by 2^32 at each step, and do 32 bits at a time. – Kerrek SB Nov 19 '12 at 13:39
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still makes it l^2 just with 1/32 constant. Which not helps too much since I give an example 10k digit is small I will have 10m digits or even 100m to deal with. I'm almost sure there must be n logn approach – abc Nov 19 '12 at 13:42
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There's an O(1) approach. Data doesn't just appear out of thin air, it's created by something. Find out where this 10 KB string came from and make them generate an array of integers instead of an array of characters. – Brendan Nov 19 '12 at 14:50

From what I understand you have your big number represented as a sequence of decimal digits. If that is so, you can compute a "binary" representation using multiplication and addition:

value = sum(i in 0...n-1) 10i * digiti

This computation can be split into parts in a divide and conquor way, although I'm not sure if you can arrive at a O(n log n) algorithm.

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If you are working with big numbers, I really suggest you use a multi precision library. Try GMP or MPRF or something similar.
-Øystein

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Division by 2 is the same as multiplication by 1/2. For the latter you can use some of the well known fast multiplication algorithms (Toom–Cook, Schönhage–Strassen,etc).

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