# First N digits of a long number in constant-time?

In a Project Euler problem I need to deal with numbers that can have hundreds of digits. And I need to perform some calculation on the first 9 digits.

My question is: what is the fastest possible way to determine the first N digits of a 100-digit integer? Last N digits are easy with modulo/remainder. For the first digits I can apply modulo 100 times to get digit by digit, or I can convert the number to String and truncate, but they all are linear time. Is there a better way?

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most project Euler solutions have "a ha!" solutions as well as 'brute force'...Also, your question is not programming related –  Mitch Wheat Dec 24 '10 at 8:25
why converting the number to String and doing str[i] is linear ? –  GeorgeAl Dec 24 '10 at 12:58
@Mitch: How exactly is this question "not programming related"? –  bendin Dec 28 '10 at 18:00
nice question from someone with ~10k. Can you provide more details: how integer is represented and how you want to use those 9 digits? Btw, seems that you are on the wrong way with your current solution is you require this. –  max taldykin Nov 17 '12 at 12:00

## 4 Answers

You can count number of digits with this function:

``````(defn dec-digit-count [n]
(inc (if (zero? n) 0
(long (Math/floor (Math/log10 n))))))
``````

Now we know how many digits are there, and we want to leave only first 9. What we have to is divide the number with 10^(digits-9) or in Clojure:

``````(defn first-digits [number digits]
(unchecked-divide number (int (Math/pow 10 digits))))
``````

And call it like: `(first-digits your-number 9)` and I think it's in constant time. I'm only not sure about `log10` implementation. But, it's sure a lot faster that a modulo/loop solution.

Also, there's an even easier solution. You can simply copy&paste first 9 digits from the number.

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Thanks, for some reason I haven't thought about log10. So obvious once you found it. :-) –  Konrad Garus Dec 24 '10 at 13:57
@Konrad: To quote Mitch Wheat: "A-ha!" :) –  Goran Jovic Dec 24 '10 at 14:06

In Java:

``````public class Main {
public static void main(String[] args) throws IOException {
long N = 7812938291232L;
System.out.println(N / (int) (Math.pow(10, Math.floor(Math.log10(N)) - 8)));
N = 1234567890;
System.out.println(N / (int) (Math.pow(10, Math.floor(Math.log10(N)) - 8)));
N = 1000000000;
System.out.println(N / (int) (Math.pow(10, Math.floor(Math.log10(N)) - 8)));
}
}
``````

yields

``````781293829
123456789
100000000
``````
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Maybe you can use not a long number, but tupple of two numbers: [first-digits, last-digits]. Perform operations on both of them, each time truncating to the required length (twice of the condition, 9 your case) the first at the right and the second at the left. Like

``````222000333 * 666000555
147|852344988184|815

222111333 * 666111555
147|950925407752|815
``````

so you can do only two small calculations: 222 * 666 = 147[852] and 333 * 555 = [184]815

But the comment about "a ha" solution is the most relevant for Project Euler :)

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Thanks, indeed this turned out to be the most popular and easiest solution to that problem. –  Konrad Garus Dec 24 '10 at 13:57

It may helps you first n digits of an exponentiation

and the answer of from this question

This algorithm has a compexity of O(b). But it is easy to change it to get O(log b)

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