# What is the algorithm to produce every k-bit number?

I want an algorithm to do the following: When the input is for example 3 I want every 3-bit number to be produced like the following:

``````000
001
010
011
100
101
110
111
``````

EDIT: Thank you for all your answers, But I'd prefer an algorithm that treats '1's and '0's as characters and the whole answer as an string so I could extend the answer for characters as well. Like producing every possible combination of `a,b,c` with the length of 3.

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is this homework? (tag it if it is) –  Jakob Weisblat Jan 8 '12 at 20:07
And what have you tried? –  mc10 Jan 8 '12 at 20:09
possible duplicate of List of all binary combinations for a number in Java –  Paul R Jan 8 '12 at 20:27

A straight-forward algorithm would be:

• calculate `2^n-1`; in your case, `7`.

• `for i = 0 : 7` convert `i` to binary form

• output binary form

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+1 Otherwise known as "counting" to grade-school children. –  mehaase Dec 30 '13 at 2:14

It means every number between zero and 2^n-1 which n is your bit number

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It's 2^n-1. [...] –  Luchian Grigore Jan 8 '12 at 20:13
Yeah and in math my statement is correct, I mean I didn't said between 0 and 2n including 2n –  Jani Jan 8 '12 at 20:15
But wouldn't that also mean you're leaving out 0? Because you also didn't say including 0... :P –  Luchian Grigore Jan 8 '12 at 20:16
Yes you are right, but that details is easily deductable, that's why I missed that parts, nontheless you're right –  Jani Jan 8 '12 at 20:19

``````function listNumbers (bits : Int) : List<String> {
l = [];
if (bits == 0) {
l.append("");
} else {
prev = listNumbers(bits-1);
for (number in prev) {
l.append("0" + number);
l.append("1" + number);
}
}
return l;
}
``````
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Maybe you could use a recursive algorithm. This is written in Java:

``````public void printBin(String soFar, int iterations) {
if(iterations == 0) {
System.out.println(soFar);
}
else {
printBin(soFar + "0", iterations - 1);
printBin(soFar + "1", iterations - 1);
}
}
``````

You would execute this like this:

``````printBin("", 3);
``````

That would give you all possible binary numbers with 3 digits.

Note, however, that with really big amounts of digits, you might get overflows.

Hope this helped!

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What you want do do is generate combinations the code in the article shouldn't be too hard to generalize for all characters using modular arithmetic. Or alternately you map characters onto numeric values, calculate the permutations and then map back to characters.

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