# Print list of binary permutations

What I am trying to do is print all the possibilities of a binary number n digits long. In other words, with a 4 digit number:

``````0001
0010
0100
1000
``````

..etc

To be honest, I have no idea of where to even start with this (other than I figure I'd need to use a loop, and probably an array) so any pointers in the right direction would be appreciated.

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If this is homework, please add the homework tag. –  Kal Dec 11 '11 at 2:10
I should clarify, all possible numbers within a given range. I.E. all possibilities of a 4 digit binary. Replace 4 with whatever number. It's not homework but I am trying to teach myself java. –  Smitty Dec 11 '11 at 2:14
Generally people who have the motivation to teach themselves a language do not use statements like "I have no idea of where to even start". Get a book, read, try simpler tasks.. –  Andrew Thompson Dec 11 '11 at 2:36
Thanks for your commentary, but I don't see a real need to defend myself on the internet. I was interested in understanding something, therefore I asked a question. –  Smitty Dec 11 '11 at 2:45
No offense, but this questions show lack of understanding how computers do math. –  harold Dec 11 '11 at 10:33

Maybe you could use a recursive algorithm:

``````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("", 4);
``````

That would give you all possible binary numbers with 4 digits.

Hope this helped!

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You wouldn't really be generating numbers, but it would still produce the desired output! –  eboix Dec 11 '11 at 2:18
Thanks for the reply, this is exactly what I'm after. Thank you. –  Smitty Dec 11 '11 at 2:42

For an `n`-bit binary number, there are 2^`n` "permutations". You just need to loop over the integers from 0 to `(1<<n)-1`, and convert each one to binary.

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you mean loop from 0 - (2^n)-1? –  ChrisWue Dec 11 '11 at 2:13
@Chris: Yes indeed! –  Oli Charlesworth Dec 11 '11 at 2:14
``````for(int i=0; i < 128; i++){
System.out.println(Integer.toBinaryString(i));
}
``````

Adjust the max for as high as you'd like to go.

If you need the padded 0's, there was another question on that just today: Pad a binary String equal to zero ("0") with leading zeros in Java

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This won't give the desired output. –  Oli Charlesworth Dec 11 '11 at 2:13
Since it's likely a homework exercise, this is a minor detail that can be remedied by the OP. :-) –  ziesemer Dec 11 '11 at 2:14

It helps to know how many possibilities there are.

`2^4 = 16`, right?

It'll help to know this as well.

Here's how I'd do it:

``````/**
* BinaryDemo
* @author Michael
* @since 12/10/11
*/
public class BinaryDemo {

public static void main(String[] args) {
if (args.length > 0) {
int n = Integer.parseInt(args[0]);
int m = 1;
for (int i = 1; i <= n; ++i) {
m *= 2;
}
System.out.println("# bits  : " + n);
System.out.println("# values: " + m);
String format = "%" + n + "s";
for (int i = 0; i < m; ++i) {
System.out.println(String.format(format, Integer.toString(i, 2)));
}

} else {
System.out.println("Usage: BinaryDemo <n>");
}
}
}
``````
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Thank you for your help, this is very helpful and I'll be digging into this now too :) –  Smitty Dec 11 '11 at 2:43

Just counting from 0 to 2n is so boring.. So let's do all numbers with 0 bits set first, then 1 bit, then 2, etc.

First output zero.
Then loop from 1 to n. At every iteration k, loop from `(1<<k)-1` to `-1 << (32 - k)` (inclusive) using NextBitPermutation, and print the current number in binary.

Not tested because it's Sunday morning. Expected output is:

``````0000
0001
0010
0100
1000
0011
0101
0110
1001
1010
1100
0111
1011
1101
1110
1111
``````
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To find all possible permutations of a given binary string(pattern) for example

The permutations of 1000 are 1000, 0100, 0010, 0001

``````void permutation(int no_ones, int no_zeroes, string accum){
if(no_ones == 0){
for(int i=0;i<no_zeroes;i++){
accum += "0";
}

cout << accum << endl;
return;
}
else if(no_zeroes == 0){
for(int j=0;j<no_ones;j++){
accum += "1";
}

cout << accum << endl;
return;
}

permutation (no_ones - 1, no_zeroes, accum + "1");
permutation (no_ones , no_zeroes - 1, accum + "0");
}

int main(){
string append = "";

//finding permutation of 11000
permutation(2, 6, append);  //the permutations are

//11000
//10100
//10010
//10001
//01100
//01010

cin.get();
}
``````
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