# Implement sort similar to radix

hi i need to write sucj kind of sorting maybe it is similary to radix sort and also (this is not homework because i created it problem myself and please if anobody can help me) problem is like this suppose i have array int x[]=new int[]{4,5,3,2,1}; let write it into binary form 5 -0101 4- 0100 3-0011 2-0010 1-0001 i want to sort this elements by using bitwise operatos or check each bit and if less exchange it can anybody help me for example take 5 and 4 check first rightmost bit 0==0 so continue in the 1 index also 1==1 next the same 0=0 and last one 1>0 it means that first element is greater then second so exchange it

Paraphasing:

I need to create a sort similar to radix.

Suppose I have an array: `int x[] = new int[] {4, 5, 3, 2, 1};`

Or, in binary form: `5-0101 4-0100 3-0011 2-0010 1-0001`

I want to sort these elements by using bitwise operators or check each bit and (if less) exchange it. For example, consider 5 and 4:

The leftmost or most significant bit (MSB) of 5 in binary is 0, as is the MSB of 4. Since `0 == 0` the process continues. The next two bits (0 then 1) are also equivalent. Finally the rightmost or least significant bit (LSB) of 5 is 1 whereas the LSB of 4 is 0, indicating that the two values should be exchanged.

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What happened to your punctuation!? – Matti Virkkunen May 19 '10 at 9:51
@JYelton: fantastic edit! – Greg S Aug 5 '10 at 8:17
@Greg S: Thanks, sometimes I can't help but try to decipher questions that I might otherwise be interested in; and I think it helps the community! – JYelton Aug 5 '10 at 14:51

To get the `k`-th bit of an `int x`, you can do the following:

``````int bit = (x >> k) & 1;
``````

Here's a test harness:

``````    int xs[] = {4,5,3,2,1};
for (int k = 0; k < 4; k++) {
for (int x : xs) {
int bit = (x >> k) & 1;
System.out.format("|%s|  ", bit);
}
System.out.println();
}
``````

This prints (with annotation)

``````x= 4    5    3    2    1  k=
|0|  |1|  |1|  |0|  |1|  0
|0|  |0|  |1|  |1|  |0|  1
|1|  |1|  |0|  |0|  |0|  2
|0|  |0|  |0|  |0|  |0|  3
``````

The tricky bit here is the sign bit, i.e. bit 31 on an `int`. When it's `1`, it signifies a negative number. You may want to first have an implementation that only works for positive `int`, and then add support for negative number later.