# Byte shift inverse operation

I have this code

``````byte[] b = new byte[]{-33,-4,20,30};
System.err.println(Arrays.toString(b));

int x =  (b[0] << 24) + (b[1] << 16) + (b[2] << 8) + b[3];

b = new byte[]{(byte)(x >> 24), (byte)(x >> 16), (byte)(x >> 8), (byte)(x)};

System.err.println(Arrays.toString(b));
``````

Output:

``````[-33, -4, 20, 30]
[-34, -4, 20, 30]
``````

I cannot figure out why this operations are not invers.

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Is it possible that there is data loss? –  Richard J. Ross III Nov 30 '11 at 19:30

Your problem is unwanted sign extension.

Specifically, `b[1]` is `-4`, or `0xfc` which is sign-extended to `0xfffffffc` then left-shifted to `0xfffc0000`. This has the effect of decrementing the most-significant byte by 1.

Try:

``````int x =  ((b[0] & 0xff) << 24) +
((b[1] & 0xff) << 16) +
((b[2] & 0xff) << 8) +
(b[3] & 0xff);
``````
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I think that the problem here is that when you compose the bits in this manner:

``````(b[0] << 24) + (b[1] << 16) + (b[2] << 8) + b[3]
``````

You are not doing what you think you're doing. In particular, suppose that `b[1]` is negative (which it is). When Java does bitshifts, it always promotes the value to an `int` before doing the shift. This means that `b[1]` will look like this when it gets promoted:

``````11111111 11111111 11111111 bbbbbbbb
``````

Here, the leading 1s are from the signed two's-complement representation of integers, which makes negative numbers represented by a lot of leading zeros. When you shift this number up, you get

``````11111111 bbbbbbbb 00000000 00000000
``````

If you then add these bits to `(b[0] << 24)`, which has the form

``````aaaaaaaa 00000000 00000000 00000000
``````

You do not get

``````aaaaaaaa bbbbbbbb 00000000 00000000
``````

Because of the leading 1s in the representation. To fix this, you need to mask out the sign bits before doing the addition. Specifically, if you change

``````b[1] << 16
``````

to

``````(b[1] << 16) & 0x00FFFFFF
``````

Then you mask out the bits to get

``````00000000 bbbbbbbb 00000000 00000000
``````

So now when you add the two values, you get

``````aaaaaaaa bbbbbbbb 00000000 00000000
``````

As desired.

The correct expression for composing bits is thus formed by ANDing in the appropriate masks at the appropriate times:

``````(b[0] << 24) + ((b[1] << 16) & 0x00FFFFFF) + ((b[2] << 8) & 0x0000FFFF) + (b[3] & 0x000000FF)
``````

I've tested this on my system and it seems to work just fine.

Hope this helps!

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