# Why gray code is an exclusive or of the bits in a binary code

I understood the purpose of gray codes in a clear way. EE Times: Gray Code Fundamentals

But I am not able to conceptually understand why the gray code can be generated as below

Gi = Bi+1 ⊕ Bi , i = n − 1, . . . , 0, where Bn is taken as 0.

Could someone help me on this conceptually.

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When you look into Wikipedia, you will see that it is:

``````G0 = B0
Gi = Bi EXOR Gi-1
``````

Does that make more sense? Check this for the Graycodes given in the pages you've read - you'll see it holds.

Would you like to see a proof of the above, or is looking at the examples enough?

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I am done looking at the formulae .I was looking for a proof or logical explanation –  whokares Oct 14 '12 at 17:19
Did you notice that the formula in your post was incorrect? –  Zane Oct 18 '12 at 18:50

In standard binary, if you exclusive-or a number less than `n**2` with `n**2-1`, then you effectively reverse the order of that count:

``````x   x^11
00  11
01  10
10  01
11  00
``````

So, for a two-bit number, if we exclusive-or the bottom bit with the next bit:

``````x   x^(x>>1)
00  00
01  01
10  11
11  10
``````

We are alternately reversing the order of the count for the bottom bit, depending on whether the bit above it is set or clear. This ensures that when bit 1 changes, bit 0 stays the same (where it would otherwise have wrapped around to zero and started counting up again).

For every bit that is added at the top of the counter, we need to repeat this reflection of the count of the bit below, to ensure that it doesn't become cleared as the new bit becomes set. The remaining bits follow in the same pattern, being reflected by the bit above them such that they count backwards rather than wrapping around.

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