# CRC polynomial calculation

I am trying to understand this document, but can't seem to get it right. http://www.ross.net/crc/download/crc_v3.txt

What's the algorithm used to calculate it?

I thought it uses `XOR` but I don't quite get it how he gets `0110` from `1100 XOR 1001`. It should be `101` (or 0101 or 1010 if a bit goes down). If I can get this, I think the rest would come easy, but for some reason I just don't get it.

``````    9= 1001 ) 0000011000010111 = 0617 = 1559 = DIVIDEND
DIVISOR   0000.,,....,.,,,
----.,,....,.,,,
0000,,....,.,,,
0000,,....,.,,,
----,,....,.,,,
0001,....,.,,,
0000,....,.,,,
----,....,.,,,
0011....,.,,,
0000....,.,,,
----....,.,,,
0110...,.,,,
0000...,.,,,
----...,.,,,
1100..,.,,,
1001..,.,,,
====..,.,,,
0110.,.,,,
0000.,.,,,
----.,.,,,
1100,.,,,
1001,.,,,
====,.,,,
0111.,,,
0000.,,,
----.,,,
1110,,,
1001,,,
====,,,
1011,,
1001,,
====,,
0101,
0000,
----
1011
1001
====
0010 = 02 = 2 = REMAINDER
``````
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The part you quoted is just standard long division like you learned in elementary school, except that it is done on binary numbers. At each step you perform a subtraction to get the remainder, and this is done in the example you gave: 1100 - 1001 = 0110.

Note that the article just uses this as a preliminary example, and it is not actually what is done in calculating CRC. Instead of normal numbers, CRC uses division of polynomials over the field GF(2). This can be modeled by using normal binary numbers and doing long division normally, except for using XOR instead of subtraction.

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And here I was sitting for half an hour making XORs on different numbers. – George Irimiciuc Mar 27 '14 at 18:14

we'll do the division using good-'ol long division which you learnt in school (remember?)

You just repetitively subtract, but since it is in binary, there are only two options: either the number fits once in the current selection, or 0 times. I annotated the steps:

``````0000011000010111
0000
1001             x  0
---- -
0000
1001            x  0
---- -
0001
1001           x  0
---- -
0011
1001          x  0
---- -
0110
1001         x  0
---- -
1100
1001        x  1
---- -
0110
1001       x  0
---- -
1100
1001      x  1
---- -
0110
``````

and so on

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