标题: 手工计算"1314"的CRC32

https://scz.617.cn/misc/200803311316.txt

2005-06-01 17:32 scz

> CRC32 "1314"

Plain   : 31 33 31 34
CRC32   : 0xA817E816

CRC32.c算出来的CRC32值与很多现成工具算出来的相一致。试图手工进行多项式长除
法得到这个结果，但总是得不到。很想知道如何通过多项式长除法得到结果，就算是
涉及一些二进制位的反序处理，也给我一个针对"\x31\x33\x31\x34"的手工计算例子
吧。可惜天下文章一大抄，没找到可答疑解惑的文章。

2008-03-31 10:23 tnttools@pediy

tnttools@pediy给出了最终手工运算过程，他是唯一一个正面解答了我的困惑的人，
十分感谢。

--------------------------------------------------------------------------
[PKZIP, AUTODIN II, Ethernet, FDDI]

Width   : 32
Poly    : 04C11DB7
        : x^32 + x^26 + x^23 + x^22 + x^16 + x^12 + x^11 + x^10 + x^8 + x^7 + x^5 + x^4 + x^2 + x^1 + x^0
        : (32,26,23,22,16,12,11,10,8,7,5,4,2,1,0)
Init    : FFFFFFFF
RefIn   : True
RefOut  : True
XorOut  : FFFFFFFF
--------------------------------------------------------------------------

    (Poly:04C11DB7)
        |
        v
0000 0100 1100 0001 0001 1101 1011 0111
        |
    (给出Poly时，一般省略了最高位的1，实际运算时要补上)
        |
        v
1 0000 0100 1100 0001 0001 1101 1011 0111
        |
        v
    (这就是除数)

"\x31\x33\x31\x34" (原始数据)
        |
    (展开成二进制表示)
        |
        v
0011 0001 0011 0011 0011 0001 0011 0100
        |
    (RefIn:True)
        |
        v
1000 1100 1100 1100 1000 1100 0010 1100
        |
    (Init:FFFFFFFF)
        |
        v
1000 1100 1100 1100 1000 1100 0010 1100
1111 1111 1111 1111 1111 1111 1111 1111 +(模2加法，非进位算术加法，就是异或)
---------------------------------------
0111 0011 0011 0011 0111 0011 1101 0011 (由于是与全1异或，实际就相当于取反)
        |
    (在尾部添加0，0的个数比除数的2进制位数少1，就本例而言，添加32个0)
        |
        v
0111 0011 0011 0011 0111 0011 1101 0011 0000 0000 0000 0000 0000 0000 0000 0000
        |
        v
    (这就是被除数)

进行多项式长除法运算:

                                                                    1110010110111011010101100101110(我们不关心商)
                                  +----------------------------------------------------------------
100000100110000010001110110110111 ) 111001100110011011100111101001100000000000000000000000000000000
                                    100000100110000010001110110110111
                                    ---------------------------------
                                     110010000000110011010010111110110
                                     100000100110000010001110110110111
                                     ---------------------------------
                                      100101001101100010111000010000010
                                      100000100110000010001110110110111
                                      ---------------------------------
                                         101101011100000110110100110101000
                                         100000100110000010001110110110111
                                         ---------------------------------
                                           110111101000010011101000001111100
                                           100000100110000010001110110110111
                                           ---------------------------------
                                            101110011100100011001101110010110
                                            100000100110000010001110110110111
                                            ---------------------------------
                                              111011101010000100001100010000100
                                              100000100110000010001110110110111
                                              ---------------------------------
                                               110110011000001100000101001100110
                                               100000100110000010001110110110111
                                               ---------------------------------
                                                101101111100011100010111110100010
                                                100000100110000010001110110110111
                                                ---------------------------------
                                                  110101101001111001100100001010100
                                                  100000100110000010001110110110111
                                                  ---------------------------------
                                                   101010011111110111010101111000110
                                                   100000100110000010001110110110111
                                                   ---------------------------------
                                                     101011100111010101101100111000100
                                                     100000100110000010001110110110111
                                                     ---------------------------------
                                                       101100000101011110001000111001100
                                                       100000100110000010001110110110111
                                                       ---------------------------------
                                                         110010001101110000011000111101100
                                                         100000100110000010001110110110111
                                                         ---------------------------------
                                                          100101010111100100101100010110110
                                                          100000100110000010001110110110111
                                                          ---------------------------------
                                                             101110001100110100010100000001000
                                                             100000100110000010001110110110111
                                                             ---------------------------------
                                                               111010101011011001101011011111100
                                                               100000100110000010001110110110111
                                                               ---------------------------------
                                                                110100011010110111001011010010110
                                                                100000100110000010001110110110111
                                                                ---------------------------------
                                                                 101001111001101010001011001000010
                                                                 100000100110000010001110110110111
                                                                 ---------------------------------
                                                                   10010111111010000001011111101010(余数)

1001 0111 1110 1000 0001 0111 1110 1010 (余数)
        |
    (RefOut:True)
        |
        v
0101 0111 1110 1000 0001 0111 1110 1001
        |
    (XorOut:FFFFFFFF)
        |
        v
0101 0111 1110 1000 0001 0111 1110 1001
1111 1111 1111 1111 1111 1111 1111 1111 +(模2加法，非进位算术加法，就是异或)
---------------------------------------
1010 1000 0001 0111 1110 1000 0001 0110 (由于是与全1异或，实际就相当于取反)
        |
        v
    0xA817E816 (最终结果)

我当时手工计算失败的原因在于没有针对下列参数进行相应处理，只是简单地进行多
项式长除法运算:

--------------------------------------------------------------------------
Init    : FFFFFFFF
RefIn   : True
RefOut  : True
XorOut  : FFFFFFFF
--------------------------------------------------------------------------

再次感谢tnttools@pediy的手工运算过程。顺便以他的原话结尾:

献给那些永远充满着好奇心的人们