UNB ECE4253 Digital Communications
Department of Electrical and Computer Engineering - University of New Brunswick, Fredericton, NB, Canada

Galois Field GF(2) Calculator


Model C-172 POLYNOMIAL CALCULATOR

A:

B:

A + B A - B A × B A / B

Discussion  Polynomials  MATLAB

Answer: (division)

 111000101101001101110110110100000010001110111101000101110011
--------------------------------------------------------------
               1010010001010100000000111111100

  Quotient = 110100000010110111110100001010

 Remainder = 111000100011010111000101101011

Detailed Calculation

                                                                110100000010110111110100001010
                                --------------------------------------------------------------
1010010001010100000000111111100 ) 111000101101001101110110110100000010001110111101000101110011
                                  1010010001010100000000111111100
                                  -------------------------------
                                   10001101000011101110101001010000010001110111101000101110011
                                   1010010001010100000000111111100
                                   -------------------------------
                                    0101001010110101110100110101000010001110111101000101110011
                                     1010010001010100000000111111100
                                     -------------------------------
                                      00000010011111110100101010110010001110111101000101110011
                                            1010010001010100000000111111100
                                            -------------------------------
                                             0111011100001101010111101110110111101000101110011
                                              1010010001010100000000111111100
                                              -------------------------------
                                               10010100100111010111110001000111101000101110011
                                               1010010001010100000000111111100
                                               -------------------------------
                                                0110000110010010111111110111111101000101110011
                                                 1010010001010100000000111111100
                                                 -------------------------------
                                                  11001110111000111111101000001101000101110011
                                                  1010010001010100000000111111100
                                                  -------------------------------
                                                   1101010101101111111100111110101000101110011
                                                   1010010001010100000000111111100
                                                   -------------------------------
                                                    111000100111011111100000001001000101110011
                                                    1010010001010100000000111111100
                                                    -------------------------------
                                                     10001100010001111100011110111000101110011
                                                     1010010001010100000000111111100
                                                     -------------------------------
                                                      0101000000100111100010001000000101110011
                                                       1010010001010100000000111111100
                                                       -------------------------------
                                                        00001000001101100010010111110101110011
                                                            1010010001010100000000111111100
                                                            -------------------------------
                                                             010011100110110010111001010010011
                                                              1010010001010100000000111111100
                                                              -------------------------------
                                                                111000100011010111000101101011

2024-03-28 08:47:48 ADT
Last Updated: 2010-04-29
Richard Tervo [ tervo@unb.ca ] Back to the course homepage...