已知信息码110011,生成多项式G(X)=X4+X3+1.求循环冗余码和码字
2019-05-28
已知信息码110011,生成多项式G(X)=X4+X3+1.求循环冗余码和码字
优质解答
答:已知K(X) = X 5 + X 4+ X + 1,G(X) = X 4 + X 3 + 1
由此可知 r = 4,冗余码位数为4
R(X) = K(X) * X r / G(X)
=(X 5 + X 4 + X + 1)* X4 /(X 4 + X 3+ 1)
=(X 9 + X 8 + X 5+ X 4)/(X 4+ X 3 + 1)
通过二进制除法计算得知:冗余码为1001,R(X) = X 3 + 1.
T(X) = K(X) * X r + R(X)
= X 9 + X 8+ X 5 + X 4 + X 3 + 1
因此要发送的码字为1100111001.
答:已知K(X) = X 5 + X 4+ X + 1,G(X) = X 4 + X 3 + 1
由此可知 r = 4,冗余码位数为4
R(X) = K(X) * X r / G(X)
=(X 5 + X 4 + X + 1)* X4 /(X 4 + X 3+ 1)
=(X 9 + X 8 + X 5+ X 4)/(X 4+ X 3 + 1)
通过二进制除法计算得知:冗余码为1001,R(X) = X 3 + 1.
T(X) = K(X) * X r + R(X)
= X 9 + X 8+ X 5 + X 4 + X 3 + 1
因此要发送的码字为1100111001.