2.11 An Application to Binary Linear Codes
1. (a) 5 (c) 6
2. (a) 3 (c) 7
3. By (1) of Theorem 1,
5. a. It suffices to look at individual digits:
6. The table lists the codewords across the top and the distances of 
from them.
from them.
a. The unique nearest neighbor of 0110101 is 0100101 (so it corrects the single error).
c. 1011001 has both 1010101 and 1011010 at distance 2, so the 2 errors are detected but not corrected.
7. a. The minimum weight of C is 4. Detects 3 errors, corrects 1 error.
9.
a. We can have k = 4, n = 7 for the code, and (Example 9), the minimum weight for the code is 3. Thus it corrects t = 1 errors. Hence 
shows the code is perfect.
shows the code is perfect.
c. If the minimum distance is 5 = 2 · 2 + 1, it corrects t = 2 errors. We have 
while 27−2 = 25 = 32. So no such code exists.
while 27−2 = 25 = 32. So no such code exists.
10. a. If k = 2, t = 1, the Hamming bound is , that is 1 + n ≤ 2n−2. The first n ≥ 1 for which this holds ...
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