Difference between revisions of "CSC103 Homework 1 2013"
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− | What is the truth table for this boolean function? You may want to refer to the "ice cream" example in the ''instructor's notes'' posted in the weekly schedule | + | What is the truth table for this boolean function? You may want to refer to the "ice cream" example in the ''instructor's notes'' posted in the weekly schedule: |
f = ( a '''and''' b ) '''or''' ( a '''and''' '''not''' c ) '''or''' '''not''' b | f = ( a '''and''' b ) '''or''' ( a '''and''' '''not''' c ) '''or''' '''not''' b |
Revision as of 09:47, 12 September 2013
--D. Thiebaut (talk) 07:25, 10 September 2013 (EDT)
This homework assignment is due on Tuesda Sept. 17th, at 9:00 a.m. Please print it or write it on paper, and bring it to class on the due date. No late assignments will be accepted.
Question #1
Count in binary and write down the first 35 numbers of the series. In other words, complete the second column in the list below.
Decimal Binary 0 0 1 1 2 10 3 11 4 ... 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34
Perform the following additions in binary:
10110 + 10011 =
11110 + 10110 =
Question #2
Assume that we live in a universe where everybody has only 3 fingers. Just as we did in class for a counting system with 2 digits (binary code), we invent a system for counting with only 6 digits (3 fingers + 3 fingers): 0, 1, 2, 3, 4, and 5.
- Write the first 30 numbers of a system with 6 digits. To help you out, I will start with the first 9 numbers of the series:
0 1 2 3 4 5 10 11 12 ...
Continue on until you have 20 consecutive numbers of a system in base 6.
Question #3
Perform the addition of the following numbers in base 4.
1003 + 2301 =
2232 + 3101 =
Question #4
What is the truth table for this boolean function? You may want to refer to the "ice cream" example in the instructor's notes posted in the weekly schedule:
f = ( a and b ) or ( a and not c ) or not b
The result should be a truth table where the last column contains all the possible values (T or F) that the function f can take for all the combinations of a, b and c.