Discrete Mathematics We want to spread a face-to-face exam among 24 students over three days: Wednesday, Thursday and Friday. An exam schedule is the score with the 3 subsets of students for each day. (Or, equivalently, a function e: {1,2,...,24}→{M, J,V}.) We want to count the possible schedules (=N) under different rules. 3. Suppose we have to cancel the exam on Friday and everyone has to take the test on Wednesday or Thursday. What is the total number of schedules possible? Answer: N=? Hint : It is a large number.
Discrete Mathematics We want to spread a face-to-face exam among 24 students over three days: Wednesday, Thursday and Friday. An exam schedule is the score with the 3 subsets of students for each day. (Or, equivalently, a function e: {1,2,...,24}→{M, J,V}.) We want to count the possible schedules (=N) under different rules. 3. Suppose we have to cancel the exam on Friday and everyone has to take the test on Wednesday or Thursday. What is the total number of schedules possible? Answer: N=? Hint : It is a large number.
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Discrete Mathematics
We want to spread a face-to-face exam among 24 students over three days: Wednesday, Thursday and Friday. An exam schedule is the score with the 3 subsets of students for each day. (Or, equivalently, a function e: {1,2,...,24}→{M, J,V}.) We want to count the possible schedules (=N) under
3. Suppose we have to cancel the exam on Friday and everyone has to take the test on Wednesday or Thursday. What is the total number of schedules possible? Answer: N=?
Hint : It is a large number.
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