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Scheduling Lectures

You are teaching a course and must cover n ( $1 \le n \le 1000$ ) topics. The length of each lecture is L ( $1 \le L \le 500$ ) minutes. The topics require $t_1, t_2, \dots, t_n$ ( $1 \le t_i \le L$ ) minutes each. For each topic, you must decide in which lecture it should be covered. There are two scheduling restrictions:

1.: Each topic must be covered in a single lecture. It cannot be divided into two lectures. This reduces discontinuity between lectures.
2.: Topic i must be covered before topic i + 1 for all $1 \le i < n$ . Otherwise, students may not have the prerequisites to understand topic i + 1.

With the above restrictions, it is sometimes necessary to have free time at the end of a lecture. If the amount of free time is at most 10 minutes, the students will be happy to leave early. However, if the amount of free time is more, they would feel that their tuition fees are wasted. Therefore, we will model the dissatisfaction index (DI) of a lecture by the formula:

$\begin{displaymath}DI = \cases{0 & if $t=0$, \cr -C & if $1 \le t \le 10$, \cr (t-10)^2 & otherwise} \end{displaymath}$

For this problem, you must find the minimum number of lectures that is needed to satisfy the above constraints. If there are multiple lecture schedules with the minimum number of lectures, also minimize the total dissatisfaction index.

Sample Output

Case 1:
Minimum number of lectures: 2
Total dissatisfaction index: 0

Case 2:
Minimum number of lectures: 6
Total dissatisfaction index: 2700

Miguel A. Revilla
1999-04-06

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Scheduling Lectures

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