Gone Fishing
John is going on a fishing trip. He has h hours available, and there are n lakes in the area all reachable along a single, one-way road. John starts at lake 1, but he can finish at any lake he wants. He can only travel from one lake to the next one, but he does not have to stop at any lake unless he wishes to. For each i (1 to n-1), the number of 5-minute intervals it takes to travel from lake i to lake i+1 is denoted ti. For example, t3=4 means that it takes 20 minutes to travel from lake 3 to 4.
To help plan his fishing trip, John has gathered some information about the lakes. For each lake i, the number of fish expected to be caught in the initial 5 minutes, denoted fi, is known. Each 5 minutes of fishing decreases the number of fish expected to be caught in the next 5-minute interval by a constant rate of di. If the number of fish expected to be caught in an interval is less than or equal to di, there will be no more fish left in the lake in the next interval. To simplify the planning, John assumes that no one else will be fishing at the lakes to affect the number of fish he expects to catch. Write a program to help John plan his fishing trip to maximize the number of fish expected to be caught. The number of minutes spent at each lake must be a multiple of 5.
Input
Input starts with an integer T (≤ 100), denoting the number of test cases.
Each case starts with a line containing two integers n (2 ≤ n ≤ 25) and h (1 ≤ h ≤ 16). Next, there is a line of n integers specifying fi (0 ≤ fi ≤ 1000), then a line of n integers di (0 ≤ di ≤1000), and finally, a line of n-1 integers denoting ti (0 < ti < 192).
Output
For each test case, print the case number first. Then print the number of minutes spent at each lake, separated by commas, for the plan achieving the maximum number of fish expected to be caught. This is followed by a line containing the number of fish expected. If multiple plans exist, choose the one that spends as long as possible at lake 1. If there is still a tie, choose the one that spends as long as possible at lake 2, and so on.
Sample Input
3
2 1
10 1
2 5
2
4 4
10 15 20 17
0 3 4 3
1 2 3
4 4
10 15 50 30
0 3 4 3
1 2 3
Sample Output
Case 1:
45, 5
Number of fish expected: 31
Case 2:
240, 0, 0, 0
Number of fish expected: 480
Case 3:
115, 10, 50, 35
Number of fish expected: 724
好奇怪的题
看上去像是背包,后来发现似乎时间不够
然后发现可以枚举停在哪里,然后用堆维护在1到k钓鱼的时候怎么钓
1 #include2 #include 3 #include 4 #include 5 #include 6 #include 7 #include 8 #include 9 #include<set> 10 #include