|시간 제한||메모리 제한||제출||정답||맞은 사람||정답 비율|
|3 초||256 MB||46||21||18||47.368%|
Air Bovinia operates flights connecting the N farms that the cows live on (1 <= N <= 20,000). As with any airline, K of these farms have been designated as hubs (1 <= K <= 200, K <= N).
Currently, Air Bovinia offers M one-way flights (1 <= M <= 20,000), where flight i travels from farm u_i to farm v_i and costs d_i (1 <= d_i <= 10,000) dollars. As with any other sensible airline, for each of these flights, at least one of u_i and v_i is a hub. There is at most one direct flight between two farms in any given direction, and no flight starts and ends at the same farm.
Bessie is in charge of running the ticketing services for Air Bovinia. Unfortunately, while she was away chewing on delicious hay for a few hours, Q one-way travel requests for the cows' holiday vacations were received (1 <= Q <= 50,000), where the ith request is from farm a_i to farm b_i.
As Bessie is overwhelmed with the task of processing these tickets, please help her compute whether each ticket request can be fullfilled, and its minimum cost if it can be done.
To reduce the output size, you should only output the total number of ticket requests that are possible, and the minimum total cost for them. Note that this number might not fit into a 32-bit integer.
3 3 1 2 1 2 10 2 3 10 2 1 5 2 1 3 3 1
For the first flight, the only feasible route is 1->2->3, costing 20. There are no flights leaving farm 3, so the poor cows are stranded there.