DAG Optimal Coin Change
阿新 • • 發佈:2018-04-06
while less ret acf diff lse syn customer test
In this problem, you are going to provide a given value of the change in different coins. Write a program to calculate the number of coins needed for each type of coin.
The input includes a value v, a size of the coinage set n, and a face value of each coin, f1, f2, ..., fn. The output is a list of numbers, namely, c1, ..., cn, indicating the number of coins needed for each type of coin. There may be many ways for the change. The value v is an integer satisfying 0 < v ≤ 2000, representing the change required
in cents. The face value of a coin is less than or equal to 10000. The output of your program should take the combination with the least number of coins needed.
For example, the Hong Kong coinage issued by the Hong Kong Monetary Authority consists of 10 cents, 20 cents, 50 cents, 1 dollar, 2 dollars, 5 dollars and 10 dollars would be represented in the input by n = 7, f1 = 10, f2 = 20, f3 = 50, f4 = 100, f5 = 200, f6 = 500, f7 = 1000.
The test data may contain many test cases, please process it to the end of the file.
Each test case contains integers v, n, f1, ..., fn in a line. It is guaranteed that n ≤ 10 and 0 < f1 < f2 < ...< fn.
題目描述
In a 10-dollar shop, everything is worthy 10 dollars or less. In order to serve customers more effectively at the cashier, change needs to be provided in the minimum number of coins.In this problem, you are going to provide a given value of the change in different coins. Write a program to calculate the number of coins needed for each type of coin.
The input includes a value v, a size of the coinage set n, and a face value of each coin, f1, f2, ..., fn. The output is a list of numbers, namely, c1, ..., cn, indicating the number of coins needed for each type of coin. There may be many ways for the change. The value v is an integer satisfying 0 < v ≤ 2000, representing the change required
in cents. The face value of a coin is less than or equal to 10000. The output of your program should take the combination with the least number of coins needed.
For example, the Hong Kong coinage issued by the Hong Kong Monetary Authority consists of 10 cents, 20 cents, 50 cents, 1 dollar, 2 dollars, 5 dollars and 10 dollars would be represented in the input by n = 7, f1 = 10, f2 = 20, f3 = 50, f4 = 100, f5 = 200, f6 = 500, f7 = 1000.
輸入
Each test case contains integers v, n, f1, ..., fn in a line. It is guaranteed that n ≤ 10 and 0 < f1 < f2 < ...< fn.
輸出
The output be n numbers in a line, separated by space. If there is no possible change, your output should be a single ?1. If there are more than one possible solutions, your program should output the one that uses more coins of a lower face value.樣例輸入
2000 7 10 20 50 100 200 500 1000
250 4 10 20 125 150
35 4 10 20 125 150
48 4 1 8 16 20
40 4 1 10 13 37
43 5 1 2 21 40 80
樣例輸出
0 0 0 0 0 0 2
0 0 2 0
-1
0 1 0 2
3 0 0 1
1 1 0 1 0
1 #include<bits/stdc++.h> 2 const int inf=0x3f3f3f; 3 using namespace std; 4 int dp[10010]; 5 int s[20]; 6 int f[20]; 7 int n; 8 void ptans(int t)//遞推找上一個最小的錢View Code9 { 10 for(int i=1;i<=n;i++) 11 if(t>=s[i]&&dp[t]==dp[t-s[i]]+1){ 12 f[i]++; 13 ptans(t-s[i]); 14 break; 15 } 16 } 17 int main() 18 { 19 int i,j; 20 int ans; 21 ios::sync_with_stdio(false); 22 while(cin>>ans){ 23 memset(dp,0,sizeof(dp)); 24 memset(s,0,sizeof(s)); 25 memset(f,0,sizeof(f));//初始化 26 for(i=1;i<=ans;i++) dp[i]=inf; 27 cin>>n; 28 for(i=1;i<=n;i++) cin>>s[i]; 29 for(i=1;i<=ans;i++) 30 for(j=1;j<=n;j++) if(i>=s[j]) dp[i]=min(dp[i],dp[i-s[j]]+1); 31 if(dp[ans]==inf) cout<<-1<<endl; 32 else{ 33 ptans(ans); 34 for(i=1;i<=n;i++){ 35 if(i!=1) cout<<" "; 36 cout<<f[i]; 37 } 38 cout<<endl; 39 } 40 } 41 return 0; 42 }
DAG 相當於一環套一環,但一個並不能直接或間接套在自己內部
就跟導彈攔截類似的那種
#include<bits/stdc++.h> const int inf=0x3f3f3f; using namespace std; int dp[10010]; int s[20]; int f[20]; int gf[10010]; int n; int main() { int i,j; int ans; ios::sync_with_stdio(false); while(cin>>ans){ memset(dp,0,sizeof(dp)); memset(s,0,sizeof(s)); memset(f,0,sizeof(f)); memset(gf,0,sizeof(gf)); for(i=1;i<=ans;i++) dp[i]=inf; cin>>n; for(i=1;i<=n;i++) cin>>s[i]; for(i=1;i<=ans;i++) for(j=1;j<=n;j++) if(i>=s[j]){ if(dp[i]>dp[i-s[j]]+1){ dp[i]=dp[i-s[j]]+1; gf[i]=j; } } if(dp[ans]==inf) cout<<-1<<endl; else{ int op=ans; while(op!=0){ f[gf[op]]++; op=op-s[gf[op]]; } for(i=1;i<=n;i++){ if(i!=1) cout<<" "; cout<<f[i]; } cout<<endl; } } return 0; }View Code
這個代碼沒有遞歸的過程 而是直接在更新的過程中記錄路徑
DAG Optimal Coin Change