http://acm.hdu.edu.cn/showproblem.php?pid=5475
An easy problem
Time Limit: 8000/5000 MS (Java/Others) Memory Limit: 65536/65536 K (Java/Others)
Total Submission(s): 755 Accepted Submission(s):
431
Problem Description
One day, a useless calculator was being built by Kuros. Let's assume that number X is showed on the screen of calculator. At first, X = 1. This calculator only supports two types of operation.
1. multiply X with a number.
2. divide X with a number which was multiplied before.
After each operation, please output the number X modulo M.
1. multiply X with a number.
2. divide X with a number which was multiplied before.
After each operation, please output the number X modulo M.
Input
The first line is an integer T(1≤T≤10^5), indicating the number of test cases.
For each test case, the first line
are two integers Q and M. Q is the number of operations and M is described
above. (1≤Q≤10^5,1≤M≤10^9)
The next Q lines, each line starts with an integer x indicating the type of
operation.
if x is 1, an integer y is given, indicating the number to multiply. (0<y≤10^9)
if x is 2, an integer n is given. The calculator will divide the number which is multiplied in the nth operation. (the nth operation must be a type 1 operation.)
It's guaranteed that in type 2 operation, there won't be two same n.
if x is 2, an integer n is given. The calculator will divide the number which is multiplied in the nth operation. (the nth operation must be a type 1 operation.)
It's guaranteed that in type 2 operation, there won't be two same n.
Output
For each test case, the first line, please output "Case #x:" and x is the id of the test cases starting from 1.
Then Q lines follow, each line please output an answer showed by the calculator.
Then Q lines follow, each line please output an answer showed by the calculator.
Sample Input
1
10 1000000000
1 2
2 1
1 2
1 10
2 3
2 4
1 6
1 7
1 12
2 7
Sample Output
Case #1:
2
1
2
20
10
1
6
42
504
84
题目大意:t组测试数据,q个操作,每个操作(a, y)的结果X对m取余,X最初值为1,如果a==1,将X乘以y
如果a==2,将X除以第y次操作的数(即X要除的数曾出现在乘操作里)
线段树:线段树区间维护乘积,将q次操作当做q个节点,每个区间的初始值是1,乘操作(a,y):将该次操作即该节点的数值改成其要乘的值y,
除操作(a,y):将第y次操作即y节点的数值改成1(即可让其免去乘操作),输出从1到q区间的乘积即可
#include<stdio.h> #include<string.h> #include<math.h> #include<stdlib.h> #include<algorithm> #define Lson root<<1, L, tree[root].Mid() #define Rson root<<1|1, tree[root].Mid() + 1, R const int N = 500010; typedef long long ll; struct Tree { ll L, R; ll sum; int Mid() { return (L + R) / 2; } } tree[N * 4]; ll a[N], m; void Push(int root) { tree[root].sum = (tree[root<<1].sum * tree[root<<1|1].sum) % m; }//维护区间乘积 void Build(int root, ll L, ll R) { tree[root].L = L, tree[root].R = R; if(L == R) { tree[root].sum = 1; return ; } Build(Lson); Build(Rson); Push(root); }//建树 void Update(int root, ll op, ll e) { if(tree[root].L == op && tree[root].R == op) { tree[root].sum = e % m; return ; } if(op <= tree[root].Mid()) Update(root<<1, op, e); else Update(root<<1|1, op, e); Push(root); }//区间单点更新 int main() { int t, q, op, x = 0; scanf("%d", &t); while(t--) { x++; scanf("%d%lld", &q, &m); printf("Case #%d: ", x); Build(1, 1, q); for(int i = 1 ; i <= q ; i++) { scanf("%d%lld", &op, &a[i]); if(op == 1) Update(1, i, a[i]); else Update(1, a[i], 1); printf("%lld ", tree[1].sum); } } return 0; }
通过用线段树的思路可以用暴力的方法来解题
#include<stdio.h> #include<string.h> #include<math.h> #include<stdlib.h> #include<algorithm> #define Lson root<<1, L, tree[root].Mid() #define Rson root<<1|1, tree[root].Mid() + 1, R const int N = 500010; typedef long long ll; ll a[N], m; int main() { int t, op, q, x = 0; scanf("%d", &t); while(t--) { x++; ll ans = 1; scanf("%d%lld", &q, &m); printf("Case #%d: ", x); for(int i = 1 ; i <= q ; i++) { scanf("%d%lld", &op, &a[i]); if(op == 1) ans = ans * a[i] % m; else { a[a[i]] = 1; a[i] = 1; ans = 1; for(int j = 1 ; j < i ; j++) ans = ans * a[j] % m; } printf("%lld ", ans); } } return 0; }