hdu 6198 number number number(繰返し式ブラックテクノロジー)
5106 ワード
number number number
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others) Total Submission(s): 192 Accepted Submission(s): 126
Problem Description
We define a sequence
F:
⋅
F0=0,F1=1;
⋅
Fn=Fn−1+Fn−2 (n≥2).
Give you an integer
k, if a positive number
n can be expressed by
n=Fa1+Fa2+...+Fak where
0≤a1≤a2≤⋯≤ak, this positive number is
mjf−good. Otherwise, this positive number is
mjf−bad.
Now, give you an integer
k, you task is to find the minimal positive
mjf−bad number.
The answer may be too large. Please print the answer modulo 998244353.
Input
There are about 500 test cases, end up with EOF.
Each test case includes an integer
k which is described above. (
1≤k≤109)
Output
For each case, output the minimal
mjf−bad number mod 998244353.
Sample Input
Statistic | Submit | Discuss | Note
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others) Total Submission(s): 192 Accepted Submission(s): 126
Problem Description
We define a sequence
F:
⋅
F0=0,F1=1;
⋅
Fn=Fn−1+Fn−2 (n≥2).
Give you an integer
k, if a positive number
n can be expressed by
n=Fa1+Fa2+...+Fak where
0≤a1≤a2≤⋯≤ak, this positive number is
mjf−good. Otherwise, this positive number is
mjf−bad.
Now, give you an integer
k, you task is to find the minimal positive
mjf−bad number.
The answer may be too large. Please print the answer modulo 998244353.
Input
There are about 500 test cases, end up with EOF.
Each test case includes an integer
k which is described above. (
1≤k≤109)
Output
For each case, output the minimal
mjf−bad number mod 998244353.
Sample Input
1
Sample Output
4
Source
2017 ACM/ICPC Asia Regional Shenyang Online
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题意:斐波拉契数列,求不能由这些k个斐波那契数列数组成的最小整数
思路:先手写找规律,再用黑科技代码模板
//
#include
using namespace std;
#define X first
#define Y second
#define PB push_back
#define MP make_pair
#define MEM(x,y) memset(x,y,sizeof(x));
#define bug(x) cout< pii;
using namespace std;
const int maxn=1e3+10;
const int mod=998244353;
ll powmod(ll a,ll b){
ll res=1;a%=mod;
assert(b>=0);
for(;b;b>>=1){
if(b&1)res=res*a%mod;a=a*a%mod;
}
return res;
}
// head
namespace linear_seq {
const int N=10010;
ll res[N],base[N],_c[N],_md[N];
vector Md;
void mul(ll *a,ll *b,int k) {
for(int i=0;i=k;i--)
if (_c[i])
for(int j=0;j a,vector b) {
// a b b[n+1]=a[0]*b[n]+...
ll ans=0,pnt=0;
int k=a.size();
assert(a.size()==b.size());
for(int i=0;i=0;p--) {
mul(res,res,k);
if ((n>>p)&1) {
for (int i=k-1;i>=0;i--) res[i+1]=res[i];res[0]=0;
for(int j=0;j BM(vector s) {
vector C(1,1),B(1,1);
int L=0,m=1,b=1;
for(int n=0;n T=C;
ll c=mod-d*powmod(b,mod-2)%mod;
while (C.size() a,ll n) {
vector c=BM(a);
c.erase(c.begin());
for(int i=0;i(a.begin(),a.begin()+c.size()));
}
};
int main(){
ll t,n;
// cin>>t;
while(cin>>n){
cout<{5,13,34,89},n-1)%mod-1)%mod<