622A - Infinite Sequence 20171123
暴力枚举(n)在哪个区间即可,时间复杂度为(O(sqrt{n}))
#include<stdlib.h> #include<stdio.h> #include<math.h> #include<cstring> #include<iostream> #include<algorithm> using namespace std; long long n; int main() { scanf("%I64d",&n); for(long long i=1;;i++) if(i*(i+1)/2>=n) return printf("%I64d ",n-i*(i-1)/2),0; }
622B - The Time 20171123
没什么好说的......
#include<stdlib.h> #include<stdio.h> #include<math.h> #include<cstring> #include<iostream> #include<algorithm> using namespace std; int h,m,a; void print(int k) { if(k<10)printf("0%d",k); else printf("%d",k); } int main() { scanf("%d:%d%d",&h,&m,&a); m+=a;h+=m/60;m%=60;h%=24; print(h);printf(":");print(m); return 0; }
622C - Not Equal on a Segment 20171123
设f[i]为前i个数里不同数的个数,然后瞎几把乱搞就好了_(:з」∠)_
#include<stdlib.h> #include<stdio.h> #include<math.h> #define N 1000001 #include<cstring> #include<iostream> #include<algorithm> using namespace std; int n,m,a[N],l,r,x,_,f[N]; int main() { scanf("%d%d",&n,&m); for(int i=1;i<=n;i++) { scanf("%d",&a[i]); f[i]=f[i-1]+(a[i]!=a[i-1]); } for(int i=1;i<=m;i++) { scanf("%d%d%d",&l,&r,&x); if(f[l]==f[r] && a[l]==x) {printf("-1 ");continue;} if(a[l]!=x)printf("%d ",l);else printf("%d ",upper_bound(f+l,f+r,f[l])-f); } return 0; }
622D - Optimal Number Permutation 20171123
构造题...朝着让结果为0的目标去就好了
#include<stdlib.h> #include<stdio.h> #include<math.h> #include<cstring> #include<iostream> #include<algorithm> using namespace std; int n,a,b,f[1000001]; int main() { scanf("%d",&n);a=1,b=n+1; for(int i=1;i<n;i++)f[a]=f[a+n-i]=i,a++,swap(a,b);f[a]=f[2*n]=n; for(int i=1;i<=2*n;i++)printf("%d%c",f[i],i==2*n?' ':' '); return 0; }
622E - Ants in Leaves 20180919
考虑从根节点连出去的几个子树的答案是多少,对于每个子树,把子树中所有的叶子节点按深度排序,若设f[i]为第i个叶子爬到子树的根结点所需要的时间,则f[i]的初始值为他的深度,且有(f_i=max(f_{i},f_{i-1}+1))。最终答案就是所有子树对应答案的最大值
#include<bits/stdc++.h> using namespace std; #define N 500001 int n,u,v,ans,cnt,f[N]; vector<int>d[N]; void dfs(int cur,int pre,int dep) { int x=0; for(auto nxt:d[cur])if(nxt!=pre) x=1,dfs(nxt,cur,dep+1); if(!x)f[++cnt]=dep; } int main() { scanf("%d",&n); for(int i=2;i<=n;i++) scanf("%d%d",&u,&v), d[u].push_back(v), d[v].push_back(u); for(auto i:d[1]) { cnt=0; dfs(i,1,0); sort(f+1,f+cnt+1); for(int i=2;i<=cnt;i++) f[i]=max(f[i],f[i-1]+1); ans=max(ans,f[cnt]+1); } return printf("%d ",ans),0; }
622F - The Sum of the k-th Powers 20180317
拉格朗日插值法的经典应用
#include<stdlib.h> #include<stdio.h> #include<math.h> #define N 1000005 #include<cstring> #include<iostream> #include<algorithm> using namespace std; #define LL long long #define MOD 1000000007 LL n,k,t,ans,inv[N],y[N],f[N]; LL qow(LL X,LL Y){return Y?(Y&1?X*qow(X,Y-1)%MOD:qow(X*X%MOD,Y/2)):1;} int main() { scanf("%I64d%I64d",&n,&k); inv[1]=f[0]=t=1; for(LL i=2;i<=k+1;i++) inv[i]=(MOD-MOD/i)*inv[MOD%i]%MOD; for(LL i=1;i<=k+1;i++) f[i]=f[i-1]*inv[i]%MOD; for(LL i=1;i<=k+2;i++) y[i]=(y[i-1]+qow(i,k))%MOD; if(n<=k+2)return printf("%I64d ",y[n]),0; for(LL i=1;i<=k+2;i++) t*=(n-i)%MOD,t%=MOD; for(LL i=1;i<=k+2;i++) { LL s=((i-k)%2)?-1:1,res=y[i]; res*=t*qow((n-i)%MOD,MOD-2)%MOD,res%=MOD; res*=f[i-1]*f[k+2-i]%MOD,res%=MOD; ans+=(res*s+MOD)%MOD,ans%=MOD; } printf("%I64d ",ans); return 0; }