2018 Multi-University Training Contest 5 Solution

A - Always Online

Unsolved.

B - Beautiful Now

Solved.

题意：

给出一个n, k  每次可以将n这个数字上的某两位交换，最多交换k次，求交换后的最大和最小值

思路：

很明显有一种思路，对于最小值，尽可能把小的放前面， 对于最大值，尽可能把打的放前面。但是如果有多个最小数字或者最大数字会无法得出放哪个好，因此BFS一下即可

#include<bits/stdc++.h>

using namespace std;

const int INF = 0x3f3f3f3f;
const int maxn = 1e5 + 10;

struct node{
    int num, idx, step;
    node(){}
    node(int num, int idx, int step) :num(num), idx(idx), step(step){}
};

int n, k;
int cnt;
int arr[maxn];

int BFS1()
{
    queue<node>q;
    q.push(node(n, cnt, 0));
    int ans = INF;
    while(!q.empty())
    {
        node now = q.front();
        q.pop();
        ans = min(ans, now.num);
        if(now.step == k) continue;
        if(now.idx == 1) continue;
        int tmp = now.num;
        cnt = 0;
        while(tmp)
        {
            arr[++cnt] = tmp % 10;
            tmp /= 10;
        }
        int Min = now.idx;
        for(int i = now.idx - 1; i >= 1; --i)
        {
            if(arr[i] == arr[now.idx]) continue;
            if(arr[i] == 0 && now.idx == cnt) continue;
            if(arr[i] < arr[Min]) Min = i;
        }
        if(Min == now.idx)
        {
            q.push(node(now.num, now.idx - 1, now.step));
        }
        else
        {
            for(int i = now.idx - 1; i >= 1; --i)
            {
                if(arr[i] == arr[Min])
                {
                    swap(arr[i], arr[now.idx]);
                    tmp = 0;
                    for(int j = cnt; j >= 1; --j)
                    {
                        tmp = tmp * 10 + arr[j];
                    }
                    q.push(node(tmp, now.idx - 1, now.step + 1));
                    swap(arr[i], arr[now.idx]);
                }
            }
        }
    }
    return ans;
}

int BFS2()
{
    queue<node>q;
    q.push(node(n, cnt, 0));
    int ans = -INF;
    while(!q.empty())
    {
        node now = q.front();
        q.pop();
        ans = max(ans, now.num);
        if(now.step == k) continue;
        if(now.idx == 1) continue;
        int tmp = now.num;
        cnt = 0;
        while(tmp)
        {
            arr[++cnt] = tmp % 10;
            tmp /= 10;
        }
        int Max = now.idx;
        for(int i = now.idx - 1; i >= 1; --i)
        {
            if(arr[i] == arr[now.idx]) continue;
            if(arr[i] > arr[Max]) Max = i;
        }
        if(Max == now.idx)
        {
            q.push(node(now.num, now.idx - 1, now.step));
        }
        else
        {
            for(int i = now.idx - 1; i >= 1; --i)
            {
                if(arr[i] == arr[Max])
                {
                    swap(arr[i], arr[now.idx]);
                    tmp = 0;
                    for(int j = cnt; j >= 1; --j)
                    {
                        tmp = tmp * 10 + arr[j];
                    }
                    q.push(node(tmp, now.idx - 1, now.step + 1));
                    swap(arr[i], arr[now.idx]);
                }
            }
        }
    }
    return ans;
}

int main()
{
    int t;
    scanf("%d", &t);
    while(t--)
    {
        scanf("%d %d", &n ,&k);
        int tmp = n;
        cnt = 0;
        while(tmp)
        {
            cnt++;
            tmp /= 10;
        }
        k = min(k, cnt - 1);
        int ans1 = BFS1();
        int ans2 = BFS2();
        printf("%d %d
", ans1, ans2);
    }
    return 0;
}

C - Call It What You Want

Unsolved.

D - Daylight

Unsolved.

E - Everything Has Changed

Solved.

题意：

求多个圆的周长并

思路：

对于不想交和内含的直接continue，相切的直接相加。对于相交的可以减去大圆上的弧长，加上小圆的弧长

#include<bits/stdc++.h>

using namespace std;

const double PI = acos(-1.0);
const double eps = 1e-8;

int sgn(double x)
{
    if(fabs(x) < eps) return 0;
    else return x > 0 ? 1 : -1;
}

struct Point{
    double x, y;
    Point(){}
    Point(double _x, double _y)
    {
        x = _x;
        y = _y;
    }

    double distance(Point p)
    {
        return hypot(x - p.x, y - p.y);
    }
}P;

int n;
double R, r;

int main()
{
    int t;
    scanf("%d", &t);
    while(t--)
    {
        scanf("%d %lf", &n, &R);
        double ans = 2 * R * PI;
        for(int i = 1; i <= n; ++i)
        {
            scanf("%lf %lf %lf", &P.x, &P.y, &r);
            double dis = P.distance(Point(0.0, 0.0));
            if(sgn(dis - (r + R)) >= 0) continue;
            else if(sgn(dis - (R - r)) < 0) continue;
            else if(sgn(dis - (R - r)) == 0)
            {
                ans += 2 * PI * r;
                continue;
            }    
            double arc1 = (R * R + dis * dis - r * r) / (2.0 * R * dis);
            arc1 = 2 * acos(arc1);
            double arc2 = (r * r + dis * dis - R * R) / (2.0 * r * dis);
            arc2 = 2 * acos(arc2);
            ans -= R * arc1;
            ans += r * arc2;
        }
        printf("%.10f
", ans);
    }    
    return 0;
}

F - Fireflies

Unsolved.

G - Glad You Came

Upsolved.

题意：

m个区间操作，每次给$[L, R]区间内小于v 的数变为v$

 思路：

线段树，维护最大最小值+剪枝，因为数据随机才可以这样做。

#include <bits/stdc++.h>
using namespace std;

#define N 5000010
#define M 100010
#define ui unsigned int
#define ll long long
int t, n, m;
ui x, y, z, w;
ui f[N << 2];
ui MOD = (ui)1 << 30;

ui rng61()
{
    x = x ^ (x << 11);
    x = x ^ (x >> 4);
    x = x ^ (x << 5);
    x = x ^ (x >> 14);
    w = x ^ y ^ z;
    x = y;
    y = z;
    z = w;
    return z;
}

struct SEG
{
    ui lazy[M << 2], Max[M << 2], Min[M << 2];
    void Init() 
    {
        memset(lazy, 0, sizeof lazy);
        memset(Max, 0, sizeof Max);
        memset(Min, 0, sizeof Min);
    }
    void pushup(int id) 
    { 
        Max[id] = max(Max[id << 1], Max[id << 1 | 1]); 
        Min[id] = min(Min[id << 1], Min[id << 1 | 1]);
    }
    void pushdown(int id)
    {
        if (!lazy[id]) return;
        lazy[id << 1] = lazy[id];
        Max[id << 1] = lazy[id];
        Min[id << 1] = lazy[id];
        lazy[id << 1 | 1] = lazy[id];
        Max[id << 1 | 1] = lazy[id];
        Min[id << 1 | 1] = lazy[id];
        lazy[id] = 0;
    }
    void update(int id, int l, int r, int ql, int qr, ui val)
    {
        if (Min[id] >= val) return;
        if (l >= ql && r <= qr && Max[id] < val)
        {
            lazy[id] = Max[id] = val;
            return;
        }
        pushdown(id);
        int mid = (l + r) >> 1;
        if (ql <= mid) update(id << 1, l, mid, ql, qr, val);
        if (qr > mid) update(id << 1 | 1, mid + 1, r, ql, qr, val);
        pushup(id);
    }
    int query(int id, int l, int r, int pos)
    {
        if (l == r) return Max[id];
        pushdown(id);
        int mid = (l + r) >> 1;
        if (pos <= mid) return query(id << 1, l, mid, pos);
        else return query(id << 1 | 1, mid + 1, r, pos); 
    }
}seg;

int main()
{
    scanf("%d", &t);
    while (t--)
    {
        scanf("%d%d%u%u%u", &n, &m, &x, &y, &z);
        for (int i = 1; i <= 3 * m; ++i) f[i] = rng61();
        seg.Init();
        for (int i = 1, l, r, v; i <= m; ++i)
        {
            l = f[3 * i - 2] % n + 1;
            r = f[3 * i - 1] % n + 1;
            v = f[3 * i] % MOD;
            if (l > r) swap(l, r);
            seg.update(1, 1, n, l, r, v);
        }
        ll res = 0;
        for (int i = 1; i <= n; ++i)
            res ^= (ll)seg.query(1, 1, n, i) * (ll)i;
        printf("%lld
", res);
    }
    return 0;
}

H - Hills And Valleys

Upsolved,

题意：

给出一个长为n的数字串，每一位范围是$[0, 9]$，可以翻转其中一段，使得最长非下降子序列最长

思路：

也就是说 可以存在这样一段

$0, 1, 2....., x, (x - 1) , y, (y - 1).... x, y + 1, y + 2..$

我们知道，如果不可以翻转，求最长上升子序列的话，我们可以将原串 和模式串$0123456789$ 求最长公共子序列

那么翻转的话，我们通过枚举翻转的区间$C(2, 10)$ 构造出上述的模式串，再求最长公共子序列

#include <bits/stdc++.h>
using namespace std;

#define N 100010
#define INF 0x3f3f3f3f
int t, n, m, a[N], b[20];
int dp[N][20], tl[N][20], tr[N][20], res, l, r, ql, qr;
 
void solve()
{
    for (int i = 1; i <= m; ++i) dp[0][i] = 0, tl[0][i] = -1, tr[0][i] = -1;
    for (int i = 1; i <= n; ++i) for (int j = 1; j <= m; ++j)
    {
        dp[i][j] = dp[i - 1][j];
        tl[i][j] = tl[i - 1][j];
        tr[i][j] = tr[i - 1][j]; 
        if (a[i] == b[j]) 
        {
            ++dp[i][j];
            if (j == ql && tl[i][j] == -1) tl[i][j] = i;
            if (j == qr) tr[i][j] = i;    
        }
        if (j > 1 && dp[i][j - 1] > dp[i][j])
        {
            dp[i][j] = dp[i][j - 1];
            tl[i][j] = tl[i][j - 1];
            tr[i][j] = tr[i][j - 1]; 
        }
    }
    if (ql == 1 && qr == 1) 
    {
        res = dp[n][m]; 
        l = 1;
        r = 1;
    }
    else if (dp[n][m] > res && tl[n][m] != -1 && tr[n][m] != -1)
    {
        res = dp[n][m];
        l = tl[n][m];  
        r = tr[n][m];
    }
}

int main()
{
    scanf("%d", &t);
    while (t--)
    {
        scanf("%d", &n); 
        res = 1, l = 1, r = 1; 
        for (int i = 1; i <= n; ++i) scanf("%1d", a + i);
        for (int i = 1; i <= 10; ++i) b[i] = i - 1; m = 10;    ql = 1, qr = 1;
        solve(); 
        for (int i = 1; i < m; ++i) for (int j = i + 1; j <= 10; ++j) 
        {
            m = 0; 
            for (int pos = 1; pos <= i; ++pos) b[++m] = pos - 1;  
            ql = m + 1;
            for (int pos = j; pos >= i; --pos) b[++m] = pos - 1;
            qr = m;
            for (int pos = j; pos <= 10; ++pos) b[++m] = pos - 1;
            solve();   
            //for (int i = 1; i <= m; ++i) printf("%d%c", b[i], " 
"[i == m]);        
        }
        printf("%d %d %d
", res, l, r);
    }
    return 0;
}

I - Innocence

Unsolved.
 

J - Just So You Know

Unsolved.

K - Kaleidoscope

Unsolved.

L - Lost In The Echo

Unsolved.