Tutorial
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Solution (Ajosteen)
#include <bits/stdc++.h>
using namespace std;
string s;
bool ok(string t){
int msk = 0;
for(int i = 0; i < int(t.size()); ++i){
if(isupper(t[i])) msk |= 1;
if(islower(t[i])) msk |= 2;
if(isdigit(t[i])) msk |= 4;
}
return msk == 7;
}
int main() {
//freopen("input.txt", "r", stdin);
int t;
cin >> t;
for(int i = 0; i < t; ++i){
cin >> s;
if(ok(s)){
cout << s << endl;
continue;
}
bool fnd = false;
for(int i = 0; i < int(s.size()); ++i){
string t = s;
t[i] = '1';
if(ok(t)){
cout << t << endl;
fnd = true;
break;
}
t[i] = 'a';
if(ok(t)){
cout << t << endl;
fnd = true;
break;
}
t[i] = 'A';
if(ok(t)){
cout << t << endl;
fnd = true;
break;
}
}
if(fnd) continue;
if(isupper(s[2])){
s[0] = 'a';
s[1] = '1';
cout << s << endl;
continue;
}
if(islower(s[2])){
s[0] = 'A';
s[1] = '1';
cout << s << endl;
continue;
}
if(isdigit(s[2])){
s[0] = 'a';
s[1] = 'A';
cout << s << endl;
continue;
}
}
return 0;
}
1051B - Relatively Prime Pairs
Tutorial
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Solution (PikMike)
#include <bits/stdc++.h>
using namespace std;
#define forn(i, n) for(int i = 0; i < int(n); i++)
int main() {
long long l, r;
scanf("%lld%lld", &l, &r);
puts("YES");
forn(i, (r - l) / 2 + 1)
printf("%lld %lld\n", l + i * 2, l + i * 2 + 1);
}
Tutorial
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Solution (Ajosteen)
#include <bits/stdc++.h>
using namespace std;
const int N = 109;
int n;
int a[N];
map<int, int> m;
set <int> s[2];
int main() {
int n;
cin >> n;
for(int i = 0; i < n; ++i){
cin >> a[i];
m[a[i]]++;
}
int pos = 0;
for(auto p : m)
if(p.second == 1){
s[pos].insert(p.first);
pos = 1 - pos;
}
if(s[0].size() == s[1].size()){
string res(n, 'A');
for(int i = 0; i < n; ++i)
if(s[1].count(a[i]))
res[i] = 'B';
cout << "YES" << endl;
for(auto c : res) cout << c;
cout << endl;
return 0;
}
else{
assert(int(s[0].size()) - 1 == int(s[1].size()));
string res(n, 'A');
for(int i = 0; i < n; ++i)
if(s[1].count(a[i]))
res[i] = 'B';
int id = -1;
for(auto p : m)
if(p.second >= 3){
id = p.first;
break;
}
if(id == -1){
cout << "NO" << endl;
return 0;
}
bool flag = false;
for(int i = 0; i < n; ++i){
if(a[i] == id)
if(!flag){
flag = true;
res[i] = 'B';
}
}
cout << "YES" << endl;
for(auto c : res) cout << c;
cout << endl;
return 0;
}
return 0;
}
Tutorial
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Solution (PikMike)
#include <bits/stdc++.h>
using namespace std;
#define forn(i, n) for(int i = 0; i < int(n); i++)
const int N = 1000 + 7;
const int MOD = 998244353;
int dp[N][2 * N][4];
int add(int a, int b){
return (a + b) % MOD;
}
bool full(int mask){
return (mask == 0 || mask == 3);
}
int get(int mask, int nmask){
int cnt = __builtin_popcount(mask ^ nmask);
if (cnt == 0) return 0;
if (cnt == 2) return (full(mask) ? 1 : 2);
return (full(mask) ? 0 : 1);
}
int main() {
int n, k;
scanf("%d%d", &n, &k);
forn(i, 4)
dp[1][0][i] = 1;
for (int i = 1; i < n; ++i){
forn(j, k + 1){
forn(mask, 4){
forn(nmask, 4){
dp[i + 1][j + get(mask, nmask)][nmask] = add(dp[i + 1][j + get(mask, nmask)][nmask], dp[i][j][mask]);
}
}
}
}
int ans = 0;
forn(mask, 4){
int nw = get(mask, mask ^ 3);
if (k >= nw)
ans = add(ans, dp[n][k - nw][mask]);
}
printf("%d\n", ans);
}
1051E - Vasya and Big Integers
Tutorial
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Solution (Ajosteen)
#include<bits/stdc++.h>
using namespace std;
#define sz(a) (int)(a.size())
const int N = int(1e6) + 9;
const int MOD = 998244353;
int n;
string s, l, r;
int dp[N];
int sumDP[N];
int sum(int a, int b){
a += b;
if(a >= MOD) a -= MOD;
return a;
}
vector <int> z_function(string s){
int n = sz(s);
vector <int> z(n);
for(int i = 1, l = 0, r = 0; i < n; ++i){
if(i <= r)
z[i] = min(r - i + 1, z[i - l]);
while(i + z[i] < n && s[z[i]] == s[i + z[i]])
++z[i];
if(i + z[i] - 1 > r)
l = i, r = i + z[i] - 1;
}
return z;
}
//s[pos..] ? t
char cmp(vector <int> &zf, string &t, int pos){
int len = sz(t);
assert(pos + len + 1 < sz(zf));
if(sz(s) - pos < len) return '<';
int x = zf[len + 1 + pos];
assert(x <= len);
if(x == len) return '=';
assert(pos + x < sz(s));
assert(s[pos + x] != t[x]);
if(s[pos + x] < t[x]) return '<';
return '>';
}
int main() {
//freopen("input.txt", "r", stdin);
ios_base::sync_with_stdio(false);
cin.tie(NULL);
cin >> s >> l >> r;
n = int(s.size());
vector <int> zl = z_function(l + "#" + s);
vector <int> zr = z_function(r + "#" + s);
sumDP[n] = dp[n] = 1;
for(int i = n - 1; i >= 0; --i){
if(s[i] == '0'){
if(l == "0") dp[i] = dp[i + 1];
else dp[i] = 0;
sumDP[i] = sum(dp[i], sumDP[i + 1]);
continue;
}
int L = sz(l) + i;
char cl = cmp(zl, l, i);
if(cl == '<') ++L;
int R = sz(r) + i;
char cr = cmp(zr, r, i);
if(cr == '>') --R;
int cur = 0;
if(L <= R && L <= n){
R = min(R, n);
cur = sumDP[L];
if(R != n) cur = sum(cur, MOD - sumDP[R + 1]);
}
dp[i] = cur;
sumDP[i] = sum(dp[i], sumDP[i + 1]);
}
cout << dp[0] << endl;
return 0;
}
1051F - The Shortest Statement
Tutorial
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Solution (Ajosteen)
#include <bits/stdc++.h>
using namespace std;
const int N = 300 * 1000 + 9;
const int LOGN = 19;
const int M = 21;
const long long INF64 = 1e18;
int n, m, q;
vector <pair<int, int> > g[N];
int p[LOGN][N];
int tin[N], tout[N], T;
long long h[N];
set <pair<int, int> > badEdges;
long long d[M + M][N];
bool u[N];
void dfs(int v, int pr){
tin[v] = T++;
p[0][v] = pr;
u[v] = true;
for(int i = 1; i < LOGN; ++i)
p[i][v] = p[i - 1][ p[i - 1][v] ];
for(auto e : g[v]){
int to = e.first, len = e.second;
if(!u[to]){
h[to] = h[v] + len;
dfs(to, v);
if(v < to)
badEdges.erase(make_pair(v, to));
else
badEdges.erase(make_pair(to, v));
}
}
tout[v] = T;
}
bool isAncestor(int a, int b){
return tin[a] <= tin[b] && tout[a] >= tout[b];
}
int getLCA(int a, int b){
if(isAncestor(a, b)) return a;
if(isAncestor(b, a)) return b;
for(int i = LOGN - 1; i >= 0; --i)
if(!isAncestor(p[i][a], b))
a = p[i][a];
return p[0][a];
}
void dij(int st, long long d[N]){
set<pair<long long, int> > q;
for(int i = 0; i < n; ++i) d[i] = INF64;
d[st] = 0;
q.insert(make_pair(d[st], st));
while(!q.empty()){
int v = q.begin()->second;
q.erase(q.begin());
for(auto e : g[v]){
int to = e.first, len = e.second;
if(d[to] > d[v] + len){
q.erase(make_pair(d[to], to));
d[to] = d[v] + len;
q.insert(make_pair(d[to], to));
}
}
}
}
int main() {
//freopen("input.txt", "r", stdin);
scanf("%d %d", &n, &m);
for(int i = 0; i < m; ++i){
int u, v, w;
scanf("%d %d %d", &u, &v, &w);
--u, --v;
g[u].push_back(make_pair(v, w));
g[v].push_back(make_pair(u, w));
}
for(int v = 0; v < n; ++v)
for(auto e : g[v])
if(v < e.first)
badEdges.insert(make_pair(v, e.first));
dfs(0, 0);
int cpos = 0;
for(auto e : badEdges)
dij(e.first, d[cpos++]);
scanf("%d", &q);
for(int tc = 0; tc < q; ++tc){
int u, v;
scanf("%d %d", &u, &v);
--u, --v;
int lca = getLCA(u, v);
long long ans = h[u] + h[v] - 2 * h[lca];
for(int i = 0; i < badEdges.size(); ++i)
ans = min(ans, d[i][u] + d[i][v]);
printf("%lld\n", ans);
}
return 0;
}
Tutorial
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Solution (BledDest)
#include <bits/stdc++.h>
using namespace std;
#define x first
#define y second
typedef long long li;
mt19937 rnd(time(NULL));
struct node
{
int x;
int y;
li sum;
int siz;
node* l;
node* r;
node() {};
node(int x, int y, li sum, int siz, node* l, node* r) : x(x), y(y), sum(sum), siz(siz), l(l), r(r) {};
};
typedef node* treap;
typedef pair<treap, treap> ptt;
int getSiz(treap t)
{
return (t ? t->siz : 0);
}
li getSum(treap t)
{
return (t ? t->sum : 0);
}
treap fix(treap t)
{
if(!t) return t;
t->sum = getSum(t->l) + t->x + getSum(t->r);
t->siz = getSiz(t->l) + 1 + getSiz(t->r);
return t;
}
ptt split(treap t, int l)
{
t = fix(t);
if(!t) return make_pair(t, t);
if(t->x < l)
{
auto z = split(t->r, l);
t->r = z.x;
return make_pair(fix(t), z.y);
}
else
{
auto z = split(t->l, l);
t->l = z.y;
return make_pair(z.x, fix(t));
}
}
treap merge(treap a, treap b)
{
a = fix(a);
b = fix(b);
if(!a) return b;
if(!b) return a;
if(a->y > b->y)
{
a->r = merge(a->r, b);
return fix(a);
}
else
{
b->l = merge(a, b->l);
return fix(b);
}
}
struct comp
{
li cur_sum;
int beg;
li treap_sum;
treap t;
void upd()
{
cur_sum = treap_sum + beg * 1ll * getSum(t);
}
void insert(int bi)
{
ptt p = split(t, bi);
treap_sum += getSum(p.x) + getSiz(p.y) * 1ll * bi;
t = merge(p.x, merge(new node(bi, rnd(), bi, 1, NULL, NULL), p.y));
upd();
}
void fill_treap(treap t)
{
if(!t) return;
insert(t->x);
fill_treap(t->l);
fill_treap(t->r);
}
};
comp merge(comp a, comp b)
{
if(getSiz(a.t) < getSiz(b.t))
swap(a, b);
a.beg = min(a.beg, b.beg);
a.fill_treap(b.t);
delete b.t;
a.upd();
return a;
}
set<int> free_pos;
const int N = 400043;
int p[N];
int siz[N];
comp cc[N];
li start_sum = 0;
li end_sum = 0;
int get(int x)
{
return (p[x] == x ? x : (p[x] = get(p[x])));
}
void merge(int x, int y)
{
x = get(x);
y = get(y);
if(x == y) return;
if(siz[x] < siz[y]) swap(x, y);
end_sum -= cc[x].cur_sum;
end_sum -= cc[y].cur_sum;
p[y] = x;
siz[x] += siz[y];
cc[x] = merge(cc[x], cc[y]);
end_sum += cc[x].cur_sum;
}
void process(int ai, int bi)
{
start_sum += ai * 1ll * bi;
int pos = *free_pos.lower_bound(ai);
free_pos.erase(pos);
siz[pos] = 1;
p[pos] = pos;
cc[pos].beg = pos;
cc[pos].insert(bi);
end_sum += cc[pos].cur_sum;
if(!free_pos.count(pos - 1))
merge(pos, pos - 1);
if(!free_pos.count(pos + 1))
merge(pos, pos + 1);
printf("%lld\n", end_sum - start_sum);
}
int main() {
#ifdef _DEBUG
freopen("input.txt", "r", stdin);
freopen("output.txt", "w", stdout);
#endif
int n;
scanf("%d", &n);
for(int i = 0; i < N; i++)
free_pos.insert(i);
for(int i = 0; i < n; i++)
{
int a, b;
scanf("%d %d", &a, &b);
process(a, b);
}
return 0;
}
It should be "If k is odd" in editorial of problem C
It will be fixed in a few minutes. Thank you!
In solution for E it should be ax + 1
Why does my C WA?
http://mirror.codeforces.com/contest/1051/submission/43144963
Same. http://mirror.codeforces.com/contest/1051/submission/43262138 In even case, I just print A or B, changing them when 'nice' number found. I get WA. I can't understand why it happens. Please explain someone.
Can anyone explain why the last coloumn won't contain the answer and how are we calculating final answer(why are we xoring with 3)?
Hi there,
I think you are talking about problem D.
Well, the explanation skipped a step.
BB — 00 BW — 01 WB — 10 WW — 11
This is what the numbers mean.
The number of new components can be easier to understand in my code here. Let me know if you have any doubts or require further explanation. :)
please , would you like to explain with 1 ,2,3 test case
NilakshiRocks thanks a lot ! I"m glad I could help :)
9aminul Please read my explanation here and let me know if you have any doubts. :)
thanks a lot
[user:ghoshsai5000]Can you please why for this case you are returning 1
W B W B
And for below case returning 0 W W W W
Hi ghoshsai5000, Thanks for simplifyinh things.could you help me with one doubt on author's editorial:
If you can explainn this by any example, that would be great. Thanks :)
Hi,
Being honest, I didn't understand the editorial code completely. That's why I clearly elaborated all 16 cases in my code with understandable variable names to make the logic extremely clear :)
yes you are correct it would be :
return (full(mask) ? 1 : 0);
Proof of complexity of F?
Assume M = O(N), since M <= N + 21. Then, the complexity will be something like O((21*N*lg N + Q * (lg N + 21)). Since the preprocessing part for LCA takes O(N lg N) time and no more than O(N) edges will be erased from the set. We run dijkstra (O(N lg N)) from no more than 21 vertices = O(21*N lg(N)) and for every query we find the lca in O(lg N) and then iterate over all atmost 21 bad vertices to compute each distance in a O(1) time.
Here's my code for problem F, I'm not sure why I get WA on test 3 everything seems ok to me. can someone please explain my mistake? 43225756
found it, thank's anyway
In problem C, i found test case 6 1 1 1 2 2 2 that your solution print A A A A A A, can you recheck it ?
It's the correct output though?
Why didn't CodeForces evaluate the code? What's wrong?
We can use a type of mergeable segment tree to solve problem G, with O(nlogn) nodes created overall, so the time complexity is O(nlogn).
http://mirror.codeforces.com/contest/1051/submission/43232839
Are there any material to learn mergeable segment tree?
http://mirror.codeforces.com/blog/entry/49446
This is an example (with some extra functions): https://mirror.codeforces.com/blog/entry/49446
This problem also uses it: https://www.hackerearth.com/practice/data-structures/advanced-data-structures/segment-trees/practice-problems/algorithm/replace-27c5286c/
Can someone explain the Question D. Thanks!
Hard to understand Problem D. Can anyone Suggest me some good Editorial.
In problem D like the editorial says dp[i][j][mask] be the number of beautiful bicolorings of the first i columns such that j components are already created and can't be modified and the colors of the i-th column are determined by mask. I didn't understand what does mask mean, like what does dp[2][4][0] mean. I wanted to know that ,like dp[2][4][0] mean number of beautiful bicolorings of the first 2 coulmns such that 4 components are already visited , now what does 0 mean here. Someone please explain.
Set dp[n][k][mask] as the number of ways with n columns, k components, ending with mask in the n-th column. You can end up in 4 ways: white-white, white-black, black-white, black-black (that's the meaning of the mask having the values 00, 01, 10, 11). After this, try to figure it out the dp transitions by yourself. Good luck
Thanks a lot
Video solution with explanation: https://youtu.be/lSyQQ1T6iQ8
hey can someone tell me what's the wrong with this code for problem C ? link — http://mirror.codeforces.com/contest/1051/submission/43270735 thanks in advance.....
Can someone help me out with what is test 67 on problem E or why my code is going wrong?
43274362
Sorry, after thinking I realized I was just running into anti-hash tests. I was lazy and chose 998244353 as my hashing prime, and the same code AC with 1e9+9.
I advise you to use double MODs because if this submission was in a contest anyone can hack you.
My submission in "E — Vasya and Big Integers" was TLE, can anyone help me?
http://mirror.codeforces.com/contest/1051/submission/43280760
Well, without the O(n) strlen calls everywhere its only WA on Test 36.
https://mirror.codeforces.com/contest/1051/submission/43414241
Thank you! I realize that strlen calls are waste of time.
There's an even faster solution for problem D.
Let $$$ww[i][j]$$$ denote the number of $$$2 \times i$$$ grids that end with a column of (two) white squares and have $$$j$$$ components. Define $$$wb[i][j]$$$, $$$bw[i][j]$$$ and $$$bb[i][j]$$$ analogously.
Now, suppose we have a random $$$2 \times (i-1)$$$ grid and we want to find out the value of $$$ww[i][j]$$$. Consider the possible arrangements of the $$$i-1$$$-th column in the random grids:
1) The $$$i-1$$$-th column contains two white squares. In this case, we add $$$ww[i-1][j]$$$ to $$$ww[i][j]$$$. We do this because every possible grid that ends with two white squares and has $$$j$$$ components generates another possible grid (which has one more column and keeps the same amount of components) by adding a column of white squares.
2) The $$$i-1$$$-th column contains two black squares. In this case, we add $$$bb[i-1][j-1]$$$ to $$$ww[i][j]$$$ (notice that we add one column and one component to the grid when we add a column of white squares).
3) The $$$i-1$$$-th column contains distinct squares. In this case, we add $$$wb[i-1][j]$$$ and $$$bw[i-1][j]$$$ to $$$ww[i][j]$$$. This happens because when we add a column of white squares, the number of components doesn't change (the white part of the $$$i-1$$$-th column touches the new column) and, obviously, the number of columns increases by 1.
This means that
The other recurrences are left as an exercise to the reader $\dots$
Obs.: Notice that $$$ww[i][j] = bb[i][j]$$$ and $$$wb[i][j] = bw[j][i]$$$ because of symmetry. I only used four distinct arrays in this comment because my reasoning can be expressed more clearly this way.
Therefore, you just need to run a double for loop to update the DP arrays. This can be achieved in $$$O(n \cdot k)$$$ time.
Question D java solution