(Large extbf{Description: } large{一颗n个节点的树,m次询问,每次查询点i到点j的路径上所有节点点深度的k次方的和并对998244353取模(1leq n,m leq 300000,1leq kleq 50)。}\)
(Large extbf{Solution: } large{一开始看到这道题并没有思路,但是注意到k很小,所以我们可以预处理出每个节点到根节点1的路径上点的1到50次方的和,然后每次O(1)查询即可。\})
(Large extbf{Code: }\)
#include <cstdio>
#include <algorithm>
#define LL long long
#define gc() getchar()
#define rep(i, a, b) for (int i = (a); i <= (b); ++i)
using namespace std;
const int N = 3e5 + 5;
const int p = 998244353;
int n, m, cnt, head[N], son[N], dep[N], size[N], top[N], fa[N];
LL dis[N][52];
struct Edge {
int to, next;
}e[N];
inline int read() {
char ch = gc();
int ans = 0;
while (ch > '9' || ch < '0') ch = gc();
while (ch >= '0' && ch <= '9') ans = (ans << 1) + (ans << 3) + ch - '0', ch = gc();
return ans;
}
inline void add(int x, int y) {
e[++cnt].to = y;
e[cnt].next = head[x];
head[x] = cnt;
}
inline void dfs1(int x, int y) {
int Max = 0;
LL now = 0;
size[x] = 1;
fa[x] = y;
dep[x] = dep[y] + 1;
now = dep[x];
rep(i, 1, 50) dis[x][i] = (dis[y][i] + now) % p, now = (now * dep[x]) % p;
for (int i = head[x]; i ; i = e[i].next) {
int u = e[i].to;
dfs1(u, x);
size[x] += size[u];
if (size[u] > Max) son[x] = u, Max = size[u];
}
}
inline void dfs2(int x, int tp) {
top[x] = tp;
if (!son[x]) return;
dfs2(son[x], tp);
for (int i = head[x]; i ; i = e[i].next) {
int u = e[i].to;
if (u == son[x]) continue;
dfs2(u, u);
}
}
inline int lca(int x, int y) {
while (top[x] != top[y]) {
if (dep[top[x]] < dep[top[y]]) swap(x, y);
x = fa[top[x]];
}
return dep[x] < dep[y] ? x : y;
}
int main() {
n = read();
int x, y, k;
rep(i, 2, n) { x = read(), y = read(); if (x > y) swap(x, y); add(x, y); }
dep[0] = -1;
dfs1(1, 0);
dfs2(1, 1);
m = read();
while (m--) {
x = read(), y = read(), k = read();
int l = lca(x, y);
printf("%lld
", (dis[x][k] + 2 * p - dis[l][k] - dis[fa[l]][k] + dis[y][k]) % p);
}
return 0;
}