题解
我们发现,题目告诉我们这个东西就是一个lct
首先,如果只有3,问题就非常简单了,我们算出所有a的总和,所有b的总和就好了
要是1和2也是多项式就好了……其实可以!也就是下面泰勒展开的用处,我们可以用一个多项式取逼近这个函数,而且,多项式次数越高越准确,我们大概到13次多项式就好了
如何创造出这个多项式呢,泰勒展开的式子是这样的
(sum_{i = 0}^{n} frac{f^{(i)}(x_{0}) (x - x_{0})^{i}}{i!})
其中(f^{(i)}(x))表示(f(x))的(i)阶导数
然后问题就变成了维护13个值的和的lct了
然后,如何求导
根据高中选修2-2
我们有
(f(g(x)) = g'(x)f'(g(x)))
对于第一类型的函数
(sin^{(1)}(ax + b) = acdot cos(ax + b))
(sin^{(2)}(ax + b) = -a^{2}cdot sin(ax + b))
(sin^{(3)}(ax + b) = -a^{3}cdot cos(ax + b))
(sin^{(4)}(ax + b) = a^{4}cdot sin(ax + b))
4次一个轮回
对于第二类型的函数
(f(x)^{(1)} = acdot e^{ax + b})
(f(x)^{(2)} = a^{2}cdot e^{ax + b})
(f(x)^{(n)} = a^{n}cdot e^{ax + b})
= =lct的cut是,先把一个点变成根,另一个点Access一下,再Splay成根,然后断掉根节点的左儿子
代码
#include <iostream>
#include <cstdio>
#include <vector>
#include <algorithm>
#include <cmath>
#include <cstring>
//#define ivorysi
#define pb push_back
#define MAXN 100005
#define space putchar(' ')
#define enter putchar('
')
using namespace std;
typedef long long int64;
typedef double db;
int N,M;
char s[25];
db fac[20];
struct Tr {
Tr *lc,*rc,*fa;
db sum[14],f[14];
bool rev;
void Update() {
for(int i = 0 ; i <= 13 ; ++i) sum[i] = f[i];
if(lc) for(int i = 0 ; i <= 13 ; ++i) sum[i] += lc->sum[i];
if(rc) for(int i = 0 ; i <= 13 ; ++i) sum[i] += rc->sum[i];
}
void Reverse() {
rev ^= 1;swap(lc,rc);
}
void Pushdown() {
if(rev) {
if(lc) lc->Reverse();
if(rc) rc->Reverse();
rev = 0;
}
}
}*tr[MAXN];
bool which(Tr *u) {
return u == u->fa->rc;
}
bool isRoot(Tr *u) {
if(!u->fa) return 1;
return u->fa->rc != u && u->fa->lc != u;
}
void Rotate(Tr *u) {
Tr *v = u->fa,*w = v->fa;
Tr *b = u == v->lc ? u->rc : u->lc;
if(!isRoot(v)) (v == w->lc ? w->lc : w->rc) = u;
u->fa = w;v->fa = u;
if(b) b->fa = v;
if(u == v->lc) v->lc = b,u->rc = v;
else v->rc = b,u->lc = v;
v->Update();
}
void Splay(Tr *u) {
static Tr* que[MAXN];
int tot = 0;Tr *x;
for(x = u ; !isRoot(x) ; x = x->fa) que[++tot] = x;
que[++tot] = x;
for(int i = tot ; i >= 1 ; --i) que[i]->Pushdown();
while(!isRoot(u)) {
if(!isRoot(u->fa)) {
if(which(u->fa) == which(u)) Rotate(u->fa);
else Rotate(u);
}
Rotate(u);
}
u->Update();
}
void Access(Tr *u) {
for(Tr *x = NULL ; u ; x = u, u = u->fa) {
Splay(u);
u->rc = x;
u->Update();
}
}
Tr* FindRoot(Tr *u){
Access(u);Splay(u);
Tr *res = u;
res->Pushdown();
while(res->lc) {res = res->lc;res->Pushdown();}
return res;
}
void MakeRoot(Tr *u) {Access(u);Splay(u);u->Reverse();}
void Link(Tr *u,Tr *v) {MakeRoot(u);u->fa = v;}
void Cut(Tr *u,Tr *v) {MakeRoot(u);Access(v);Splay(v);v->lc = u->fa = 0;v->Update();}
db Select(Tr *u,Tr *v,db x) {
MakeRoot(u);Access(v);Splay(u);
db res = 0,t = 1;
for(int i = 0 ; i <= 13 ; ++i) {
res += t * u->sum[i];
t *= x;
}
return res;
}
void Change(Tr *u,int ty,db a,db b) {
MakeRoot(u);
memset(u->f,0,sizeof(u->f));
if(ty == 1) {
db x = 1;
for(int i = 0 ; i <= 13 ; ++i) {
if(i % 4 == 0) u->f[i] = x * sin(b) / fac[i];
if(i % 4 == 1) u->f[i] = x * cos(b) / fac[i];
if(i % 4 == 2) u->f[i] = -x * sin(b) / fac[i];
if(i % 4 == 3) u->f[i] = -x * cos(b) / fac[i];
x *= a;
}
}
else if(ty == 2) {
db v = exp(b),x = 1;
for(int i = 0 ; i <= 13 ; ++i) {u->f[i] = v * x / fac[i];x *= a;}
}
else {
u->f[1] = a;u->f[0] = b;
}
u->Update();
}
void Solve() {
scanf("%d%d",&N,&M);
scanf("%s",s + 1);
fac[0] = 1;
for(int i = 1 ; i <= 13 ; ++i) fac[i] = fac[i - 1] * i;
int f,u,v;db a,b;
for(int i = 1 ; i <= N ; ++i) {
tr[i] = new Tr;tr[i]->lc = tr[i]->rc = tr[i]->fa = 0;
scanf("%d%lf%lf",&f,&a,&b);
Change(tr[i],f,a,b);
}
for(int i = 1 ; i <= M ; ++i) {
scanf("%s",s + 1);
if(s[1] == 'a' || s[1] == 'd') {
scanf("%d%d",&u,&v);++u;++v;
if(s[1] == 'a') Link(tr[u],tr[v]);
if(s[1] == 'd') Cut(tr[u],tr[v]);
}
else if(s[1] == 'm') {
scanf("%d%d%lf%lf",&u,&f,&a,&b);++u;
Change(tr[u],f,a,b);
}
else {
scanf("%d%d%lf",&u,&v,&a);++u;++v;
if(FindRoot(tr[u]) != FindRoot(tr[v])) puts("unreachable");
else printf("%.8e
",Select(tr[u],tr[v],a));
}
}
}
int main() {
#ifdef ivorysi
freopen("f1.in","r",stdin);
#endif
Solve();
return 0;
}