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ID题目提交者结果用时内存语言文件大小提交时间测评时间
#506396#6423. FireworksRailgun2334WA 1ms4060kbC++203.4kb2024-08-05 17:09:152024-08-05 17:09:17

Judging History

你现在查看的是最新测评结果

  • [2024-08-05 17:09:17]
  • 评测
  • 测评结果:WA
  • 用时:1ms
  • 内存:4060kb
  • [2024-08-05 17:09:15]
  • 提交

answer

#include <bits/stdc++.h>
using namespace std;
typedef long long ll;
#define re read()
#define MOD 998244353
#define i128 __int128
#define pll pair<ll,ll>
#define pii pair<int,int>
#define ull unsigned long long
#define INF 9223372036854775800
#define fr(i, x, y) for (int i = x, p = y; i <= p; ++i)
#define rp(i, x, y) for (int i = x, p = y; i >= p; --i)
#define Timeok ((double)clock() / CLOCKS_PER_SEC < MAX_TIME)
const double MAX_TIME = 1.0 - 0.0032;

inline ll read() {
	ll x = 0, f = 0;
	char ch = getchar();
	while (!isdigit(ch))
		f |= (ch == '-'), ch = getchar();
	while (isdigit(ch))
		x = (x << 1) + (x << 3) + (ch ^= 48), ch = getchar();
	return f ? -x : x;
}

void write(i128 x) {
	if (x < 0)
		putchar('-'), x = -x;
	if (x > 9)
		write(x / 10);
	putchar(x % 10 + 48);
}

inline void W(i128 x, char ch) {
	write(x);
	putchar(ch);
}

ll ksm(ll a, ll b, ll mod) { //快速幂mod
	a %= mod;
	ll res = 1;
	while (b > 0)
	{
		if (b & 1)
			res = res * a % mod;
		a = a * a % mod;
		b >>= 1;
	}
	return res;
}
ll ksm(ll a, ll b) { //快速幂
	ll res = 1;
	while (b > 0)
	{
		if (b & 1)res = res * a;
		a = a * a;
		b >>= 1;
	}
	return res;
}

pii fib(ll n) { //计算第n和n+1位斐波那契数
	if (n == 0)return{ 0,1 };
	auto p = fib(n >> 1);
	ll c = p.first * (2 * p.second - p.first);
	ll d = p.first * p.first + p.second * p.second;
	if (n & 1)
		return { d,c + d };
	else
		return { c,d };
}

ll exgcd(ll a, ll b, ll& x, ll& y) { //扩展欧几里得
	ll x1 = 1, x2 = 0, x3 = 0, x4 = 1;
	while (b != 0) {
		ll c = a / b;
		std::tie(x1, x2, x3, x4, a, b) =
			std::make_tuple(x3, x4, x1 - x3 * c, x2 - x4 * c, b, a - b * c);
	}
	x = x1, y = x2;
	return a;
}

bool liEu(ll a, ll b, ll c, ll& x, ll& y) { //线性同余方程
	ll d = exgcd(a, b, x, y);
	if (c % d != 0) return 0;
	ll k = c / d;
	x *= k;
	y *= k;
	return 1;
}

ll r[105]; //取模数
ll CRT(int k, ll* a, ll* r) { //中国剩余定理
	ll n = 1, ans = 0;
	for (int i = 1; i <= k; i++) n = n * r[i];
	for (int i = 1; i <= k; i++) {
		ll m = n / r[i], b, y;
		exgcd(m, r[i], b, y);  // b * m mod r[i] = 1
		ans = (ans + a[i] * m * b % n) % n;
	}
	return (ans % n + n) % n;
}
/*
ll Lucas(ll n, ll m, ll p) {
  if (m == 0) return 1;
  return (C(n % p, m % p, p) * Lucas(n / p, m / p, p)) % p;
}
*/
int gcd(int a, int b) {
	return b == 0 ? a : gcd(b, a % b);
}

int lcm(int a, int b) {
	return a * b / gcd(a, b);
}
/*------------C-O-D-E------------*/
const int N = 1e5 + 4;
//int n, m, M, mod=998244353;
long double pi[10005];
long double t1,t2,p;
long double check(long double i)
{
	return (t1*i+t2)/(1.0-pow(p,i));
}
void solve()
{
	std::cin>>t1>>t2>>p;
	if(p==10000)
	{
		printf("%.12Lf\n",t1+t2);
		return;
	}
	p=1.0-p*0.0001;
	//long double pp=1.0-p*0.0001;
	/*
	pi[0]=1;
	for(int i=1;i<=10000;i++)
	{
		pi[i]=pi[i-1]*pp;
	}
	for(int i=1;i<=10000;i++)
	{
		long double sum=(t1*i+t2)/(1.0-pi[i]);
	}
	*/
	long double l=1,r=1e9;
	long double mid;
	long double lmid,rmid;
	while(r-l>1)
	{
		mid=(l+r)/2;
		lmid=mid-1e-6;
		rmid=mid+1e-6;
		if(check(rmid)-check(lmid)>=1e-15)
		{
			r=mid;
		}
		else
		{
			l=mid;
		}
	}
	printf("%.12Lf\n",check(l));
}
int main()
{
	ios::sync_with_stdio(false);
	std::cin.tie(0);std::cout.tie(0);
	ll T = 1;
	std::cin>>T;
	while (T--)
	{
		solve();
	}
}

詳細信息

Test #1:

score: 100
Accepted
time: 0ms
memory: 4060kb

input:

3
1 1 5000
1 1 1
1 2 10000

output:

4.000000000000
10141.585798823837
3.000000000000

result:

ok 3 numbers

Test #2:

score: -100
Wrong Answer
time: 1ms
memory: 3968kb

input:

20
10 27 2855
79 59 6888
65 72 7725
78 50 2888
31 21 5759
41 58 6619
47 27 3881
35 55 5095
77 7 6028
17 89 1792
84 60 8604
58 44 4923
88 27 3824
54 63 1482
19 42 5366
93 76 97
100 99 8660
96 36 4343
90 56 9515
24 44 9922

output:

90.010034225408
200.348432055749
177.346278317152
443.213296398892
90.293453724605
149.569421362744
190.672507085803
176.643768400393
139.349701393497
275.230353877418
167.364016736402
207.190737355271
300.732217573222
590.940635283847
113.678717853149
10797.543442725999
229.792147806005
303.9373704...

result:

wrong answer 1st numbers differ - expected: '89.72981', found: '90.01003', error = '0.00312'