题目链接:http://acm.hdu.edu.cn/showproblem.php?pid=4002
本文作者:kuangbin
作者博客:www.cnblogs.com/kuangbin
转载请注明出处。否则违法必究。。。保留最终解释权~~~~
通过发现规律其实很简单。
先是把前i个素数的乘积求出来,结果就是不超出n的素数和。
题意:给出一个整数n,求一个数x,x在1到n之间,并且x/φ(x)最大(其中φ(x)为x的欧拉函数)。
思路:
由欧拉函数为积性函数,即:如果gcd(m , n) == 1,则有φ(m * n) == φ(m) * φ(n);且由φ(p^k) == (p - 1) * p^(k - 1),可得
φ(n) == φ(p1^k1 * p2^k2 * p3^k3 * … * pt^kt)
于是有
f(n) == n/φ(n) == 1 / [ (1 - 1/p1) * (1 - 1/p2) * (1 - 1/p3) * … * (1 - 1/pt) ]
由 (1)式 可知:要使f(x)最大,须使x含尽量多的不同素数因子。
样例,n=10,结果是6=2*3,n=100时,结果为30=2*3*5;
分析可知,先把从2开始的连续素数的乘积存在数组cc[][]中。然后找到一个不超过n的最大的cc[][]就是答案了。
直接看代码吧!不解释!
#include<stdio.h>
#include<string.h>
char cc[][500]=//打表,存的是前n个素数的乘积,节约时间
{
"2",
"6",
"30",
"210",
"2310",
"30030",
"510510",
"9699690",
"223092870",
"6469693230",
"200560490130",
"7420738134810",
"304250263527210",
"13082761331670030",
"614889782588491410",
"32589158477190044730",
"1922760350154212639070",
"117288381359406970983270",
"7858321551080267055879090",
"557940830126698960967415390",
"40729680599249024150621323470",
"3217644767340672907899084554130",
"267064515689275851355624017992790",
"23768741896345550770650537601358310",
"2305567963945518424753102147331756070",
"232862364358497360900063316880507363070",
"23984823528925228172706521638692258396210",
"2566376117594999414479597815340071648394470",
"279734996817854936178276161872067809674997230",
"31610054640417607788145206291543662493274686990",
"4014476939333036189094441199026045136645885247730",
"525896479052627740771371797072411912900610967452630",
"72047817630210000485677936198920432067383702541010310",
"10014646650599190067509233131649940057366334653200433090",
"1492182350939279320058875736615841068547583863326864530410",
"225319534991831177328890236228992001350685163362356544091910",
"35375166993717494840635767087951744212057570647889977422429870",
"5766152219975951659023630035336134306565384015606066319856068810",
"962947420735983927056946215901134429196419130606213075415963491270",
"166589903787325219380851695350896256250980509594874862046961683989710",
"29819592777931214269172453467810429868925511217482600306406141434158090",
"5397346292805549782720214077673687806275517530364350655459511599582614290",
"1030893141925860008499560888835674370998623848299590975192766715520279329390",
"198962376391690981640415251545285153602734402721821058212203976095413910572270",
"39195588149163123383161804554421175259738677336198748467804183290796540382737190",
"7799922041683461553249199106329813876687996789903550945093032474868511536164700810",
"1645783550795210387735581011435590727981167322669649249414629852197255934130751870910",
"367009731827331916465034565550136732339800312955331782619462457039988073311157667212930",
"83311209124804345037562846379881038241134671040860314654617977748077292641632790457335110",
"19078266889580195013601891820992757757219839668357012055907516904309700014933909014729740190",
"4445236185272185438169240794291312557432222642727183809026451438704160103479600800432029464270",
"1062411448280052319722448549835623701226301211611796930357321893850294264731624591303255041960530",
"256041159035492609053110100510385311995538591998443060216114576417920917800321526504084465112487730",
"64266330917908644872330635228106713310880186591609208114244758680898150367880703152525200743234420230"
};
char str[110];
int main()
{
int T;
int i;
scanf("%d",&T);
while(T--)
{
scanf("%s",&str);
int x=strlen(str);
for(i=0;i<60;i++)
{
int y=strlen(cc[i]);
if(x<y) break;
if(x>y)continue;
if(strcmp(str,cc[i])<0) break;
}
printf("%s\n",cc[i-1]);
}
return 0;
}