Let’s play a game.We add numbers 1,2...n in increasing order from 1 and put them into some sets.
When we add i,we must create a new set, and put iinto it.And meanwhile we have to bring [i-lowbit(i)+1,i-1] from their original sets, and put them into the new set,too.When we put one integer into a set,it costs us one unit physical strength. But bringing integer from old set does not cost any physical strength.
After we add 1,2...n,we have q queries now.There are two different kinds of query:
1 L R:query the cost of strength after we add all of [L,R](1≤L≤R≤n)
2 x:query the units of strength we cost for putting x(1≤x≤n) into some sets.
When we add i,we must create a new set, and put iinto it.And meanwhile we have to bring [i-lowbit(i)+1,i-1] from their original sets, and put them into the new set,too.When we put one integer into a set,it costs us one unit physical strength. But bringing integer from old set does not cost any physical strength.
After we add 1,2...n,we have q queries now.There are two different kinds of query:
1 L R:query the cost of strength after we add all of [L,R](1≤L≤R≤n)
2 x:query the units of strength we cost for putting x(1≤x≤n) into some sets.
InputThere are several cases,process till end of the input.
For each case,the first line contains two integers n and q.Then q lines follow.Each line contains one query.The form of query has been shown above.
n≤10^18,q≤10^5
OutputFor each query, please output one line containing your answer for this querySample Input
10 2
1 8 9
2 6
Sample Output
9
2
Hint
lowbit(i) =i&(-i).It means the size of the lowest nonzero bits in binary of i. For example, 610=1102, lowbit(6) =102= 210
When we add 8,we should bring [1,7] and 8 into new set.
When we add 9,we should bring [9,8] (empty) and 9 into new set.
So the first answer is 8+1=9.
When we add 6 and 8,we should put 6 into new sets.
So the second answer is 2. 题意:
多组输入,。每一组数据,有一个数字n,和一个数q,
有1~n个数,将i放入集合中同时放入i-lowbit(i)+1~ i 的所有数。
每向集合中放入一个数,就会消耗一点体力值。 然后有q个询问,询问1是,给你一个l和r,问l~r每一个数都加入到集合中,会消耗多少体力值。
2.
1~n中,对每一个数进行加入到集合中的话,数x会被加入多少次。 思路:
把i放入集合就会放入i-lowbit(i)+1~i的所有数
那么一共就是加入i - (i-lowbit(i)+1) +1 个数,即lowbit(i)个数,
那么一个数i消耗的体力值就是lowbit(i)
那么第一问就是让求l~r的lowbit的sum和。 由于数据量很大,我们不能扫一遍算出,
那么我们来分析一下是否可以优化。,
我们知道,lowbit(i)表示的是数字i的二进制最低位代表的十进制数。
例如6的二进制是110,最低位时第2个1,从右向左第2位,代表的十进制时2,(二进制10是十进制的2),那么lowbit(6)就是2。
那么l~r的lowbit的sum和就是,最低位的1在0位置上的数的数量*1(代表的十进制)+ 最低位的1在1位置上的数的数量*2 +.....
那么问题转化为如何快速的求出l~r中最低位的1在第i位的数的数量,
我们知道这样的一个求解方法(容斥的思想)n/(1<<P)-n/(1<<(p+1))就是·1~n中最低位的1在第p位(从右向左数,0开始计位)的数的数量。
那么我们只需要logn来枚举每一位,然后上面的公式即可计算出每一位的数量。 然后我们来看第二个问题,
要找到x在几个集合中,可用x=x+lowbit(x)找出有多少满足条件的x,就能得到集合的个数 细节见代码:
#include <iostream>
#include <cstdio>
#include <cstring>
#include <algorithm>
#include <cmath>
#include <queue>
#include <stack>
#include <map>
#include <set>
#include <vector>
#include <iomanip>
#define ALL(x) (x).begin(), (x).end()
#define rt return
#define dll(x) scanf("%I64d",&x)
#define xll(x) printf("%I64d\n",x)
#define sz(a) int(a.size())
#define all(a) a.begin(), a.end()
#define rep(i,x,n) for(int i=x;i<n;i++)
#define repd(i,x,n) for(int i=x;i<=n;i++)
#define pii pair<int,int>
#define pll pair<long long ,long long>
#define gbtb ios::sync_with_stdio(false),cin.tie(0),cout.tie(0)
#define MS0(X) memset((X), 0, sizeof((X)))
#define MSC0(X) memset((X), '\0', sizeof((X)))
#define pb push_back
#define mp make_pair
#define fi first
#define se second
#define eps 1e-6
#define gg(x) getInt(&x)
#define db(x) cout<<"== [ "<<x<<" ] =="<<endl;
using namespace std;
typedef long long ll;
ll gcd(ll a,ll b){return b?gcd(b,a%b):a;}
ll lcm(ll a,ll b){return a/gcd(a,b)*b;}
ll powmod(ll a,ll b,ll MOD){ll ans=;while(b){if(b%)ans=ans*a%MOD;a=a*a%MOD;b/=;}return ans;}
inline void getInt(int* p);
const int maxn=;
const int inf=0x3f3f3f3f;
/*** TEMPLATE CODE * * STARTS HERE ***/
ll solve(ll x)
{
ll res=0ll;
for(ll p=1ll;p<=x;p<<=)
{
res+=(x/p-x/(p<<))*p;
}
return res;
}
ll lowbit(ll x)
{
return x&(-x);
}
ll solve2(ll x,ll n)
{
ll res=0ll;
while(x<=n)
{
res++;
x+=lowbit(x);
}
return res;
} int main()
{
//freopen("D:\\common_text\\code_stream\\in.txt","r",stdin);
//freopen("D:\\common_text\\code_stream\\out.txt","w",stdout); ll n,q;
while(~scanf("%lld %lld",&n,&q))
{
int op;
while(q--)
{
scanf("%d",&op); if(op==)
{
ll l,r;
scanf("%lld %lld",&l,&r);
ll res=solve(r)-solve(l-1ll);
printf("%lld\n",res );
}else
{
ll x;
scanf("%lld",&x);
printf("%lld\n",solve2(x,n) );
}
}
} return ;
} inline void getInt(int* p) {
char ch;
do {
ch = getchar();
} while (ch == ' ' || ch == '\n');
if (ch == '-') {
*p = -(getchar() - '');
while ((ch = getchar()) >= '' && ch <= '') {
*p = *p * - ch + '';
}
}
else {
*p = ch - '';
while ((ch = getchar()) >= '' && ch <= '') {
*p = *p * + ch - '';
}
}
}