We are given P 2-D points (x1,y1),(x2,y2),(x3,y3),....(xP,yP).

There are total `M`

number of Queries. Each query is in the form of a triplet.The format of each query is :

`(a b d)`

Let `T`

be a triangle with vertices `X(a+d,b),Y(a,b),Z(a,b+d)`

For each of the `M`

Queries, we have to return how many of the given points lie inside or on the boundary of triangle.

Example

`P=5, M=3`

The points(xi,yi) are :

```
1 3
1 5
3 6
4 4
2 6
```

The `M`

Queries (format (a,b,d)) are:

```
1 5 3
1 5 4
1 1 1
```

Answer for above three queries are `3,3,0`

respectively.

I tried to solve this problem using simple naive approach.But the constraints for the problem is indeed very large and are follows:

```
1 ≤ P ≤ 300000 1 ≤ M ≤ 200000
1 ≤ xi, yi ≤ 300000
1 ≤ a, b, d ≤ 300000
```

The Time Limit for this problem is just 1 Second.

How can i solve this problem within the given time-limit?

I tried the following:

```
#define MAX 300500
pair<int,int> p[MAX];
int n,q;
int x,y,d;
inline void scan(int *a)
{
register char c=0;
while (c<33) c=getchar_unlocked();
*a=0;
while (c>33)
{
*a=*a*10+c-'0';
c=getchar_unlocked();
}
}
void process()
{
int count=0;
for(int i=0;i<n;i++)
{
if((p[i].first>=x && p[i].first<= (x+d)) && (p[i].second>=y && p[i].second<= (y+d)) && (p[i].first + p[i].second - y -x -d)<=0)
count++;
}
cout<<count<<endl;
}
int main()
{
#ifdef _MSC_VER
freopen("input.txt","r",stdin);
#endif
scan(&n);scan(&q);
for(int i=0;i<n;i++)
{
scan(&p[i].first);scan(&p[i].second);
}
for(int i=0;i<q;i++)
{
scan(&x);scan(&y);scan(&d);
process();
}
return 0;
}
```

My solution will surely time out (I realized it after calculating Complexity). Also, i also tried to think this problem in terms of K-D Trees, but practically , not able to map it.