#P1209B. Koala and Lights
Koala and Lights
No submission language available for this problem.
Description
It is a holiday season, and Koala is decorating his house with cool lights! He owns $n$ lights, all of which flash periodically.
After taking a quick glance at them, Koala realizes that each of his lights can be described with two parameters $a_i$ and $b_i$. Light with parameters $a_i$ and $b_i$ will toggle (on to off, or off to on) every $a_i$ seconds starting from the $b_i$-th second. In other words, it will toggle at the moments $b_i$, $b_i + a_i$, $b_i + 2 \cdot a_i$ and so on.
You know for each light whether it's initially on or off and its corresponding parameters $a_i$ and $b_i$. Koala is wondering what is the maximum number of lights that will ever be on at the same time. So you need to find that out.
The first line contains a single integer $n$ ($1 \le n \le 100$), the number of lights.
The next line contains a string $s$ of $n$ characters. The $i$-th character is "1", if the $i$-th lamp is initially on. Otherwise, $i$-th character is "0".
The $i$-th of the following $n$ lines contains two integers $a_i$ and $b_i$ ($1 \le a_i, b_i \le 5$) — the parameters of the $i$-th light.
Print a single integer — the maximum number of lights that will ever be on at the same time.
Input
The first line contains a single integer $n$ ($1 \le n \le 100$), the number of lights.
The next line contains a string $s$ of $n$ characters. The $i$-th character is "1", if the $i$-th lamp is initially on. Otherwise, $i$-th character is "0".
The $i$-th of the following $n$ lines contains two integers $a_i$ and $b_i$ ($1 \le a_i, b_i \le 5$) — the parameters of the $i$-th light.
Output
Print a single integer — the maximum number of lights that will ever be on at the same time.
Samples
3
101
3 3
3 2
3 1
2
4
1111
3 4
5 2
3 1
3 2
4
6
011100
5 3
5 5
2 4
3 5
4 2
1 5
6
Note
For first example, the lamps' states are shown in the picture above. The largest number of simultaneously on lamps is $2$ (e.g. at the moment $2$).
In the second example, all lights are initially on. So the answer is $4$.