You are given an array $a$ consisting of $500000$ integers (numbered from $1$ to $500000$). Initially all elements of $a$ are zero.

You have to process two types of queries to this array:

• $1$ $x$ $y$ — increase $a_x$ by $y$;
• $2$ $x$ $y$ — compute $\sum\limits_{i \in R(x, y)} a_i$, where $R(x, y)$ is the set of all integers from $1$ to $500000$ which have remainder $y$ modulo $x$.

Can you process all the queries?

The first line contains one integer $q$ ($1 \le q \le 500000$) — the number of queries.

Then $q$ lines follow, each describing a query. The $i$-th line contains three integers $t_i$, $x_i$ and $y_i$ ($1 \le t_i \le 2$). If $t_i = 1$, then it is a query of the first type, $1 \le x_i \le 500000$, and $-1000 \le y_i \le 1000$. If $t_i = 2$, then it it a query of the second type, $1 \le x_i \le 500000$, and $0 \le y_i < x_i$.

It is guaranteed that there will be at least one query of type $2$.

For each query of type $2$ print one integer — the answer to it.