Farmer John wrote down $N$ $(1 \leq N \leq 300)$ digits on pieces of paper. For each $i \in [1,N]$, the $i$-th piece of paper contains digit $a_i$ $(1 \leq a_i \leq 9)$. The cows have two favorite integers $A$ and $B$ $(1 \leq A \leq B \lt 10^{18})$, and would like you to answer $Q$ $(1 \leq Q \leq 5 \times 10^4)$ queries. For the $i$-th query, the cows will move left to right across papers $l_i \ldots r_i$ $(1 \leq l_i \leq r_i \leq N)$, maintaining an initially empty pile of papers. For each paper, they will either add it to the top of the pile, to the bottom of the pile, or neither. In the end, they will read the papers in the pile from top to bottom, forming an integer. Over all $3^{r_i - l_i + 1}$ ways for the cows to make choices during this process, count the number of ways that result in the cows reading an integer in $[A,B]$ inclusive, and output this number modulo $10^9 + 7$.

The first line contains three space-separated integers $N$, $A$, and $B$. The second line contains $N$ space-separated digits $a_1, a_2, \ldots, a_N$. The third line contains an integer $Q$, the number of queries. The next $Q$ lines each contain two space-separated integers $l_i$ and $r_i$.

For each query, a single line containing the answer.

For the first query, there are nine ways Bessie can stack papers when reading the interval $[1,2]$: - Bessie can ignore $1$ then ignore $2$, getting $0$. - Bessie can ignore $1$ then add $2$ to the top of the stack, getting $2$. - Bessie can ignore $1$ then add $2$ to the bottom of the stack, getting $2$. - Bessie can add $1$ to the top of the stack then ignore $2$, getting $1$. - Bessie can add $1$ to the top of the stack then add $2$ to the top of the stack, getting $21$. - Bessie can add $1$ to the top of the stack then add $2$ to the bottom of the stack, getting $12$. - Bessie can add $1$ to the bottom of the stack then ignore $2$, getting $1$. - Bessie can add $1$ to the bottom of the stack then add $2$ to the top of the stack, getting $21$. - Bessie can add $1$ to the bottom of the stack then add $2$ to the bottom of the stack, getting $12$. Only the $2$ ways that give $21$ yield a number between $13$ and $327$, so the answer is $2$.