# Problem L

Shortest Missing Subsequences

Given a string $s$ we
say that string $t$ is a
*Subsequence* of $s$ if $t$ can be obtained from $s$ by deleting zero or more
characters of $s$. Note
that $t$ is not
necessarily a substring of $s$—that is, $t$ is not necessarily contiguous in
$s$, but the characters of
$t$ appear in the same
order as they do in $s$.

For a given subset, $v$, of the lowercase English alphabet
characters from `‘a’` to `‘z’`, we say that string $u$ is a *Missing
Subsequence* of another string $s$ if $u$ is not a *Subsequence* of $s$, but all characters in
$u$ and all the characters
of $s$ are in the set
$v$. A *Shortest Missing Subsequence* of $s$ is a *Missing
Subsequence* of $s$
with the smallest length among all *Missing
Subsequences* of $s$.

Given a set of English alphabetic characters, a target
string made up of characters from that set, and a list of query
strings made up of characters from that set, determine if each
of the query strings is a *Shortest Missing
Subsequence* of the target string.

## Input

The first line of input contains a string $v$ ($1 \le |v| \le 26$) of lowercase letters, in lexicographical order. Each letter appears at most once. This is the set of alphabetic characters.

The next line of input contains a string $s$ ($1 \le |s| \le 10^6$, $s$ only contains letters from $v$). This is the target string to be queried.

The next line contains an integer $n$ ($1 \le n \le 10^6$). This is the number of queries.

Each of the next $n$ lines contains a string $q$ ($1 \le |q| \le 10^6$, $q$ only contains letters from $v$). These are the query strings. The sum of the lengths of all query strings will not exceed $10^6$.

## Output

Output $n$ lines, one
for each query. On each line, output either $1$ if the query string is a *Shortest Missing Subsequence* of the target
string, or $0$ if it is
not. The outputs must be in the order of the input queries.

Sample Input 1 | Sample Output 1 |
---|---|

abc abcccabac 3 cbb cbba cba |
1 0 0 |