Alperen has two strings, $$$s$$$ and $$$t$$$ which are both initially equal to "a".

He will perform $$$q$$$ operations of two types on the given strings:

• $$$1 \;\; k \;\; x$$$ — Append the string $$$x$$$ exactly $$$k$$$ times at the end of string $$$s$$$. In other words, $$$s := s + \underbrace{x + \dots + x}_{k \text{ times}}$$$.
• $$$2 \;\; k \;\; x$$$ — Append the string $$$x$$$ exactly $$$k$$$ times at the end of string $$$t$$$. In other words, $$$t := t + \underbrace{x + \dots + x}_{k \text{ times}}$$$.

After each operation, determine if it is possible to rearrange the characters of $$$s$$$ and $$$t$$$ such that $$$s$$$ is lexicographically smaller$$$^{\dagger}$$$ than $$$t$$$.

Note that the strings change after performing each operation and don't go back to their initial states.

$$$^{\dagger}$$$ Simply speaking, the lexicographical order is the order in which words are listed in a dictionary. A formal definition is as follows: string $$$p$$$ is lexicographically smaller than string $$$q$$$ if there exists a position $$$i$$$ such that $$$p_i < q_i$$$, and for all $$$j < i$$$, $$$p_j = q_j$$$. If no such $$$i$$$ exists, then $$$p$$$ is lexicographically smaller than $$$q$$$ if the length of $$$p$$$ is less than the length of $$$q$$$. For example, $$$\texttt{abdc} < \texttt{abe}$$$ and $$$\texttt{abc} < \texttt{abcd}$$$, where we write $$$p < q$$$ if $$$p$$$ is lexicographically smaller than $$$q$$$.