A binary string is a string where every character is $$$\texttt{0}$$$ or $$$\texttt{1}$$$. Call a binary string decent if it has an equal number of $$$\texttt{0}$$$s and $$$\texttt{1}$$$s.

Initially, you have an infinite binary string $$$t$$$ whose characters are all $$$\texttt{0}$$$s. You are given a sequence $$$a$$$ of $$$n$$$ updates, where $$$a_i$$$ indicates that the character at index $$$a_i$$$ will be flipped ($$$\texttt{0} \leftrightarrow \texttt{1}$$$). You need to keep and modify after each update a set $$$S$$$ of disjoint ranges such that:

• for each range $$$[l,r]$$$, the substring $$$t_l \dots t_r$$$ is a decent binary string, and
• for all indices $$$i$$$ such that $$$t_i = \texttt{1}$$$, there exists $$$[l,r]$$$ in $$$S$$$ such that $$$l \leq i \leq r$$$.

You only need to output the ranges that are added to or removed from $$$S$$$ after each update. You can only add or remove ranges from $$$S$$$ at most $$$\mathbf{10^6}$$$ times.

More formally, let $$$S_i$$$ be the set of ranges after the $$$i$$$-th update, where $$$S_0 = \varnothing$$$ (the empty set). Define $$$X_i$$$ to be the set of ranges removed after update $$$i$$$, and $$$Y_i$$$ to be the set of ranges added after update $$$i$$$. Then for $$$1 \leq i \leq n$$$, $$$S_i = (S_{i - 1} \setminus X_i) \cup Y_i$$$. The following should hold for all $$$1 \leq i \leq n$$$:

• $$$\forall a,b \in S_i, (a \neq b) \rightarrow (a \cap b = \varnothing)$$$;
• $$$X_i \subseteq S_{i - 1}$$$;
• $$$(S_{i-1} \setminus X_i) \cap Y_i = \varnothing$$$;
• $$$\displaystyle\sum_{i = 1}^n {(|X_i| + |Y_i|)} \leq 10^6$$$.