You are given a permutation $$$a_1, a_2, \dots, a_n$$$ of numbers from $$$1$$$ to $$$n$$$. Also, you have $$$n$$$ sets $$$S_1,S_2,\dots, S_n$$$, where $$$S_i=\{a_i\}$$$. Lastly, you have a variable $$$cnt$$$, representing the current number of sets. Initially, $$$cnt = n$$$.

We define two kinds of functions on sets:

$$$f(S)=\min\limits_{u\in S} u$$$;

$$$g(S)=\max\limits_{u\in S} u$$$.

You can obtain a new set by merging two sets $$$A$$$ and $$$B$$$, if they satisfy $$$g(A)<f(B)$$$ (Notice that the old sets do not disappear).

Formally, you can perform the following sequence of operations:

• $$$cnt\gets cnt+1$$$;

• $$$S_{cnt}=S_u\cup S_v$$$, you are free to choose $$$u$$$ and $$$v$$$ for which $$$1\le u, v < cnt$$$ and which satisfy $$$g(S_u)<f(S_v)$$$.

You are required to obtain some specific sets.

There are $$$q$$$ requirements, each of which contains two integers $$$l_i$$$,$$$r_i$$$, which means that there must exist a set $$$S_{k_i}$$$ ($$$k_i$$$ is the ID of the set, you should determine it) which equals $$$\{a_u\mid l_i\leq u\leq r_i\}$$$, which is, the set consisting of all $$$a_i$$$ with indices between $$$l_i$$$ and $$$r_i$$$.

In the end you must ensure that $$$cnt\leq 2.2\times 10^6$$$. Note that you don't have to minimize $$$cnt$$$. It is guaranteed that a solution under given constraints exists.