You are given a deck of $$$n$$$ cards numbered from $$$1$$$ to $$$n$$$ (not necessarily in this order in the deck). You have to sort the deck by repeating the following operation.

• Choose $$$2 \le k \le n$$$ and split the deck in $$$k$$$ nonempty contiguous parts $$$D_1, D_2,\dots, D_k$$$ ($$$D_1$$$ contains the first $$$|D_1|$$$ cards of the deck, $$$D_2$$$ contains the following $$$|D_2|$$$ cards and so on). Then reverse the order of the parts, transforming the deck into $$$D_k, D_{k-1}, \dots, D_2, D_1$$$ (so, the first $$$|D_k|$$$ cards of the new deck are $$$D_k$$$, the following $$$|D_{k-1}|$$$ cards are $$$D_{k-1}$$$ and so on). The internal order of each packet of cards $$$D_i$$$ is unchanged by the operation.

You have to obtain a sorted deck (i.e., a deck where the first card is $$$1$$$, the second is $$$2$$$ and so on) performing at most $$$n$$$ operations. It can be proven that it is always possible to sort the deck performing at most $$$n$$$ operations.

Examples of operation: The following are three examples of valid operations (on three decks with different sizes).

• If the deck is [3 6 2 1 4 5 7] (so $$$3$$$ is the first card and $$$7$$$ is the last card), we may apply the operation with $$$k=4$$$ and $$$D_1=$$$[3 6], $$$D_2=$$$[2 1 4], $$$D_3=$$$[5], $$$D_4=$$$[7]. Doing so, the deck becomes [7 5 2 1 4 3 6].
• If the deck is [3 1 2], we may apply the operation with $$$k=3$$$ and $$$D_1=$$$[3], $$$D_2=$$$[1], $$$D_3=$$$[2]. Doing so, the deck becomes [2 1 3].
• If the deck is [5 1 2 4 3 6], we may apply the operation with $$$k=2$$$ and $$$D_1=$$$[5 1], $$$D_2=$$$[2 4 3 6]. Doing so, the deck becomes [2 4 3 6 5 1].