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Day 16: Permutation Promenade
You come upon a very unusual sight; a group of programs here appear to be dancing.
There are sixteen programs in total, named a through p. They start by standing in a line:
a stands in position 0, b stands in position 1, and so on until p, which stands in
position 15.
The programs’ dance consists of a sequence of dance moves:
- Spin, written
sX, makesXprograms move from the end to the front, but maintain their order otherwise. (For example,s3onabcdeproducescdeab). - Exchange, written
xA/B, makes the programs at positionsAandBswap places. - Partner, written
pA/B, makes the programs namedAandBswap places.
For example, with only five programs standing in a line (abcde), they could do the following
dance:
s1, a spin of size1:eabcd.x3/4, swapping the last two programs:eabdc.pe/b, swapping programseandb:baedc.
After finishing their dance, the programs end up in order baedc.
You watch the dance for a while and record their dance moves (your puzzle input). In what order are the programs standing after their dance?