Place the twelve given pentominoes into the grid so that they do not touch each other, not even diagonally. Each outlined region contains exactly one pentomino, and no pentomino is in more than one region. Pentominoes can be rotated and reflected.
(Rules from PGP IB, example (tetrominoes) from Polish Nationals 2014)
- Instead of 12 pentominoes, this puzzle can be generalised to placing a given set of polyominoes. The extreme is Regional Hexominoes from WPC 2019/Round 10, in which you literally had to place all 35 hexominoes into the grid.
History of the puzzleEdit
Most likely first appeared on 2005 Japanese "Internet Qualifier". Its author is currently unknown.