L Shapes from Three Pentominoes

  • Introduction
  • Nomenclature
  • Table
  • Solutions
  • Introduction

    A pentomino is a figure made of five squares joined edge to edge. There are 12 such figures, not distinguishing reflections and rotations. They were first enumerated and studied by Solomon Golomb.

    The problem of arranging copies of a polyomino to form a rectangle has been studied for a long time. Here I study the problem of arranging copies of three pentominoes to form an L-shaped polyomino.

    See also L Shapes from Two Pentominoes.

    Nomenclature

    I use Solomon W. Golomb's original names for the pentominoes:

    Table of Results

    This table shows the smallest total number of pentominoes known to be able to tile an L-shaped polyomino with copies of three given pentominoes, using at least one of each.

    FIL 4FNV 6FUZ 5INU 5IUY 3LPV 3LWZ 6NVW 8PVX 6TXZ
    FIN 11FNWFVW 10INV 4IUZ 7LPW 4LXY 6NVX 14PVY 3TYZ 6
    FIP 4FNXFVX 15INW 9IVW 7LPX 6LXZ 8NVY 5PVZ 3UVW 30
    FIT 10FNY 5FVY 5INX 19IVX 24LPY 3LYZ 5NVZ 3PWX 6UVX 4
    FIU 3FNZFVZ 5INY 5IVY 4LPZ 3NPT 3NWXPWY 3UVY 3
    FIV 5FPT 4FWXINZ 7IVZ 3LTU 5NPU 3NWY 7PWZ 4UVZ 5
    FIW 11FPU 3FWY 6IPT 3IWX 20LTV 4NPV 3NWZPXY 5UWX 23
    FIX 15FPV 4FWZIPU 3IWY 5LTW 5NPW 5NXY 7PXZ 6UWY 4
    FIY 5FPW 5FXY 7IPV 3IWZ 7LTX 8NPX 6NXZPYZ 4UWZ
    FIZ 15FPX 8FXZIPW 4IXY 6LTY 4NPY 3NYZ 6TUV 5UXY 5
    FLN 5FPY 4FYZ 5IPX 5IXZ 15LTZ 5NPZ 4PTU 4TUW 15UXZ 23
    FLP 3FPZ 4ILN 3IPY 3IYZ 6LUV 5NTU 4PTV 3TUX 17UYZ 5
    FLT 6FTU 5ILP 3IPZ 3LNP 3LUW 6NTV 5PTW 4TUY 5VWX 43
    FLU 3FTV 10ILT 3ITU 7LNT 4LUX 3NTW 11PTX 6TUZ 16VWY 5
    FLV 4FTW 14ILU 4ITV 6LNU 4LUY 3NTX 11PTY 3TVW 5VWZ 8
    FLW 5FTXILV 3ITW 7LNV 4LUZ 5NTY 5PTZ 5TVXVXY 8
    FLX 8FTY 6ILW 4ITX 17LNW 6LVW 5NTZ 11PUV 4TVY 5VXZ 21
    FLY 5FTZILX 6ITY 5LNX 6LVX 8NUV 6PUW 5TVZ 6VYZ 4
    FLZ 4FUV 3ILY 3ITZ 10LNY 4LVY 4NUW 7PUX 3TWX 17WXY 9
    FNP 4FUW 4ILZ 5IUV 7LNZ 5LVZ 3NUX 7PUY 3TWY 7WXZ
    FNT 10FUX 5INP 3IUW 11LPT 3LWX 9NUY 4PUZ 4TWZ 14WYZ 6
    FNU 4FUY 3INT 6IUX 4LPU 3LWY 5NUZ 8PVW 4TXY 9XYZ 7

    Solutions

    So far as I know, these solutions have minimal area. They are not necessarily uniquely minimal.

    3 Tiles

    4 Tiles

    5 Tiles

    6 Tiles

    7 Tiles

    8 Tiles

    9 Tiles

    10 Tiles

    11 Tiles

    14 Tiles

    15 Tiles

    16 Tiles

    17 Tiles

    19 Tiles

    20 Tiles

    21 Tiles

    23 Tiles

    24 Tiles

    30 Tiles

    43 Tiles

    Last revised 2022-10-31.


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    Col. George Sicherman [ HOME | MAIL ]