Holey L Shapes from Two Pentominoes

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.

Here I study the problem of forming an L-shaped (six-sided) polyomino with copies of two pentominoes, using at least one of each, and allowing one-cell holes that do not touch the perimeter or one another, not even at a point. If you find a solution smaller than one of mine, please write!

Nomenclature

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

Table

This table shows the smallest total number of two pentominoes known to be able to tile a holey L-shaped polyomino:

	F	I	L	N	P	T	U	V	W	X	Y	Z
F	*	33	16	×	15	×	10	21	×	×	21	×
I	33	*	10	32	10	26	11	10	37	44	22	38
L	16	10	*	10	10	16	11	10	15	26	16	22
N	×	32	10	*	10	36	26	21	×	×	26	×
P	15	10	10	10	*	10	10	10	20	26	10	10
T	×	26	16	36	10	*	23	27	62	×	21	×
U	10	11	11	26	10	23	*	11	34	21	10	38
V	21	10	10	21	10	27	11	*	11	×	11	10
W	×	37	15	×	20	62	34	11	*	×	21	×
X	×	44	26	×	26	×	21	×	×	*	44	×
Y	21	22	16	26	10	21	10	11	21	44	*	25
Z	×	38	22	×	10	×	38	10	×	×	25	*

Solutions

So far as I know, these solutions have the fewest possible cells. They are not necessarily uniquely minimal.

10 Cells

11 Cells

15 Cells

16 Cells

20 Cells

21 Cells

22 Cells

23 Cells

25 Cells

26 Cells

27 Cells

32 Cells

33 Cells

34 Cells

36 Cells

37 Cells

38 Cells

44 Cells

62 Cells

Last revised 2023-03-10.

Back to Polyomino and Polyking Tiling < Polyform Tiling < Polyform Curiosities

Col. George Sicherman [ HOME | MAIL ]

	F	I	L	N	P	T	U	V	W	X	Y	Z
F	*	33	16	×	15	×	10	21	×	×	21	×
I	33	*	10	32	10	26	11	10	37	44	22	38
L	16	10	*	10	10	16	11	10	15	26	16	22
N	×	32	10	*	10	36	26	21	×	×	26	×
P	15	10	10	10	*	10	10	10	20	26	10	10
T	×	26	16	36	10	*	23	27	62	×	21	×
U	10	11	11	26	10	23	*	11	34	21	10	38
V	21	10	10	21	10	27	11	*	11	×	11	10
W	×	37	15	×	20	62	34	11	*	×	21	×
X	×	44	26	×	26	×	21	×	×	*	44	×
Y	21	22	16	26	10	21	10	11	21	44	*	25
Z	×	38	22	×	10	×	38	10	×	×	25	*

	F	I	L	N	P	T	U	V	W	X	Y	Z
F	*	33	16	×	15	×	10	21	×	×	21	×
I	33	*	10	32	10	26	11	10	37	44	22	38
L	16	10	*	10	10	16	11	10	15	26	16	22
N	×	32	10	*	10	36	26	21	×	×	26	×
P	15	10	10	10	*	10	10	10	20	26	10	10
T	×	26	16	36	10	*	23	27	62	×	21	×
U	10	11	11	26	10	23	*	11	34	21	10	38
V	21	10	10	21	10	27	11	*	11	×	11	10
W	×	37	15	×	20	62	34	11	*	×	21	×
X	×	44	26	×	26	×	21	×	×	*	44	×
Y	21	22	16	26	10	21	10	11	21	44	*	25
Z	×	38	22	×	10	×	38	10	×	×	25	*

	F	I	L	N	P	T	U	V	W	X	Y	Z
F	*	33	16	×	15	×	10	21	×	×	21	×
I	33	*	10	32	10	26	11	10	37	44	22	38
L	16	10	*	10	10	16	11	10	15	26	16	22
N	×	32	10	*	10	36	26	21	×	×	26	×
P	15	10	10	10	*	10	10	10	20	26	10	10
T	×	26	16	36	10	*	23	27	62	×	21	×
U	10	11	11	26	10	23	*	11	34	21	10	38
V	21	10	10	21	10	27	11	*	11	×	11	10
W	×	37	15	×	20	62	34	11	*	×	21	×
X	×	44	26	×	26	×	21	×	×	*	44	×
Y	21	22	16	26	10	21	10	11	21	44	*	25
Z	×	38	22	×	10	×	38	10	×	×	25	*