Tiling Right Trapezoidal Polyominoes with Three 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 tiling a polyomino shaped like a right trapezoid with copies of three pentominoes, using at least one of each. Such a polyomino has three straight sides, two of them parallel, and one zigzag side. For this problem, the polyomino may be triangular.

If you find a smaller solution than one of mine or solve an unsolved case, please write!

Nomenclature

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

Table

This table shows the smallest total number of three pentominoes known to be able to tile a trapezoidal polyomino:

FIL —	FNV 9	FUZ —	INU 10	IUY 6	LPV 5	LWZ 8	NVW 3	PVX 7	TXZ —
FIN 9	FNW —	FVW 12	INV 6	IUZ —	LPW 3	LXY 7	NVX 20	PVY 5	TYZ —
FIP 5	FNX —	FVX —	INW 12	IVW 11	LPX 6	LXZ —	NVY 6	PVZ 5	UVW 27
FIT —	FNY 6	FVY 10	INX 27	IVX —	LPY 3	LYZ 7	NVZ 6	PWX 6	UVX —
FIU —	FNZ —	FVZ —	INY 6	IVY 3	LPZ 6	NPT 5	NWX —	PWY 3	UVY 10
FIV —	FPT 5	FWX —	INZ 18	IVZ —	LTU —	NPU 5	NWY 4	PWZ 3	UVZ —
FIW 12	FPU 3	FWY 6	IPT 5	IWX 21	LTV —	NPV 5	NWZ —	PXY 5	UWX —
FIX —	FPV 4	FWZ —	IPU 5	IWY 4	LTW 6	NPW 5	NXY 10	PXZ 7	UWY 3
FIY 8	FPW 5	FXY 15	IPV 5	IWZ 14	LTX —	NPX 7	NXZ —	PYZ 3	UWZ —
FIZ —	FPX 7	FXZ —	IPW 4	IXY 18	LTY 6	NPY 3	NYZ 8	TUV —	UXY 15
FLN 6	FPY 4	FYZ 8	IPX 5	IXZ —	LTZ —	NPZ 5	PTU 6	TUW 15	UXZ —
FLP 4	FPZ 5	ILN 3	IPY 3	IYZ 14	LUV —	NTU 9	PTV 6	TUX —	UYZ 9
FLT —	FTU —	ILP 5	IPZ 5	LNP 3	LUW 4	NTV 9	PTW 3	TUY 10	VWX 35
FLU —	FTV —	ILT —	ITU —	LNT 7	LUX —	NTW 6	PTX 7	TUZ —	VWY 5
FLV —	FTW 15	ILU —	ITV —	LNU 6	LUY 6	NTX 33	PTY 5	TVW 10	VWZ 11
FLW 4	FTX —	ILV —	ITW 7	LNV 6	LUZ —	NTY 6	PTZ 6	TVX —	VXY 27
FLX —	FTY 6	ILW 3	ITX —	LNW 4	LVW 6	NTZ 20	PUV 6	TVY 15	VXZ —
FLY 6	FTZ —	ILX —	ITY 10	LNX 10	LVX —	NUV 9	PUW 5	TVZ —	VYZ 3
FLZ —	FUV —	ILY 3	ITZ —	LNY 3	LVY 6	NUW 14	PUX 6	TWX 18	WXY 7
FNP 5	FUW 3	ILZ —	IUV —	LNZ 6	LVZ —	NUX —	PUY 3	TWY 3	WXZ —
FNT 15	FUX —	INP 5	IUW 18	LPT 5	LWX 7	NUY 6	PUZ 5	TWZ 11	WYZ 4
FNU —	FUY 6	INT 3	IUX —	LPU 6	LWY 6	NUZ —	PVW 3	TXY —	XYZ —