My Squares
Part 2

16x16

	86	203	166	59	38	107	214	155	6	75	246	187	230	139	22	123
	173	52	93	196	221	148	45	100	253	180	13	68	29	116	237	132
	91	198	171	54	43	102	219	150	11	70	251	182	235	134	27	118
	164	61	84	205	212	157	36	109	244	189	4	77	20	125	228	141
	83	206	163	62	35	110	211	158	3	78	243	190	227	142	19	126
	167	58	87	202	215	154	39	106	247	186	7	74	23	122	231	138
	94	195	174	51	46	99	222	147	14	67	254	179	238	131	30	115
	170	55	90	199	218	151	42	103	250	183	10	71	26	119	234	135
	81	208	161	64	33	112	209	160	1	80	241	192	225	144	17	128
	165	60	85	204	213	156	37	108	245	188	5	76	21	124	229	140
	96	193	176	49	48	97	224	145	16	65	256	177	240	129	32	113
	172	53	92	197	220	149	44	101	252	181	12	69	28	117	236	133
	95	194	175	50	47	98	223	146	15	66	255	178	239	130	31	114
	169	56	89	200	217	152	41	104	249	184	9	72	25	120	233	136
	82	207	162	63	34	111	210	159	2	79	242	191	226	143	18	127
	168	57	88	201	216	153	40	105	248	185	8	73	24	121	232	137
					514
	47	98	223	146	514
	217	152	41	104	514
	34	111	210	159	514
	216	153	40	105	514
	514	514	514	514	514

This square was also produced using Franklin’s method. It’s the same as the square in Part 1 with two exceptions. I’ve given up symmetry to gain imbedded 4x4s and 12x12s. All 4x4s and 12x12s with the upper left corner at the intersections of row/column 1,5,9 and 13 are pandiagonal magic squares. That applies to all orders that are odd multiples of four in larger squares.

Return to My Squares Part 1

continue to My Squares Part 3