Perfect Magic Cube/Examples/Order 8

Definition
Order $8$ magic cube:


 * $\begin{array}{|c|c|c|c|c|c|c|c|}

\hline 512 & 2  & 510 & 4   & 5   & 507 & 7   & 505 \\ \hline 504 & 10 & 502 & 12  & 13  & 499 & 15  & 497 \\ \hline 17 & 495 & 19  & 493 & 492 & 22  & 490 & 24  \\ \hline 25 & 487 & 27  & 485 & 484 & 30  & 482 & 32  \\ \hline 33 & 479 & 35  & 477 & 476 & 38  & 474 & 40  \\ \hline 41 & 471 & 43  & 469 & 468 & 46  & 466 & 48  \\ \hline 464 & 50 & 462 & 52  & 53  & 459 & 55  & 457 \\ \hline 456 & 58 & 454 & 60  & 61  & 451 & 63  & 449 \\ \hline \end{array} \qquad \begin{array}{|c|c|c|c|c|c|c|c|} \hline 65 & 447 & 67&	445 & 444 & 70  & 442 & 72 \\ \hline 73 & 439 & 75&	437 & 436 & 78  & 434 & 80 \\ \hline 432 & 82 & 430&	84  & 85  & 427 & 87  & 425 \\ \hline 424 & 90 & 422&	92  & 93  & 419 & 95  & 417 \\ \hline 416 & 98 & 414&	100 & 101 & 411 & 103 & 409 \\ \hline 408 & 106 & 406&	108 & 109 & 403 & 111 & 401 \\ \hline 113 & 399 & 115&	397 & 396 & 118 & 394 & 120 \\ \hline 121 & 391 & 123&	389 & 388 & 126 & 386 & 128 \\ \hline \end{array}$


 * $\begin{array}{|c|c|c|c|c|c|c|c|}

\hline 129 & 383 & 131 & 381 & 380 & 134 & 378 & 136 \\ \hline 137 & 375 & 139 & 373 & 372 & 142 & 370 & 144 \\ \hline 368 & 146 & 366 & 148 & 149 & 363 & 151 & 361 \\ \hline 360 & 154 & 358 & 156 & 157 & 355 & 159 & 353 \\ \hline 352 & 162 & 350 & 164 & 165 & 347 & 167 & 345 \\ \hline 344 & 170 & 342 & 172 & 173 & 339 & 175 & 337 \\ \hline 177 & 335 & 179 & 333 & 332 & 182 & 330 & 184 \\ \hline 185 & 327 & 187 & 325 & 324 & 190 & 322 & 192 \\ \hline \end{array} \qquad \begin{array}{|c|c|c|c|c|c|c|c|} \hline 320& 	194& 	318& 	196& 	197& 	315& 	199& 	313 \\ \hline 312& 	202& 	310& 	204& 	205& 	307& 	207& 	305 \\ \hline 209& 	303& 	211& 	301& 	300& 	214& 	298& 	216 \\ \hline 217& 	295& 	219& 	293& 	292& 	222& 	290& 	224 \\ \hline 225& 	287& 	227& 	285& 	284& 	230& 	282& 	232 \\ \hline 233& 	279& 	235& 	277& 	276& 	238& 	274& 	240 \\ \hline 272& 	242& 	270& 	244& 	245& 	267& 	247& 	265 \\ \hline 264& 	250& 	262& 	252& 	253& 	259& 	255& 	257 \\ \hline \end{array}$


 * $\begin{array}{|c|c|c|c|c|c|c|c|}

\hline 256& 	258& 	254& 	260& 	261& 	251& 	263& 	249 \\ \hline 248& 	266& 	246& 	268& 	269& 	243& 	271& 	241 \\ \hline 273& 	239& 	275& 	237& 	236& 	278& 	234& 	280 \\ \hline 281& 	231& 	283& 	229& 	228& 	286& 	226& 	288 \\ \hline 289& 	223& 	291& 	221& 	220& 	294& 	218& 	296 \\ \hline 297& 	215& 	299& 	213& 	212& 	302& 	210& 	304 \\ \hline 208& 	306& 	206& 	308& 	309& 	203& 	311& 	201 \\ \hline 200& 	314& 	198& 	316& 	317& 	195& 	319& 	193 \\ \hline \end{array} \qquad \begin{array}{|c|c|c|c|c|c|c|c|} \hline 321& 	191& 	323& 	189& 	188& 	326& 	186& 	328 \\ \hline 329& 	183& 	331& 	181& 	180& 	334& 	178& 	336 \\ \hline 176& 	338& 	174& 	340& 	341& 	171& 	343& 	169 \\ \hline 168& 	346& 	166& 	348& 	349& 	163& 	351& 	161 \\ \hline 160& 	354& 	158& 	356& 	357& 	155& 	359& 	153 \\ \hline 152& 	362& 	150& 	364& 	365& 	147& 	367& 	145 \\ \hline 369& 	143& 	371& 	141& 	140& 	374& 	138& 	376 \\ \hline 377& 	135& 	379& 	133& 	132& 	382& 	130& 	384 \\ \hline \end{array}$


 * $\begin{array}{|c|c|c|c|c|c|c|c|}

\hline 385& 	127& 	387& 	125& 	124& 	390& 	122& 	392 \\ \hline 393& 	119& 	395& 	117& 	116& 	398& 	114& 	400 \\ \hline 112& 	402& 	110& 	404& 	405& 	107& 	407& 	105 \\ \hline 104& 	410& 	102& 	412& 	413& 	99& 	415& 	97 \\ \hline 96& 	418& 	94& 	420& 	421& 	91& 	423& 	89 \\ \hline 88& 	426& 	86& 	428& 	429& 	83& 	431& 	81 \\ \hline 433& 	79& 	435& 	77& 	76& 	438& 	74& 	440 \\ \hline 441& 	71& 	443& 	69& 	68& 	446& 	66& 	448 \\ \hline \end{array} \qquad \begin{array}{|c|c|c|c|c|c|c|c|} \hline 64& 	450& 	62& 	452& 	453& 	59& 	455& 	57 \\ \hline 56& 	458& 	54& 	460& 	461& 	51& 	463& 	49 \\ \hline 465& 	47& 	467& 	45& 	44& 	470& 	42& 	472 \\ \hline 473& 	39& 	475& 	37& 	36& 	478& 	34& 	480 \\ \hline 481& 	31& 	483& 	29& 	28& 	486& 	26& 	488 \\ \hline 489& 	23& 	491& 	21& 	20& 	494& 	18& 	496 \\ \hline 16& 	498& 	14& 	500& 	501& 	11& 	503& 	9 \\ \hline 8& 	506& 	6& 	508& 	509& 	3& 	511& 	1 \\ \hline \end{array}$