Prime Magic Square/Examples/Order 12/Smallest with Consecutive Primes from 3

Example of Order $12$ Prime Magic Square
This order $12$ prime magic square is the smallest whose elements are consecutive odd primes starting from $3$ (including $1$).

The primes themselves are the $143$ consecutive odd primes from $3$ up to $827$.


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

\hline  1 & 823 & 821 & 809 & 811 & 797 &  19 &  29 & 313 &  31 &  23 &  37 \\ \hline 89 &  83 & 211 &  79 & 641 & 631 & 619 & 709 & 617 &  53 &  43 & 739 \\ \hline 97 & 227 & 103 & 107 & 193 & 557 & 719 & 727 & 607 & 139 & 757 & 281 \\ \hline 223 & 653 & 499 & 197 & 109 & 113 & 563 & 479 & 173 & 761 & 587 & 157 \\ \hline 367 & 379 & 521 & 383 & 241 & 467 & 257 & 263 & 269 & 167 & 601 & 599 \\ \hline 349 & 359 & 353 & 647 & 389 & 331 & 317 & 311 & 409 & 307 & 293 & 449 \\ \hline 503 & 523 & 233 & 337 & 547 & 397 & 421 & 17 & 401 & 271 & 431 & 433 \\ \hline 229 & 491 & 373 & 487 & 461 & 251 & 443 & 463 & 137 & 439 & 457 & 283 \\ \hline 509 & 199 & 73 & 541 & 347 & 191 & 181 & 561 & 577 & 571 & 163 & 593 \\ \hline 661 & 101 & 643 & 239 & 691 & 701 & 127 & 131 & 179 & 613 & 277 & 151 \\ \hline 659 & 673 & 677 & 683 & 71 &  67 &  61 &  47 &  59 & 743 & 733 &  41 \\ \hline 827 &  3 &   7 &   5 &  13 &  11 & 787 & 769 & 773 & 419 & 149 & 751 \\ \hline \end{array}$

Also see

 * Magic Constant of Smallest Prime Magic Square with Consecutive Primes from 3