Abhinav Soni 10-12-14 11:05:59

Hi,
I created a website where you can generate magic hyper cubes. You can generate different types of hypercubes of given order and dimension.
www.magichypercube.com
Please do have a look

Aridwana 15-07-14 07:38:10

Dear Arie
you are the best!This website is really perfect to learn the magic square. I salute you. Thank you so much you have shared with us.success for you Arie
greetingsAridwana

Darrell 10-01-14 04:57:19

Every number in the 16x16 has its diagonal opposite. Would it not be magical if every number in the square summed with its diagonal opposite to 1/8th of the magic sum?



Lorenzo sisican 11-12-13 14:04:16

I've visited your site quite many times and it's informative.

The question I am sharing is about the Magic square of Sol constructed by Agrippa---1. What was the name or description of his construction method?...2. Was this method also effective to large singly-even magic squares?

I would appreciate it very much if you can share info on this. More power.

Martin Chiu 14-11-13 21:51:08

Dear sir,
Your bimagic square is only a bimagic square and power 1 normal magic square. You can use I-Ching's trigrams to get lots of other order 8 bimagic squares and power 1 panmagic square (just like the 108 squares ), or like the universal bimagic square done by Dr. I.J. Taneja.
Your problem about from 9,31 to 56,34 respectively, just use 65 to minus the original square's number, or by the calculation of double eight trigrams.


Andre 14-04-13 13:52:17

19,10,25,23,08,09,28,27,07,43,32,42,52,36,34,40
47,57,45,46,55,56,53,44,54,29,04,14,05,02,03,12
21,20,17,18,24,22,06,16,26,15,51,31,30,49,50,35
///////////////////////////////////////////////
41,38,37
13,01,11
33,48,39






Thomas4art 28-01-12 18:04:47

www.basicform.nl ben nu 55

oplossing zat in mijn hooft, hoefde het alleen maar op ruitjespapier te schrijven.

http://www.pythagoras.nu/pyth/nummer.php?id=253 : maart 1982

4x4x4 (1 t/m 64 )
Pandiagonaal Semi-Magisch Cube

www.magichypercubes.com al gestuurd.

ging om wiki link, ik was de eerste.

http://nl.wikipedia.org/wiki/Perfect_magische_kubus

Paul Michelet 05-01-12 12:58:09

Thank you Arie for mentioning me in connection with the fantastic al-Antakii square which you show in the section on bordered squares. Your website is a delight to study; undoubtedly the best of its kind on the internet and is bound to provide many hours of gentle pleasure to anyone who studies it in detail, which I have just begun to do. Once again : congratulations on an excellent site !

Paul Michelet 27-12-11 16:58:16

Hi!
Excellent website for magic square freaks!
Question:
Why didn't Durer put the 1= a and 4 =d ( anno domini or Albrecht Durer ) the right way round ( it's easily done ) ?
i.e. 1 15 14 4 is surely the logical way of " signing " the square

T.N. Mahesh 08-09-11 05:31:36

Dear Sir,
I saw your web site it is splendid. You deserve a big round of applause.

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