tag:blogger.com,1999:blog-15628310.post7131993657611464400..comments2024-02-11T22:40:20.959-05:00Comments on Question of the day: Magic Square TimeAnonymoushttp://www.blogger.com/profile/18153935609499338685noreply@blogger.comBlogger5125tag:blogger.com,1999:blog-15628310.post-36800381095696052432009-05-19T08:00:00.000-04:002009-05-19T08:00:00.000-04:00Hey, can I ask something. Let's say that T=2; if t...Hey, can I ask something. Let's say that T=2; if this happens to the first T, then it will happen to every T in the magic square. If you try thinking like that, in the end it's obvious that the numbers are all the same. So T=E=S=F. But magic squares can't have two numbers with the same value. So I found out that having the same letter twice or more times in a magic square is WRONG. If we suppose that they are all different to each other then.... I think that Mike's got the right idea!!Biller25https://www.blogger.com/profile/12020887916114220618noreply@blogger.comtag:blogger.com,1999:blog-15628310.post-81886744350168362542007-02-26T10:22:00.000-05:002007-02-26T10:22:00.000-05:0010 20 68 12 1618 4 14Well, I've never heard of all...10 20 6<BR/>8 12 16<BR/>18 4 14<BR/><BR/>Well, I've never heard of all these rules for magic squares, so I can't really comment on them. Actually, until I started doing these pages, I'd never heard of magic squares at all.Anonymoushttps://www.blogger.com/profile/18153935609499338685noreply@blogger.comtag:blogger.com,1999:blog-15628310.post-24553976403038188692007-02-24T23:11:00.000-05:002007-02-24T23:11:00.000-05:00Well, I think a formal magic square has numbers 1-...Well, I think a formal magic square has numbers 1-n^2, where n is the dimension of the square.Abehttps://www.blogger.com/profile/04424868492071587450noreply@blogger.comtag:blogger.com,1999:blog-15628310.post-12473813032264747972007-02-23T15:43:00.000-05:002007-02-23T15:43:00.000-05:00I though a Magic Sqaure also had the rule that no ...I though a Magic Sqaure also had the rule that no number can be repeated in the square. I don't have a solution yet, but there should be one that also meets this criteria.Mr. Donhttps://www.blogger.com/profile/04844019232053683131noreply@blogger.comtag:blogger.com,1999:blog-15628310.post-33414340523204920722007-02-23T10:28:00.000-05:002007-02-23T10:28:00.000-05:0010 10 1618 12 68 14 1410 10 16<BR/>18 12 6<BR/>8 14 14Abehttps://www.blogger.com/profile/04424868492071587450noreply@blogger.com