tag:blogger.com,1999:blog-7622029409826784428.post7652053694856647362..comments2023-08-12T10:40:28.883+02:00Comments on <center>Variantes de Sudoku</center>: Little killer N°8Fred76http://www.blogger.com/profile/03805064563109466105noreply@blogger.comBlogger3125tag:blogger.com,1999:blog-7622029409826784428.post-29675770537185082172018-08-16T18:12:03.782+02:002018-08-16T18:12:03.782+02:00done, tough onedone, tough oneAashay Patilhttps://www.blogger.com/profile/08766535627647305689noreply@blogger.comtag:blogger.com,1999:blog-7622029409826784428.post-2475837761488286112015-03-05T11:36:01.674+01:002015-03-05T11:36:01.674+01:00Hi Joshua,
Thanks for your comments. You make sudo...Hi Joshua,<br />Thanks for your comments. You make sudoku variants in your math class? sounds great !<br /><br />[spoiler] Yes, the purpose of this one was to deal with minimum/maximum sums for groups of diagonals, without having a minimum or maximum for a single diagonal. That makes it a hard sudoku.Fred76https://www.blogger.com/profile/03805064563109466105noreply@blogger.comtag:blogger.com,1999:blog-7622029409826784428.post-85196884670700063322015-03-05T05:09:58.950+01:002015-03-05T05:09:58.950+01:00This was a great one for me to use in math class! ...This was a great one for me to use in math class! There's some key understandings about the minimum and maximum possible sum of various funny-shaped regions that we can use here. Some of my kakuro knowledge definitely came in handy! And once I solved it, it seemed so much easier the second time when doing it with my class -- lots of the important steps were very memorable! Joshua Zuckerhttps://www.blogger.com/profile/04689961247338617418noreply@blogger.com