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List of forum topicsenRe: RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7902127&tstart=0#7902127
Thanks for all of the help with this problem. I have a better understanding of partitions now. I appreciate it. ]]>Oct 7, 2012 6:19:51 PMOct 7, 2012 6:19:51 PMLaC0saNostra0RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901874&tstart=0#7901874
Edward, Don't have your original post, so I can't comment on (a). On (d), my understanding of "partition of {1,2,3,4,5,6}" is that 5 must]]>Oct 6, 2012 9:19:08 PMOct 6, 2012 9:19:08 PMbenb0RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901869&tstart=0#7901869
Edward, I didn't realize that transitivity was part of the "partition" definition. But yes, if (1,3) and (3,4) are ordered pairs,]]>Oct 6, 2012 9:16:46 PMOct 6, 2012 9:16:46 PMbenb1Re: RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901853&tstart=0#7901853
]]>Oct 6, 2012 8:08:34 PMOct 6, 2012 8:08:34 PMLaC0saNostra2Re: RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901847&tstart=0#7901847
Oct 6, 2012 7:55:17 PMOct 6, 2012 7:55:17 PMLaC0saNostra1RE: Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901814&tstart=0#7901814
Edward, Since (a) gives a partition, notice that numbers in the same class are equivalent. Therefore the ordered pairs in the relation must]]>Oct 6, 2012 6:25:23 PMOct 6, 2012 6:25:23 PMbenb5Sets Forming Partitions
http://mathforum.org/kb/thread.jspa?messageID=7901796&tstart=0#7901796
Oct 6, 2012 5:38:12 PMOct 6, 2012 5:38:12 PMLaC0saNostra6