Comments for ksoileau
https://ksoileau.wordpress.com
Just another WordPress.com siteWed, 01 Feb 2012 17:16:44 +0000hourly1http://wordpress.com/Comment on Hello world! by Mr WordPress
https://ksoileau.wordpress.com/2012/02/01/hello-world/#comment-1
Wed, 01 Feb 2012 17:16:44 +0000http://ksoileau.wordpress.com/?p=1#comment-1Hi, this is a comment. To delete a comment, just log in, and view the posts’ comments, there you will have the option to edit or delete them.
]]>Comment on Order extensions of totally ordered sets by Kerry Soileau
https://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-6
Sat, 13 Feb 2010 18:16:40 +0000http://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-6OK, thanks for your suggestion!
]]>Comment on Order extensions of totally ordered sets by Peter Nicol
https://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-5
Sat, 13 Feb 2010 18:16:40 +0000http://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-5Whitespace — First para is unreadable…
]]>Comment on Order extensions of totally ordered sets by Peter Nicol
https://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-7
Sat, 13 Feb 2010 17:42:48 +0000http://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-7For the purposes of this conversation, my background is in publishing. Just talking about how all the sentences run on, with no whitespace to improve readability. Chunking is good…
]]>Comment on Order extensions of totally ordered sets by Kerry Soileau
https://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-8
Sat, 13 Feb 2010 04:58:19 +0000http://ksoileau.wordpress.com/article/order-extensions-of-totally-ordered-sets-2p53sxhsz9c9n-5/#comment-8The knol is written for a reader with a mathematical background. It uses standard notation, and such a reader would find it readable. What is your background?
]]>Comment on A bijection of [0,1) with [0,1] by Anonymous
https://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-10
Fri, 29 Jan 2010 16:01:47 +0000http://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-10you too, can’t believe I read that as 1 – 2^-n lol
]]>Comment on A bijection of [0,1) with [0,1] by Anonymous
https://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-9
Fri, 29 Jan 2010 16:01:47 +0000http://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-9Which x is g(x) = 0 — Doesn’t G work better?Define G s.t. If x=2^(-n) for any n G(x) = 2x, Else G(x) = x.Works yes? G(0) = 0, G(1/2) = 1, G(1/4) = 1/2, G(1/2^n) = 1/(2^(n-1))
]]>Comment on A bijection of [0,1) with [0,1] by Kerry Soileau
https://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-11
Fri, 29 Jan 2010 15:31:51 +0000http://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-11No problem, have a good weekend…
]]>Comment on A bijection of [0,1) with [0,1] by Anonymous
https://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-12
Fri, 29 Jan 2010 13:25:19 +0000http://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-12Oh, misread that, sorry…
]]>Comment on A bijection of [0,1) with [0,1] by Kerry Soileau
https://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-13
Fri, 29 Jan 2010 12:51:18 +0000http://ksoileau.wordpress.com/article/a-bijection-of-0-1-with-0-1-2p53sxhsz9c9n-7/#comment-13g(1/2)=0.
]]>