tag:blogger.com,1999:blog-4963606970537776518.post3380860059243685576..comments2024-03-14T14:39:45.804-04:00Comments on Intersections -- Poetry with Mathematics: Goldbach's conjecture -- easily stated but unsolvedJoAnne Growneyhttp://www.blogger.com/profile/04654717097635624079noreply@blogger.comBlogger2125tag:blogger.com,1999:blog-4963606970537776518.post-6856705332717012852010-11-03T08:17:58.809-04:002010-11-03T08:17:58.809-04:00I'm embarrassed to make this comment, JoAnne, ...I'm embarrassed to make this comment, JoAnne, because it shows how behind I've gotten visiting your fascinating blog. But Michelle Battiste's work is worth a Capital Yes! For doing what good poetry always does, but also for stimulating thought. My own thoughts included the not-too-profound question, has the fact that two odd integers added together will always yield an even integer been proven. My guess is no. I'm not too sure that it can't be proven that the addition of two integers will always yield an integer, though. But I can't see how. It should always yield a number, too. Could it be that even that can't be proven?!<br /><br />all best, BobVizPo-Centralhttps://www.blogger.com/profile/16289253159301582507noreply@blogger.comtag:blogger.com,1999:blog-4963606970537776518.post-31946397085259729262010-09-24T03:21:45.236-04:002010-09-24T03:21:45.236-04:00just...wow.just...wow.sarahttp://shuttertext.tumblr.comnoreply@blogger.com