tag:blogger.com,1999:blog-25559166.post8568546208099446489..comments2023-10-07T06:10:20.093-06:00Comments on Boom's Bardic Blog: Comedy BronzeBoomhttp://www.blogger.com/profile/08852111036261040048noreply@blogger.comBlogger4125tag:blogger.com,1999:blog-25559166.post-46621787276601959152008-11-10T11:58:00.000-07:002008-11-10T11:58:00.000-07:00Well written article.Well written article.Anonymousnoreply@blogger.comtag:blogger.com,1999:blog-25559166.post-90012703929211517622007-04-14T00:52:00.000-06:002007-04-14T00:52:00.000-06:00An nth degree polynomial factors provably into 4 o...An nth degree polynomial factors provably into 4 or less geeks. It could also be said that it really only takes one geek and a supercomputer. Pssh, I already solved that give me a REAL challenge. 1 Geek to research it, then get side tracked on miscellaneous other cool topics, 1 geek to start it but get side tracked on other miscellaneous cool projects, 1 geek to eventually get around to it, and three to discuss it without actually doing anything on it. 1 really good one. What you mean you haven't factored it yet by now? 1 But it then takes a veritable army to understand what the geek just rambled.... The list diverges.Boomhttps://www.blogger.com/profile/08852111036261040048noreply@blogger.comtag:blogger.com,1999:blog-25559166.post-35619690397905686432007-04-14T00:02:00.000-06:002007-04-14T00:02:00.000-06:00Haha! Okay, you are clearly skilled at this, so I...Haha! Okay, you are clearly skilled at this, so I challenge you to finish a classic "How many does it take?" joke. So, How many geeks does it take to factor an nth degree polynomial?Anonymousnoreply@blogger.comtag:blogger.com,1999:blog-25559166.post-19593897101864742082007-03-30T10:02:00.000-06:002007-03-30T10:02:00.000-06:00Bwhahahahaha!YEah! YEah! Yeah! Amazing! I connecte...Bwhahahahaha!<BR/><BR/>YEah! YEah! Yeah! Amazing! <BR/><BR/>I connected.<BR/><BR/>You're good at this...Kihttps://www.blogger.com/profile/14626379470157786313noreply@blogger.com