tag:blogger.com,1999:blog-3995480544618201142.post1113554977099058606..comments2024-01-17T03:10:06.828-06:00Comments on Imagining the Tenth Dimension: The World Ends in Two WeeksRob Bryantonhttp://www.blogger.com/profile/18215892812705188148noreply@blogger.comBlogger5125tag:blogger.com,1999:blog-3995480544618201142.post-24758302344640194762012-12-19T22:54:58.631-06:002012-12-19T22:54:58.631-06:00Hmm, are Qasim McCray and Lestov16 the same person...Hmm, are Qasim McCray and Lestov16 the same person then? I'm confused.<br /><br />Yes, as I said in my previous message, there are differences between the labeling your list offers and the labeling I'm going to continue to use, but it appears you have the basic idea down very well. Rob Bryantonhttps://www.blogger.com/profile/18215892812705188148noreply@blogger.comtag:blogger.com,1999:blog-3995480544618201142.post-22269172062333681662012-12-12T23:06:01.717-06:002012-12-12T23:06:01.717-06:00Thank you very much for responding. Am I correct o...Thank you very much for responding. Am I correct on which each dimension encompasses?Qasim McCraynoreply@blogger.comtag:blogger.com,1999:blog-3995480544618201142.post-17065029668766876272012-12-11T05:37:34.991-06:002012-12-11T05:37:34.991-06:00I definitely think you're on to something here...I definitely think you're on to something here, and your imaginative labeling as we ascend to ever-more-inclusive phase spaces is really fun. The idea that we can perceive of a specific version of a dimension "n" as a unique phase space, and then condense that phase space to become a point in dimension "n+1" is really just another way of stating the point-line-plane Rob Bryantonhttps://www.blogger.com/profile/18215892812705188148noreply@blogger.comtag:blogger.com,1999:blog-3995480544618201142.post-59476084555581113842012-12-10T20:02:31.498-06:002012-12-10T20:02:31.498-06:00Is this correct:
An n-dimensional line is a phase...Is this correct:<br /><br />An n-dimensional line is a phase space (sample space) of all possible states of a n-1 dimensional system, with each point on the n-dimensional line being a phase point representing a possible state of the n-1 dimensional system<br /><br />An n-dimensional line (thus every phase point on it) can be transversed on the n+1 dimension<br /><br />0-Dimensional point<br /><brLestov16noreply@blogger.comtag:blogger.com,1999:blog-3995480544618201142.post-15021870330532179492012-12-10T19:32:44.881-06:002012-12-10T19:32:44.881-06:00This is OT of your video, but I was wondering if y...This is OT of your video, but I was wondering if you could answer a question for me.This is what I gleaned from your presentation:<br /><br /><br />An n-dimensional line is a phase space (sample space) of all possible states of a n-1 dimensional system, with each point on the n-dimensional line being a phase point representing a possible state of the n-1 dimensional system<br /><br />Lestov16noreply@blogger.com