tag:blogger.com,1999:blog-3055805266991720601.post7367434624810382486..comments2024-01-18T08:49:58.743-06:00Comments on Giant Battling Robots: Lanchester's Laws and Attrition Modeling, Part IIDan Eastwoodhttp://www.blogger.com/profile/14105563883467108602noreply@blogger.comBlogger3125tag:blogger.com,1999:blog-3055805266991720601.post-56934283116291886102013-03-25T21:24:07.147-05:002013-03-25T21:24:07.147-05:00Dang. You think I might have noticed that before n...Dang. You think I might have noticed that before now.Dan Eastwoodhttps://www.blogger.com/profile/14105563883467108602noreply@blogger.comtag:blogger.com,1999:blog-3055805266991720601.post-16628857234074668912013-03-25T20:22:32.673-05:002013-03-25T20:22:32.673-05:00The first equation is wrong - the right hand side ...The first equation is wrong - the right hand side should be P[k2] / P[k1]:<br /><br />((N[1]^a - n[1]^a) / (N[2]^a - n[2]^a)) = (P[k2] / P[k1])<br /><br />The second equation is correct.Anonymousnoreply@blogger.comtag:blogger.com,1999:blog-3055805266991720601.post-73475893625372812932010-07-10T07:23:47.307-05:002010-07-10T07:23:47.307-05:00Very good synopsis of Lanchester's Laws. A lot...Very good synopsis of Lanchester's Laws. A lot to think about, and as you say subtleties to trap the unwary. Ashleyhttps://www.blogger.com/profile/13666947574653683678noreply@blogger.com