June 2012 - mathfun@mailman.xmission.com

[math-fun] projectile with quadratic air drag solution
by Warren Smith 01 Jun '12

01 Jun '12

I found this on the web posted by "pelli" on "reddit". Brilliant! Fantastic! Here's a forward solution (found by reverse-engineering the answer): Consider a projectile moving in gravity with quadratic air resistance. The governing equations are u' = -a * u * sqrt( u^2 + v^2 ) v' = -a * v * sqrt( u^2 + v^2 ) - g where a is the coefficient of air resistance defined by |F| = ma|v|2 . Cross-multiply and rearrange to find a * sqrt( u^2 + v^2 ) * (u*v'-v*u') = g*u' Substitute v = s*u and separate variables: a * sqrt( 1 + s^2 ) * s' = g*u'/u^3 Integrate both sides to get the answer: g/u^2 + a*(v * sqrt( u^2 + v^2 )/u^2 + arcsinh|v/u|) = const

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[math-fun] generating function
by Kimberling, Clark 01 Jun '12

01 Jun '12

Hello - Suppose that a(0), a(1), a(2), ... is a linear recurrence sequence with generating function p(x)/q(x), and that b(0), b(1), b(2), ... is a linear recurrence sequence with generating function u(x)/v(x). Does someone know a generating function for the product sequence a(0)*b(0), a(1)*b(1), a(2)*b*2), ... ? It appears that a denominator may be a polynomial whose roots are the reciprocal-products 1/(r(i)*s(j)), where r(I) ranges through all the roots of q(x) and s(j) ranges through all the roots of v(x). Clark Kimberling

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Re: [math-fun] Shouryya Ray's equation
by Henry Baker 01 Jun '12

01 Jun '12

There is a bright side to this story. If governments could have solved shell trajectories in closed form, there wouldn't have been as much impetus for developing the computer (computing shell trajectories and astrological predictions seem to have been the primary computational tasks down through the centuries). At 06:05 AM 6/1/2012, James Aaronson wrote: >If anyone's German is up to scratch, then you may be able to make some >sense of his poster, which is available (though only partially visible) >here: >http://img838.imageshack.us/img838/8750/mshouryyaray.jpg > >The highest ranking answer on the physics.stackexchange discussion ( >http://physics.stackexchange.com/questions/28931/what-are-the-precise-state… >) >seems to have analysed the poster. Essentially, Ray works out series >expansions for u and v, and then somehow works out the conserved quantity >Adam provided. > >Apparently, the book referenced in this post ( >http://www.reddit.com/r/math/comments/u74no/supposedly_this_is_a_new_formul… >) >(the book is in French) discusses the formula as well. > >On Thu, May 31, 2012 at 9:01 PM, Adam P. Goucher <apgoucher(a)gmx.com> wrote: > >> An Indian teenager in Dresden supposedly came up with a new closed >>> form solution to a trajectory in the presence of air resistance. >> >> Apparently, it assumes quadratic drag. There's a derivation here: >> >> http://www.reddit.com/r/**worldnews/comments/u7551/teen_** >> solves_newtons_300yearold_**riddle_an/c4t03fl<http://www.reddit.com/r/worldnews/comments/u7551/teen_solves_newtons_300yea…> >> >> Sincerely, >> >> Adam P. Goucher > >-- >James

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Re: [math-fun] Shouryya Ray's equation
by Dan Asimov 01 Jun '12

01 Jun '12

There's a long debate in Wikipedia, or maybe Wikimedia, on whether to delete an article on Shouryya Ray. The consensus seems to be that there is no verifiable source, other than the media yammering to itself and copying each other's yammerings. There are also assertions that the equation in question was already discovered in the late 1800's. My guess is that the teenager actually did rediscover some equation that he did not know was not new, and the world press -- with a collective IQ below room temperature -- has just parroted what was on his science fair project. --Dan << An Indian teenager in Dresden supposedly came up with a new closed form solution to a trajectory in the presence of air resistance. Supposedly, the solution involved cos, sqrt and _asinh_ (this last one is what intrigued me). However, I haven't been able to find his actual paper after consulting with Google. Does anyone here have the reference or link ? >> ________________________________________________________________________________________ It goes without saying that .

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[math-fun] combinatorial programming contest
by James Buddenhagen 01 Jun '12

01 Jun '12

Since there are clearly wizards here (both mathematicians and programmers) I thought some here might be interested in the just-started programming contest here: http://infinitesearchspace.dyndns.org/ . It is just for fun. The object is to find the largest square grid that can be colored with C colors so that corners of sub-rectangles are not all the same color, and to do this for various values of C (each value a sub-contest). You just register and then start submitting your best results. Since this is somewhat mathematical and for fun, I hope it is not inappropriate to mention here.

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