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The following equation is to be solved for M by MATLAB:


It is not possible to solve this equation symbolically. In Maple it is easily possible to solve such an equation implicitly; now, is there also a pre-made function in Matlab that does this for me? I could program one myself, but as my skills are limited, its performance would not fit my needs.

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For the interested ones, this is the area-Mach number relation for supersonic flow – Ingo Aug 24 '10 at 15:08
up vote 2 down vote accepted

I would try using fzero, or if that encounters problems because of complex values/infinities, fminbnd.

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Not to be confused with F-Zero. :) en.wikipedia.org/wiki/F-Zero_(video_game) – Doresoom Aug 24 '10 at 15:01
Thanks for posting this, however, this function only gives the roots of the equation and not a numerical solution for M. Awesome game by the way :). Played the SNES version a LOT! – Ingo Aug 24 '10 at 15:09
@Ingo: Both fzero and fminbnd are numerical solvers. I'm not sure if I understand your objection -- you can trivially rewrite the equation to have a zero on the right side, yes? – Matt Mizumi Aug 24 '10 at 16:26
Matt is right -- all you have to do is f = @(M) (Atemp/At)^2 -1/M^2*((2/(gamma+1))*(1+(gamma-1)*M^2/2))^((gamma+1)/(gamma-1))) and fzero(f,M0) where M0 is an initial guess, or fminbnd if required. If you need a symbolic solution, you'll need the MATLAB symbolic toolbox, in which case, it's a simple matter of just using the solve() command. – Gilead Aug 24 '10 at 16:41
In fact, if Atemp, At and gamma are constants (which they are if you're solving for M), you can do a little bit of algebra to reduce your equation to log(M) = C1 + C2*log(2 + C3*M^2), where C1, C2, and C3 are constants. Then you can use fminbnd and restrict M to be greater than some nonzero number, say 1e-6, to avoid 0 in the log term. – Gilead Aug 24 '10 at 17:07

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