Solving symbolically for variables that are equal to several equations
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Hello,
I'm trying to solve for any vaiable in a series of equations that are all equal to one another such as in the equation bellow.
In it, I know that "v" has two possible solutions, and I'd like to find a way to have MATLAB recognize this and give me both possible solutions as an array. So far, I have gotten my test program to give me one solution at a time, but not both.
clear all
close all
clc
syms xi v r a mu
spec_eng1 = [xi == (v^2)/2-mu/r, xi == -mu/(2*a)]
solve(spec_eng1, v)
% ans =
% Empty sym: 0-by-1
sol = eng.feval_internal('solve', eqns, vars, solveOptions);
spec_eng2 = xi == (v^2)/2-mu/r == -mu/(2*a)
solve(spec_eng2, v)
% Error using mupadengine/feval_internal
% Invalid argument.
%
% Error in sym/solve (line 293)
% sol = eng.feval_internal('solve', eqns, vars, solveOptions);
% These outputs the solutions, but MATLAB doesn't know their related to
% one another
spec_eng3 = xi == (v^2)/2-mu/r
solve(spec_eng3, v)
% ans =
%
% (2^(1/2)*(mu + r*xi)^(1/2))/r^(1/2)
% -(2^(1/2)*(mu + r*xi)^(1/2))/r^(1/2)
spec_eng4 = -mu/(2*a) == (v^2)/2-mu/r
solve(spec_eng4, v)
% ans =
%
% (mu^(1/2)*(2*a - r)^(1/2))/(a^(1/2)*r^(1/2))
% -(mu^(1/2)*(2*a - r)^(1/2))/(a^(1/2)*r^(1/2))
I don't really know what else to say. Any help with this would be appreicated. Thanks
Respuestas (2)
syms xi v r a mu
spec_eng1 = [xi == (v^2)/2-mu/r];
solve(spec_eng1, v)
spec_eng2 = (v^2)/2-mu/r == -mu/(2*a);
solve(spec_eng2, v)
Hmm. Don't know why solve doesn't find a solution,
syms xi v r a mu
spec_eng1 = [xi == (v^2)/2-mu/r, xi == -mu/(2*a)]
solve(spec_eng1,v,'ReturnConditions',true)
Here's a workaround that for this simple case returns both solutions in an array.
vsol = solve(subs(spec_eng1(1),xi,solve(spec_eng1(2),xi)),v)
Or reverse the order
vsol = solve(subs(spec_eng1(2),xi,solve(spec_eng1(1),xi)),v)
3 comentarios
Walter Roberson
el 13 de Sept. de 2023
You cannot successfully solve() N equality equations for fewer than N variables. If some of the equations are inequalities then there is a chance it would work, but typically it would fail anyhow.
So if we know we want xi to be eliminated from the expression for v, we'd force that by adding to the solved-for variables, I suppose.
syms xi v r a mu
spec_eng1 = [xi == (v^2)/2-mu/r, xi == -mu/(2*a)]
sol = solve(spec_eng1,[v xi])
sol.v
sol.xi
Yes, exactly,
In some cases you can do, for example,
syms xi v r a mu
spec_eng1 = [xi == (v^2)/2-mu/r, xi == -mu/(2*a)]
arrayfun(@(X) isolate(X, mu), spec_eng1)
but not in the case of v because the second expression does not contain v
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