How can I solve equation with no explicit solution?
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I am trying to solve for aerosol optical thickness t, using radiative transfer equation. I have simplified the code but i need to get the final solution for t. The code is below:
%syms L k S R P u t phi alpha
PI = 3.142; k = 28.72155; L = 31.51617; S = 0.79574; R = 41.76734;
P = 0.05039; alpha = 98.0708; phi = 2.29082; u = 0.774689;
equation = (alpha -k -L == S*R*P*(1/PI)*exp(-(t/u)-(1/(6*u*t)))- L*exp(-phi*t))
solution = vpasolve(equation, t)
1 commentaire
Bjorn Gustavsson
le 16 Déc 2020
What exactly are you trying to solve for? (In a physics sense). You'll be lucky to get a solution in simple closed form. Since the aerosol-density will vary from any simple functional form in reality you will have to turn to numerical solutions sooner or later - so you might just as well turn to such methods now and get ahead in building tools and experience sooner rather than later.
Réponses (1)
Alan Stevens
le 16 Déc 2020
Are you sure your equations are correct? They seem to result in a negative value for t:
% First plot graph to see where solution might lie
tg = [-1:0.01:-0.04 NaN 0.01:0.1:2];
z = fn(tg);
plot(tg,z),grid
% Looks like a solution between 0 and -0.1
t0 = -0.1; % Initial guess
t = fzero(@fn,t0);
disp(t)
function z = fn(t)
k = 28.72155; L = 31.51617; S = 0.79574; R = 41.76734;
P = 0.05039; alpha = 98.0708; phi = 2.29082; u = 0.774689;
LHS = alpha-k-L;
RHS = S*R*P*(1/pi)*exp(-(t/u)-(1./(6*u*t)))- L*exp(-phi*t);
z = LHS - RHS;
end
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