The equations for x and y (eqnx and eqny) are polynomials of degree 3 in x resp. y.
They might have several real solutions x and y.
I arbitrarily took the last one in the list MATLAB returns.
You might want to examine sol_x and sol_y in the below loop in more detail.
syms x y T
eqnx = 5.8e30*exp(-2.562/T)*((0.2-x)/(x-0.02))^(-2) == 0.577*(0.4-2*x);
solx = solve(eqnx,x,'MaxDegree',3);
eqny = 5.8e29*exp(-2.562/T)*((0.2-y)/(y-0.02))^(-2) == 0.577*(0.4-2*y);
soly = solve(eqny,y,'MaxDegree',3);
format long
T_array=linspace(273,700,1000);
for i = 1:numel(T_array)
sol_x = double(subs(solx,T,T_array(i)));
sol_x_real = sol_x(abs(imag(sol_x))<1e-15);
x_array(i) = sol_x_real(end);
SO1(i) = 0.577*(0.4-2*x_array(i));
sol_y = double(subs(soly,T,T_array(i)));
sol_y_real = sol_y(abs(imag(sol_y))<1e-15);
y_array(i) = sol_y_real(end);
SS1(i) = 0.577*(0.4-2*y_array(i));
end
%MO
MO = 0.6;
% yy
yy = (MO+SO1)./(1-MO*SO1);
% M equation
MM = 0.6+4.7e-5*T_array;
% YY
YY= (MM + SS1)./(1-MM.*SS1);
% Plot a figure
plot(T_array-273, -2.3*(YY-yy))
