Your equations are linear, so there is no reason to be using fsolve. I was able to obtain the coefficient matrix A for your linear system using func2mat from the File Exchange,
A=full(func2mat( @(x)CoeffFun(x,Temp,CP,S,H) ,zeros(7,1))),
function y = CoeffFun(x,Temp,CP,S,H)
Temp=Temp(:);
y = -[ - 8.314*(x(1)+x(2)*Temp+x(3)*Temp.^2+x(4)*Temp.^3+x(5)*Temp.^4);
- 8.314*(x(1)*log(Temp)+x(2)*Temp+x(3)/2*Temp.^2+x(4)/3*Temp.^3+x(5)/4*Temp.^4+x(7));
- 8.314*(x(1)*Temp+x(2)*Temp.^2/2+x(3)/3*Temp.^3+x(4)/4*Temp.^4+x(5)/5*Temp.^5+x(6))];
end
The condition number for you A matrix is very poor, so it's not too surprising that you don't get a good result.
>> cond(A)
ans =
3.2818e+19
I wonder if Temp is expressed in the correct units? The current units result in an insane order of magnitude for the coefficients,
>> max(abs(A(:)))
ans =
1.6238e+17
