interp1 is incompatible with symbolic parameters. You CANNOT use interp1 with solve. Period. So wherever you found that snippet of code, they were wrong.
You can use a tool like fzero with interp1. fzero and interp1 are compatible.
Next, looking at your problem, this is actually a TWO variable problem, with two equations. That is, we have known constants, a,b,c,h. And there are two unknowns. Sadly, you seem to be using p in two places at once, both as an array of known elements, and as a variable. And that is confusing as hell.
So I'll make the assumption that you have two variales, I'll call then T and p_T. That is p_T is given as:
p_T = interp1(p(:,1),p(:,2),T)
So, if I knew the value of T, then I could compute P_T. And then we have a second equation:
h = a * T + p_T * (b + c * T)
Now we can just substitute P_T in there. This reduces the problem to ONE equation, in one unknown, where you can use fzero. I've re-arranged it to be something you can see as a problem for fzero.
a * T + interp1(p(:,1),p(:,2),T) * (b + c * T) - h = 0
Now, given the variables a,b,c,h and the array p are defined as MATLAB variables in your workspace, set it up as:
fun = @(T) a * T + interp1(p(:,1),p(:,2),T) * (b + c * T) - h;
Tfinal = fzero(fun,[p(1,1),p(end,1)]);
That call will set a bracket on T, such that T must always lie between P(1,1) and P(69,1). That must make sense, since interp1 cannot intelligently evaluate its function beyond those limits anyway.
Again, a,b,c,h and p must all be previously defined in your workspace for that to work.
