# Using the solve function in Matlab

I need to solve a non-linear equation in matlab. Please see the code for details.

``````sigma = .25;
beta = 2;
alpha = .1;
eta = .025;

syms x

phi = sqrt(2.*sigma.^2 + beta.^2);
kappa = (beta + phi)./(beta - phi);

w = .5;

D is imported data;

A = @(t) exp((alpha*(beta+phi).*t)./sigma.^2).*...
((1-kappa)./(1-kappa.*exp(phi.*t))).^(2.*alpha./sigma.^2);

B = @(t) (beta - phi)./sigma.^2 + 2.*phi./(sigma.^2.*(1-kappa.*exp(phi.*t)));

C = @(t) exp(eta^2.*t^3/6);

G = @(t) (alpha./phi).*(exp(phi.*t)-1).*exp(alpha.*(beta+phi).*t./sigma^2).*...
((1-kappa)./(1-kappa.*exp(phi.*t))).^((2.*alpha./sigma^2) + 1);

H = @(t) exp((alpha.*(beta+phi) + phi.*sigma^2)./sigma^2).*...
((1-kappa)./(1-kappa.*exp(phi.*t))).^((2.*alpha./sigma^2) + 2);

spread_prot_portion = @(i,j,t) exp(B(t).*x).*D(i,j).*(G(t) + H(t).*x);

t = (.5:.5:10);
j = (1 :1 :20);
k = 1:20

``````

Note that cds is loaded data. I need to solve for x. That is why it is the only variable in syms and all other variable are given. unfortunately for the sums I cannot just write out an expression. Some help would be greatly appreciated

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are you sure that solve is the correct method? i remember fsolve and more others. –  berkay Oct 19 '13 at 23:48
Pretty hard for us to help when you give an example that won't run because it's based on imported data. Also, Are you looking for an analytic/symbolic solution for `x`, i.e., an equation? Or a numeric solution, i.e., an actual number? If it's the latter, then @berkay has point and you're using the wrong tool for the job and shouldn't be using symbolic math at all, but rather `fsolve` and floating-point. –  horchler Oct 20 '13 at 13:55

For a situation like this you need to use a for loop to find the sum. Suppose

``````syms x;
f = @(i, j) i + j + x;
``````

then to sum over all indices of `i` and `j` you need

``````total = 0;
for i = 1:10
for j = 1:10
total = total + f(i, j);
end
end
display(total) %// total = 100*x + 1100
``````

then to solve for `total = 100` you write (note the lack of apostrophes)

``````xSol = solve(total - 100);
``````

Note however, you are trying to find the exact solution to a very difficult problem. It may be better to use fsolve, with

``````xSol = fsolve(@fun, estimateOfx);
``````

where fun the function that calculates the sum of `f(i,j)` for a specific value of `x`, i.e.

``````function total = fun(x)
f = @(i, j) i + j + x;
%// Find total as above
end
``````

Here is an example where explained `fsolve` a little bit more.

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