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);
spread_fee_portion = @(i,j,t) A(t).*exp(B(t).*x).*D(i,j);
t = (.5:.5:10);
j = (1 :1 :20);
k = 1:20
solve('cds(1)- w*sum(spread_prot_portion(1,j(k),t(k)))/sum(spread_fee_portion(1,j(k),t(k))) = 0')
```

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

`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