I have to solve a system of ordinary differential equations of the form:

```
dx/ds = 1/x * [y* (g + s/y) - a*x*f(x^2,y^2)]
dy/ds = 1/x * [-y * (b + y) * f()] - y/s - c
```

where x, and y are the variables I need to find out, and s is the independent variable; the rest are constants. I've tried to solve this with ode45 with no success so far:

```
y = ode45(@yprime, s, [1 1]);
function dyds = yprime(s,y)
global g a v0 d
dyds_1 = 1./y(1) .*(y(2) .* (g + s ./ y(2)) - a .* y(1) .* sqrt(y(1).^2 + (v0 + y(2)).^2));
dyds_2 = - (y(2) .* (v0 + y(2)) .* sqrt(y(1).^2 + (v0 + y(2)).^2))./y(1) - y(2)./s - d;
dyds = [dyds_1; dyds_2];
return
```

where @yprime has the system of equations. I get the following error message:

YPRIME returns a vector of length 0, but the length of initial conditions vector is 2. The vector returned by YPRIME and the initial conditions vector must have the same number of elements.

Any ideas? thanks

`g`

,`a`

,`v0`

, or`d`

remain uninitialized, thus`[]`

. Using these "coefficients" will yield an empty vector for`dyds`

. You could test this with`assert(~isempty(v0), 'v0 not initialized')`

in`yprime`

. – s.bandara Feb 5 '13 at 23:56