Unless you really want to solve an ODE via Euler's method that you've written by yourself you should have a look at built-in ODE solvers.
On a sidenote: you don't need to create
x(i) inside the loop like this:
x(i+1) = x(i)+h;. Instead, you can simply write
x = xinit:h:xfinal;. Also, you may want to write
n = round(xfinal-xinit)/h); to avoid warnings.
Here are the solvers implemented by MATLAB.
ode45 is based on an explicit
Runge-Kutta (4,5) formula, the
Dormand-Prince pair. It is a one-step
solver – in computing y(tn), it needs
only the solution at the immediately
preceding time point, y(tn-1). In
general, ode45 is the best function to
apply as a first try for most
ode23 is an implementation of an
explicit Runge-Kutta (2,3) pair of
Bogacki and Shampine. It may be more
efficient than ode45 at crude
tolerances and in the presence of
moderate stiffness. Like ode45, ode23
is a one-step solver.
ode113 is a variable order
Adams-Bashforth-Moulton PECE solver.
It may be more efficient than ode45 at
stringent tolerances and when the ODE
file function is particularly
expensive to evaluate. ode113 is a
multistep solver — it normally needs
the solutions at several preceding
time points to compute the current
The above algorithms are intended to
solve nonstiff systems. If they appear
to be unduly slow, try using one of
the stiff solvers below.
ode15s is a variable order solver
based on the numerical differentiation
formulas (NDFs). Optionally, it uses
the backward differentiation formulas
(BDFs, also known as Gear's method)
that are usually less efficient. Like
ode113, ode15s is a multistep solver.
Try ode15s when ode45 fails, or is
very inefficient, and you suspect that
the problem is stiff, or when solving
a differential-algebraic problem.
ode23s is based on a modified
Rosenbrock formula of order 2. Because
it is a one-step solver, it may be
more efficient than ode15s at crude
tolerances. It can solve some kinds of
stiff problems for which ode15s is not
ode23t is an implementation of the
trapezoidal rule using a "free"
interpolant. Use this solver if the
problem is only moderately stiff and
you need a solution without numerical
damping. ode23t can solve DAEs.
ode23tb is an implementation of
TR-BDF2, an implicit Runge-Kutta
formula with a first stage that is a
trapezoidal rule step and a second
stage that is a backward
differentiation formula of order two.
By construction, the same iteration
matrix is used in evaluating both
stages. Like ode23s, this solver may
be more efficient than ode15s at crude