so, initially, you calculate the analytical derivative of the function using the symbolic environment
syms x
y = x^3+x^2-12*x; % polynomial function
yp = diff(y,x) % symbolic derivative of y
You'll need this symbolic derivative to be turned into a matlab function, which you can to like this
dydx = matlabFunction(yp)
Now, you can solve the ODE represented by dydx using Euler's method.
h = 0.1;
xn = -5:h:5;
yn = zeros(size(xn));
yn(1) = -40;
for idx = 2:length(xn)
yn(idx) = yn(idx-1)+h*dydx(xn(idx-1));
end
Now, you can plot both numerical and analytical solutions for comparison
fplot(y)
hold on
plot(xn,yn,'k--')
legend('Analytical solution','Euler''s method')
