The solution of this equation is a symbolic function sol(t):
sol=dsolve('D3y-4*D2y+Dy+2*y=0,y(0)=-4,Dy(0)=-6,D2y(0)=-4');
sol(t)=t is the same as sol(t)-t = 0:
syms t
functionToBeZeroed = sol - t;
Turn this into a numerical function f(x):
f = matlabFunction(functionToBeZeroed);
You can calculate f(x) for any value of x. A plot shows that the curve crosses zero near about x=1.6.
x = 0:.01:2;
plot(x,f(x))
fzero(f,1.6)
EDIT: This answer has been revised to expand the explanatory text.
