I’m assuming here that ‘Q’ is the numerator polynomial and ‘P’ is the denominator poplynomial. (If that is not correct, it is easy to switch them.)
Try something like this —
P = [8.925*10^-20 11.925*10^-15 17.995*10^-10 6.625 10^5];
poles = roots(P);
poles = poles';
Q = [2.25*10^-20 5.25*10^-15 1.5*10^-5 3*10^-5];
zeros = roots(Q);
zeros = zeros';
FT = tf(Q,P)
syms s t z
snum = poly2sym(Q,s);
sden = poly2sym(P,s);
FTsym = vpa(snum / sden, 5)
step(FT);
FT_time_domain = ilaplace(snum/(sden*s)); % Step Response Requires: snum/sden*(1/s)
FT_time_domain = simplify(FT_time_domain,'Steps',10);
FT_time_domain = collect(FT_time_domain, exp(-t))
figure
fplot(FT_time_domain, [0 1.5E-5])
xlabel('Time (s)')
ylabel('Amplitude (units)')
The system appears to be unstable.
EDIT — (17 Apr 2023 at 13:02)
Initially forgot the 
multiplication to produce a step response in the symbolic code. Now added, with comment.
multiplication to produce a step response in the symbolic code. Now added, with comment. .
