dot x=rx-hx^2+q, where dot x=\frac{dx}{dt}. I'm assuming r,h,q have different

$\stackrel{˙}{x}=rx-h{x}^{2}+q$, where $\stackrel{˙}{x}=\frac{dx}{dt}$. I'm assuming $r,h,q$ have different units.
I first tried $\tau =\frac{t}{{t}_{0}}$ and $A=\frac{x}{{x}_{0}}$. Then I got $\frac{dA{x}_{0}}{d\tau {t}_{0}}=rA{x}_{0}-h{A}^{2}{x}_{0}^{2}+q$. But I am not really sure where to go from there.
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legertopdxa
Can use physical dimensions to units:
meter linear
frequency or angular velocity
velocity
.
Hashim Townsend