changes.mady.by.user Arthur Aslanyan (Nafta College)
Saved on Feb 08, 2019
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\frac{d Q^{\downarrow}_{AQ}}{dt} = q^{\downarrow}_{AQ}(t)
q^{\downarrow}_{AQ}(t)= C_a \cdot \frac{\partial p_a(t,r)}{\partial r} \bigg|_{r=r_e}
p_a(t, r)= p(0) + \int_0^t p_1 \left(\frac{(t-\tau) \cdot \chi}{r_e^2}, \frac{r}{r_e} \right) \dot p(\tau) d\tau
\dot p(\tau) = \frac{d p}{d \tau}
\frac{\partial p_1}{\partial t_D} = \frac{\partial^2 p_1}{\partial r_D^2} + \frac{1}{r_D}\cdot \frac{\partial p_1}{\partial r_D}
p_1(t_D = 0, r_D)= 0
p_1(t_D, r_D=1) = 1
\frac{\partial p_1}{\partial r_D} \bigg|_ {r_D=r_a/r_e} = 0