3.3.2 Equilibrio secular aproximado

Next: 3.3.3 Equilibrio transitorio Up: 3.3 Equilibrios Previous: 3.3.1 Equilibrio secular

3.3.2 Equilibrio secular aproximado

Caso $\lambda_A \ll \lambda_B$ ( $T_A\gg T_B$ ),
pero $\frac{\lambda_B}{\lambda_B-\lambda_A} >1,$ ``apreciablemente''

Ejemplo:

$^{132}$ Te (78h) $\longrightarrow$ $^{132}$ I (2.28h) $\longrightarrow$ $^{132}$ Xe

Equilibrio en $\sim 12$ h.

**Figura 7:** Equilibrio secular aproximado
$\begin{figure}\begin{center} \includegraphics[scale=0.8, bb= 100 550 480 790]{figt4/equi2.ps} \end{center} \end{figure}$

$\begin{eqnarray*} A_B(t)&=& \frac{\lambda_A\lambda_B}{\lambda_B-\lambda_A}N_0 e... ...B(t) &\sim& \frac{\lambda_B}{\lambda_B-\lambda_A}A_A(t) > A_A(t) \end{eqnarray*}$

Next: 3.3.3 Equilibrio transitorio Up: 3.3 Equilibrios Previous: 3.3.1 Equilibrio secular

J.E. Amaro
2006-05-05