Lösung Exponentialgleichungen rückwärts lösen

Version 2.1 von Martina Wagner am 2025/05/20 14:20

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$\begin{align*} 2 e^x-2 &= 0\\ 2 e^x &=2\quad \left|:2\\ e^x &=1 \\ x &= 0 \end{align*}$
```
 
```
$\begin{align*} e^{2x}-e \cdot e^x &= 0 \\ e^x\cdot(e^x-e) &= 0 \left|\left| \text{ SVNP } \end{align*}$
$\ e^x \neq 0 ~und~ e^x-e = 0$
$\ e^x = e$
```
 
```
$\begin{align*} e^{2x}-\square e^x+\square &= 0 \quad \left|\left|\text{ Subst.: } e^x:=\square\\ z^2-\square z + \square &= 0 \quad \left|\left|\text{ Mitternachtsformel/abc-Formel } & \end{align*}$
$\begin{align*} \Rightarrow z_{1,2}&=\frac{\square\pm\sqrt{\square^2-4\cdot\square\cdot\square}}{2\cdot\square}\\ z_{1,2}&=\frac{\square+\square}{\square} \end{align*}$
$\begin{align*} &\text{Resubst.: } z:= e^x\\ &e^x=\square \Rightarrow x \approx 0,693147...\\ \end{align*}$
{{/aufgabe}}

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