= ${\left[e^{3x-4}\right]}_0^3$

$=$ $e^{3\cdot 3-4}-e^{3\cdot 0-4}$

= $e^{9-4}-e^{0-4}$

= $e^5-e^{-4}$

= ${\left[\frac{5}{2}{e}^{2x-2}\right]}_2^3$

$=$ $\frac{5}{2}{e}^{2\cdot 3-2}-\frac{5}{2}{e}^{2\cdot 2-2}$

= $\frac{5}{2}{e}^{6-2}-\frac{5}{2}{e}^{4-2}$

= $\frac{5}{2}{e}^4-\frac{5}{2}{e}^2$

= ${\left[3e^{\mathrm{0,7}x-\mathrm{0,6}}\right]}_0^u$

$=$ $3e^{\mathrm{0,7}u-\mathrm{0,6}}-3e^{\mathrm{0,7}\cdot 0-\mathrm{0,6}}$

= $3e^{\mathrm{0,7}u-\mathrm{0,6}}-3e^{0-\mathrm{0,6}}$

= $3e^{\mathrm{0,7}u-\mathrm{0,6}}-3e^{-\mathrm{0,6}}$

Diese Integralfunktion soll ja den Wert $6$ annehmen, deswegen setzen wir sie gleich :

Wir berechnen den Mittelwert mit der üblichen Formel:

= $\frac{2}{\pi }$ ${\left[\frac{5}{3}\cdot \sin (3x+\pi )\right]}_{\frac{1}{2}\pi }^{\pi }$

$=$ $\frac{2}{\pi }·\left(\frac{5}{3}\cdot \sin (3\cdot \pi +\pi )-\frac{5}{3}\cdot \sin (3\cdot \left(\frac{1}{2}\pi \right)+\pi )\right)$

= $\frac{2}{\pi }·\left(\frac{5}{3}\cdot \sin \left(4\pi \right)-\frac{5}{3}\cdot \sin \left(\frac{5}{2}\pi \right)\right)$

= $\frac{2}{\pi }·\left(\frac{5}{3}\cdot 0-\frac{5}{3}\cdot 1\right)$

= $\frac{2}{\pi }·\left(0-\frac{5}{3}\right)$

= $\frac{2}{\pi }·\left(0-\frac{5}{3}\right)$

= $\frac{2}{\pi }·\left(-\frac{5}{3}\right)$

= $-\frac{10}{3\pi }$

= ${\left[-\frac{1}{2}{\left(-2x+1\right)}^{-1}\right]}_2^u$

= ${\left[-\frac{1}{2\left(-2x+1\right)}\right]}_2^u$

$=$ $-\frac{1}{2\left(-2u+1\right)}+\frac{1}{2\left(-2\cdot 2+1\right)}$

= $-\frac{1}{2\left(-2u+1\right)}+\frac{1}{2\left(-4+1\right)}$

= $-\frac{1}{2\left(-2u+1\right)}+\frac{1}{2\left(-3\right)}$

= $-\frac{1}{2\left(-2u+1\right)}+\frac{1}{2}\cdot \left(-\frac{1}{3}\right)$

= $-\frac{1}{2\left(-2u+1\right)}-\frac{1}{6}$

Für u → ∞ gilt: A(u) = $-\frac{1}{2\left(-2u+1\right)}-\frac{1}{6}$ → $0-\frac{1}{6}$ = $-\frac{1}{6}$ ≈ -0.167

Für den Flächeninhalt (immer positiv) gilt also I = 0.167