= ${\left[\frac{2}{9}{\left(3x-6\right)}^{\frac{3}{2}}\right]}_5^{\frac{31}{3}}$

= ${\left[\frac{2}{9}{\left(\sqrt{3x-6}\right)}^3\right]}_5^{\frac{31}{3}}$

$=$ $\frac{2}{9}{\left(\sqrt{3\cdot \left(\frac{31}{3}\right)-6}\right)}^3-\frac{2}{9}{\left(\sqrt{3\cdot 5-6}\right)}^3$

= $\frac{2}{9}{\left(\sqrt{31-6}\right)}^3-\frac{2}{9}{\left(\sqrt{15-6}\right)}^3$

= $\frac{2}{9}{\left(\sqrt{25}\right)}^3-\frac{2}{9}{\left(\sqrt{9}\right)}^3$

= $\frac{2}{9}\cdot 5^3-\frac{2}{9}\cdot 3^3$

= $\frac{2}{9}\cdot 125-\frac{2}{9}\cdot 27$

= $\frac{250}{9}-6$

= $\frac{250}{9}-\frac{54}{9}$

= $\frac{196}{9}$

= ${\left[\frac{4}{3}{\left(x-2\right)}^{\frac{3}{2}}\right]}_{11}^{18}$

= ${\left[\frac{4}{3}{\left(\sqrt{x-2}\right)}^3\right]}_{11}^{18}$

$=$ $\frac{4}{3}{\left(\sqrt{18-2}\right)}^3-\frac{4}{3}{\left(\sqrt{11-2}\right)}^3$

= $\frac{4}{3}{\left(\sqrt{16}\right)}^3-\frac{4}{3}{\left(\sqrt{9}\right)}^3$

= $\frac{4}{3}\cdot 4^3-\frac{4}{3}\cdot 3^3$

= $\frac{4}{3}\cdot 64-\frac{4}{3}\cdot 27$

= $\frac{256}{3}-36$

= $\frac{256}{3}-\frac{108}{3}$

= $\frac{148}{3}$

= ${\left[-9e^{-\mathrm{0,5}x+\mathrm{0,9}}\right]}_0^u$

$=$ $-9e^{-\mathrm{0,5}u+\mathrm{0,9}}+9e^{-\mathrm{0,5}\cdot 0+\mathrm{0,9}}$

= $-9e^{-\mathrm{0,5}u+\mathrm{0,9}}+9e^{0+\mathrm{0,9}}$

= $-9e^{-\mathrm{0,5}u+\mathrm{0,9}}+9e^{\mathrm{0,9}}$

Diese Integralfunktion soll ja den Wert $2$ annehmen, deswegen setzen wir sie gleich :

Wir berechnen den Mittelwert mit der üblichen Formel:

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

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

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

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

= $\frac{1}{\pi }·\left(-3-3\right)$

= $\frac{1}{\pi }·\left(-6\right)$

= $-\frac{6}{\pi }$

= ${\left[-\frac{2}{3}{\left(-3x+5\right)}^{-1}\right]}_2^u$

= ${\left[-\frac{2}{3\left(-3x+5\right)}\right]}_2^u$

$=$ $-\frac{2}{3\left(-3u+5\right)}+\frac{2}{3\left(-3\cdot 2+5\right)}$

= $-\frac{2}{3\left(-3u+5\right)}+\frac{2}{3\left(-6+5\right)}$

= $-\frac{2}{3\left(-3u+5\right)}+\frac{2}{3\left(-1\right)}$

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

= $-\frac{2}{3\left(-3u+5\right)}-\frac{2}{3}$

Für u → ∞ gilt: A(u) = $-\frac{2}{3\left(-3u+5\right)}-\frac{2}{3}$ → $0-\frac{2}{3}$ = $-\frac{2}{3}$ ≈ -0.667

Für den Flächeninhalt (immer positiv) gilt also I = 0.667