= ${\left[\frac{5}{3}{\left(2x-2\right)}^{\frac{3}{2}}\right]}_{\frac{11}{2}}^9$

= ${\left[\frac{5}{3}{\left(\sqrt{2x-2}\right)}^3\right]}_{\frac{11}{2}}^9$

$=$ $\frac{5}{3}{\left(\sqrt{2\cdot 9-2}\right)}^3-\frac{5}{3}{\left(\sqrt{2\cdot \left(\frac{11}{2}\right)-2}\right)}^3$

= $\frac{5}{3}{\left(\sqrt{18-2}\right)}^3-\frac{5}{3}{\left(\sqrt{11-2}\right)}^3$

= $\frac{5}{3}{\left(\sqrt{16}\right)}^3-\frac{5}{3}{\left(\sqrt{9}\right)}^3$

= $\frac{5}{3}\cdot 4^3-\frac{5}{3}\cdot 3^3$

= $\frac{5}{3}\cdot 64-\frac{5}{3}\cdot 27$

= $\frac{320}{3}-45$

= $\frac{320}{3}-\frac{135}{3}$

= $\frac{185}{3}$

= ${\left[\frac{2}{3}{e}^{3x-6}\right]}_0^1$

$=$ $\frac{2}{3}{e}^{3\cdot 1-6}-\frac{2}{3}{e}^{3\cdot 0-6}$

= $\frac{2}{3}{e}^{3-6}-\frac{2}{3}{e}^{0-6}$

= $\frac{2}{3}{e}^{-3}-\frac{2}{3}{e}^{-6}$

= ${\left[2x^2\right]}_0^u$

$=$ $2u^2-2\cdot 0^2$

= $2u^2-2\cdot 0$

= $2u^2+0$

= $2u^2$

Diese Integralfunktion soll ja den Wert $\mathrm{12,5}$ annehmen, deswegen setzen wir sie gleich :

Da u= $-\mathrm{2,5}$ < 0 ist u= $\mathrm{2,5}$ die einzige Lösung.

Wir berechnen den Mittelwert mit der üblichen Formel:

= $\frac{2}{\pi }$ ${\left[-\cos \left(2x-\frac{1}{2}\pi \right)\right]}_0^{\frac{1}{2}\pi }$

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

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

= $\frac{2}{\pi }·\left(-0+0\right)$

= 0

= ${\left[3\ln \left(\left|$ x-1$\right|\right)\right]}_2^u$

$=$ $3\ln \left(\left|$ u-1$\right|\right)-3\ln \left(\left|$ 2-1$\right|\right)$

= $3\ln \left(\left|$ u-1$\right|\right)-3\ln \left(1\right)$

= $3\ln \left(\left|$ u-1$\right|\right)+0$

= $3\ln \left(\left|$ x-1$\right|\right)$

Für u → ∞ gilt: A(u) = $3\ln \left(\left|$ x-1$\right|\right)$ → $\infty$