Mathematrix: Aufgabenbeispiele/ Fläche zwischen zwei Funktionen

${\displaystyle g(x)=f(x)\to 0,5e^x-1=-0,16x^2-0,4x+2,75\to }$
${\displaystyle x_1\approx 1,66433}$

${\displaystyle A={\displaystyle \underset{-2}{\overset{x_1}{\int }}}(f(x)-g(x))\mathrm{d}x+{\displaystyle \underset{x_1}{\overset{2}{\int }}}(g(x)-f(x))\mathrm{d}x=}$
${\displaystyle {\displaystyle \underset{-2}{\overset{x_1}{\int }}}(-0,5e^x+1-0,16x^2-0,4x+2,75)\mathrm{d}x+\dots }$
${\displaystyle \dots +{\displaystyle \underset{x_1}{\overset{2}{\int }}}(0,5e^x-1+0,16x^2+0,4x-2,75)\mathrm{d}x=}$

${\displaystyle {[-0,5e^x+x-\frac{0,16}{3}{x}^3-0,2x+2,75x]}_{-2}^{x_1}+}$
${\displaystyle \dots +{[0,5e^x-x+\frac{0,16}{3}{x}^3+0,2x^2-2,75x]}_{x_1}^2=}$

${\displaystyle (-0,5e^{1,66..}+1,66..-\frac{0,16}{3}\cdot {1,66..}^3-0,2\cdot {1,66..}^2+2,75\cdot 1,66..)-\dots }$
${\displaystyle \dots -(-0,5e^{(-2)}+1-\frac{0,16}{3}\cdot {(-2)}^3-0,2\cdot {(-2)}^2+2,75\cdot (-2))+\text{usw.}\dots }$
${\displaystyle \approx 10,96}$ (mit Geogebra berechnet)