Integral von $$$\frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}}$$$

Bestimme $$$\int \frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}}\, dx$$$.

Multiplizieren Sie Zähler und Nenner mit $$$\frac{1}{\cos^{2}{\left(x \right)}}$$$ und wandeln Sie $$$\frac{\cos^{2}{\left(x \right)}}{\sin^{2}{\left(x \right)}}$$$ in $$$\frac{1}{\tan^{2}{\left(x \right)}}$$$ um:

$${\color{red}{\int{\frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{\cos^{2}{\left(x \right)}}{\tan^{2}{\left(x \right)}} d x}}}$$

Multiplizieren Sie Zähler und Nenner mit $$$\cos^{2}{\left(x \right)}$$$ und wandeln Sie $$$\frac{1}{\cos^{2}{\left(x \right)}}$$$ in $$$\sec^{2}{\left(x \right)}$$$ um:

$${\color{red}{\int{\frac{\cos^{2}{\left(x \right)}}{\tan^{2}{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{\cos^{4}{\left(x \right)} \sec^{2}{\left(x \right)}}{\tan^{2}{\left(x \right)}} d x}}}$$

Schreiben Sie den Kosinus in Abhängigkeit vom Tangens mithilfe der Formel $$$\cos^{2}{\left(x \right)}=\frac{1}{\tan^{2}{\left(x \right)} + 1}$$$ um.:

$${\color{red}{\int{\frac{\cos^{4}{\left(x \right)} \sec^{2}{\left(x \right)}}{\tan^{2}{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{\sec^{2}{\left(x \right)}}{\left(\tan^{2}{\left(x \right)} + 1\right)^{2} \tan^{2}{\left(x \right)}} d x}}}$$

Sei $$$u=\tan{\left(x \right)}$$$.

Dann $$$du=\left(\tan{\left(x \right)}\right)^{\prime }dx = \sec^{2}{\left(x \right)} dx$$$ (die Schritte sind » zu sehen), und es gilt $$$\sec^{2}{\left(x \right)} dx = du$$$.

Somit,

$${\color{red}{\int{\frac{\sec^{2}{\left(x \right)}}{\left(\tan^{2}{\left(x \right)} + 1\right)^{2} \tan^{2}{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{1}{u^{2} \left(u^{2} + 1\right)^{2}} d u}}}$$

Partialbruchzerlegung durchführen (die Schritte sind » zu sehen):

$${\color{red}{\int{\frac{1}{u^{2} \left(u^{2} + 1\right)^{2}} d u}}} = {\color{red}{\int{\left(- \frac{1}{u^{2} + 1} - \frac{1}{\left(u^{2} + 1\right)^{2}} + \frac{1}{u^{2}}\right)d u}}}$$

Gliedweise integrieren:

$${\color{red}{\int{\left(- \frac{1}{u^{2} + 1} - \frac{1}{\left(u^{2} + 1\right)^{2}} + \frac{1}{u^{2}}\right)d u}}} = {\color{red}{\left(\int{\frac{1}{u^{2}} d u} - \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u}\right)}}$$

Wenden Sie die Potenzregel $$$\int u^{n}\, du = \frac{u^{n + 1}}{n + 1}$$$ $$$\left(n \neq -1 \right)$$$ mit $$$n=-2$$$ an:

$$- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u} + {\color{red}{\int{\frac{1}{u^{2}} d u}}}=- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u} + {\color{red}{\int{u^{-2} d u}}}=- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u} + {\color{red}{\frac{u^{-2 + 1}}{-2 + 1}}}=- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u} + {\color{red}{\left(- u^{-1}\right)}}=- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - \int{\frac{1}{u^{2} + 1} d u} + {\color{red}{\left(- \frac{1}{u}\right)}}$$

Das Integral von $$$\frac{1}{u^{2} + 1}$$$ ist $$$\int{\frac{1}{u^{2} + 1} d u} = \operatorname{atan}{\left(u \right)}$$$:

$$- \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - {\color{red}{\int{\frac{1}{u^{2} + 1} d u}}} - \frac{1}{u} = - \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} - {\color{red}{\operatorname{atan}{\left(u \right)}}} - \frac{1}{u}$$

Um das Integral $$$\int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u}$$$ zu berechnen, wende die partielle Integration $$$\int \operatorname{c} \operatorname{dv} = \operatorname{c}\operatorname{v} - \int \operatorname{v} \operatorname{dc}$$$ auf das Integral $$$\int{\frac{1}{u^{2} + 1} d u}$$$ an.

Seien $$$\operatorname{c}=\frac{1}{u^{2} + 1}$$$ und $$$\operatorname{dv}=du$$$.

Dann gilt $$$\operatorname{dc}=\left(\frac{1}{u^{2} + 1}\right)^{\prime }du=- \frac{2 u}{\left(u^{2} + 1\right)^{2}} du$$$ (Rechenschritte siehe ») und $$$\operatorname{v}=\int{1 d u}=u$$$ (Rechenschritte siehe »).

Das Integral lässt sich umschreiben als

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

Konstante ausklammern:

$$\frac{u}{u^{2} + 1} - \int{\left(- \frac{2 u^{2}}{\left(u^{2} + 1\right)^{2}}\right)d u}=\frac{u}{u^{2} + 1} + 2 \int{\frac{u^{2}}{\left(u^{2} + 1\right)^{2}} d u}$$

Schreibe den Zähler des Integranden als $$$u^{2}=u^{2}{\color{red}{+1}}{\color{red}{-1}}$$$ um und zerlege:

$$\frac{u}{u^{2} + 1} + 2 \int{\frac{u^{2}}{\left(u^{2} + 1\right)^{2}} d u}=\frac{u}{u^{2} + 1} + 2 \int{\left(- \frac{1}{\left(u^{2} + 1\right)^{2}} + \frac{u^{2} + 1}{\left(u^{2} + 1\right)^{2}}\right)d u}=\frac{u}{u^{2} + 1} + 2 \int{\left(\frac{1}{u^{2} + 1} - \frac{1}{\left(u^{2} + 1\right)^{2}}\right)d u}$$

Teile die Integrale auf:

$$\frac{u}{u^{2} + 1} + 2 \int{\left(\frac{1}{u^{2} + 1} - \frac{1}{\left(u^{2} + 1\right)^{2}}\right)d u}=\frac{u}{u^{2} + 1} - 2 \int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u} + 2 \int{\frac{1}{u^{2} + 1} d u}$$

Damit erhalten wir die folgende einfache lineare Gleichung bezüglich des Integrals:

$$\int{\frac{1}{u^{2} + 1} d u}=\frac{u}{u^{2} + 1} + 2 \int{\frac{1}{u^{2} + 1} d u} - 2 {\color{red}{\int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u}}}$$

Durch Lösen erhalten wir, dass

$$\int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u}=\frac{u}{2 \left(u^{2} + 1\right)} + \frac{\int{\frac{1}{u^{2} + 1} d u}}{2}$$

Daher,

$$- \operatorname{atan}{\left(u \right)} - {\color{red}{\int{\frac{1}{\left(u^{2} + 1\right)^{2}} d u}}} - \frac{1}{u} = - \operatorname{atan}{\left(u \right)} - {\color{red}{\left(\frac{u}{2 \left(u^{2} + 1\right)} + \frac{\int{\frac{1}{u^{2} + 1} d u}}{2}\right)}} - \frac{1}{u}$$

Das Integral von $$$\frac{1}{u^{2} + 1}$$$ ist $$$\int{\frac{1}{u^{2} + 1} d u} = \operatorname{atan}{\left(u \right)}$$$:

$$- \frac{u}{2 \left(u^{2} + 1\right)} - \operatorname{atan}{\left(u \right)} - \frac{{\color{red}{\int{\frac{1}{u^{2} + 1} d u}}}}{2} - \frac{1}{u} = - \frac{u}{2 \left(u^{2} + 1\right)} - \operatorname{atan}{\left(u \right)} - \frac{{\color{red}{\operatorname{atan}{\left(u \right)}}}}{2} - \frac{1}{u}$$

Zur Erinnerung: $$$u=\tan{\left(x \right)}$$$:

$$- \frac{3 \operatorname{atan}{\left({\color{red}{u}} \right)}}{2} - {\color{red}{u}}^{-1} - \frac{{\color{red}{u}} \left(1 + {\color{red}{u}}^{2}\right)^{-1}}{2} = - \frac{3 \operatorname{atan}{\left({\color{red}{\tan{\left(x \right)}}} \right)}}{2} - {\color{red}{\tan{\left(x \right)}}}^{-1} - \frac{{\color{red}{\tan{\left(x \right)}}} \left(1 + {\color{red}{\tan{\left(x \right)}}}^{2}\right)^{-1}}{2}$$

Daher,

$$\int{\frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}} d x} = - \frac{3 \operatorname{atan}{\left(\tan{\left(x \right)} \right)}}{2} - \frac{1}{\tan{\left(x \right)}} - \frac{\tan{\left(x \right)}}{2 \left(\tan^{2}{\left(x \right)} + 1\right)}$$

Vereinfachen:

$$\int{\frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}} d x} = - \frac{3 x}{2} - \frac{\sin{\left(2 x \right)}}{4} - \frac{1}{\tan{\left(x \right)}}$$

Fügen Sie die Integrationskonstante hinzu:

$$\int{\frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}} d x} = - \frac{3 x}{2} - \frac{\sin{\left(2 x \right)}}{4} - \frac{1}{\tan{\left(x \right)}}+C$$

$$$\int \frac{\cos^{4}{\left(x \right)}}{\sin^{2}{\left(x \right)}}\, dx = \left(- \frac{3 x}{2} - \frac{\sin{\left(2 x \right)}}{4} - \frac{1}{\tan{\left(x \right)}}\right) + C$$$A