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Beliebt Rechnen >

integral of sin^7(θ)

Lösung

\int sin^{7} (θ) d θ

Lösung

- cos (θ) + cos^{3} (θ) - \frac{3 cos ^{5} ( θ )}{5} + \frac{cos ^{7} ( θ )}{7} + C

Schritte zur Lösung

\int sin^{7} (θ) d θ

Umschreiben mit Hilfe von Trigonometrie-Identitäten

= \int (1 - cos^{2} (θ))^{3} sin (θ) d θ

Wende U-Substitution an

= \int - (1 - u^{2})^{3} d u

Multipliziere aus

- (1 - u^{2})^{3} : - 1 + 3 u^{2} - 3 u^{4} + u^{6}

= \int - 1 + 3 u^{2} - 3 u^{4} + u^{6} d u

Wende die Summenregel an:

\int f (x) \pm g (x) d x = \int f (x) d x \pm \int g (x) d x

= - \int 1 d u + \int 3 u^{2} d u - \int 3 u^{4} d u + \int u^{6} d u

\int 1 d u = u

\int 3 u^{2} d u = u^{3}

\int 3 u^{4} d u = \frac{3 u ^{5}}{5}

\int u^{6} d u = \frac{u ^{7}}{7}

= - u + u^{3} - \frac{3 u ^{5}}{5} + \frac{u ^{7}}{7}

Setze in

u = cos (θ)

ein

= - cos (θ) + cos^{3} (θ) - \frac{3 cos ^{5} ( θ )}{5} + \frac{cos ^{7} ( θ )}{7}

Füge eine Konstante zur Lösung hinzu

= - cos (θ) + cos^{3} (θ) - \frac{3 cos ^{5} ( θ )}{5} + \frac{cos ^{7} ( θ )}{7} + C

Graph

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