Wp/rsk/Основни триґонометрийни формули

${\displaystyle {\sin }^2\alpha +{\cos }^2\alpha =1,\frac{\sin \alpha }{\cos \alpha }=\tan \alpha ,\sin \alpha \cdot \csc \alpha =1}$,

${\displaystyle {\sec }^2\alpha -{\tan }^2\alpha =1,\cos \alpha \cdot \sec \alpha =1}$,

${\displaystyle {\csc }^2\alpha -{\cot }^2\alpha =1,\frac{\cos \alpha }{\sin \alpha }=\cot \alpha ,\tan \alpha \cdot \cot \alpha =1}$

${\displaystyle \sin \alpha =\sqrt{1-{\cos }^2\alpha }=\frac{\tan \alpha }{\sqrt{1+{\tan }^2\alpha }},}$

${\displaystyle \cos \alpha =\sqrt{1-{\sin }^2\alpha }=\frac{1}{\sqrt{1+{\tan }^2\alpha }},}$

${\displaystyle \tan \alpha =\frac{\sin \alpha }{\sqrt{1-{\sin }^2\alpha }}=\frac{1}{\cot \alpha },}$

${\displaystyle \cot \alpha =\frac{\sqrt{1-{\sin }^2\alpha }}{\sin \alpha }=\frac{1}{\tan \alpha }.}$

${\displaystyle \sin (\alpha \pm \beta )=\sin \alpha \cos \beta \pm \cos \alpha \sin \beta ,}$

${\displaystyle \cos (\alpha \pm \beta )=\cos \alpha \cos \beta \mp \sin \alpha \sin \beta ,}$

${\displaystyle \tan (\alpha \pm \beta )=\frac{\tan \alpha \pm \tan \beta }{1\mp \tan \alpha \tan \beta },\cot (\alpha \pm \beta )=\frac{\cot \alpha \cot \beta \mp 1}{\cot \beta \pm \cot \alpha }.}$

${\displaystyle \tan 2\alpha =\frac{2\tan \alpha }{1-{\tan }^2\alpha },\tan 3\alpha =\frac{3\tan \alpha -{\tan }^3\alpha }{1-3{\tan }^2\alpha },}$

${\displaystyle \sin 2\alpha =2\sin \alpha \cos \alpha ,\sin 3\alpha =3\sin \alpha -4{\sin }^3\alpha ,}$

${\displaystyle \cos 2\alpha ={\cos }^2\alpha -{\sin }^2\alpha ,\cos 3\alpha =4{\cos }^3\alpha -3\cos \alpha ,}$

${\displaystyle \tan 2\alpha =\frac{2\tan \alpha }{1-{\tan }^2\alpha },\tan 3\alpha =\frac{3\tan \alpha -{\tan }^3\alpha }{1-3{\tan }^2\alpha },}$

${\displaystyle \cot 2\alpha =\frac{{\cot }^2\alpha -1}{2\cot \alpha },\cot 3\alpha =\frac{{\cot }^3\alpha -3\cot \alpha }{3{\cot }^2\alpha -1},}$

${\displaystyle \tan 4\alpha =\frac{4\tan \alpha -4{\tan }^3\alpha }{1-6{\tan }^2\alpha +{\tan }^4\alpha },\cot 4\alpha =\frac{{\cot }^4\alpha -6{\cot }^2\alpha +1}{4{\cot }^3\alpha -4\cot \alpha }.}$

За векше n хаснує ше Моаврова формула за комплексане число, розвита до биномного шору:

${\displaystyle \cos n\alpha +i\sin n\alpha =(\cos \alpha +i\sin \alpha {)}^n=}$

${\displaystyle {\cos }^n\alpha +in{\cos }^{n-1}\alpha \sin \alpha -C_n^2{\cos }^{n-2}\alpha {\sin }^2\alpha --i{C}_n^3{\cos }^{n-3}\alpha {\sin }^3\alpha +C_n^4{\cos }^{n-4}\alpha {\sin }^4\alpha +...,}$

дзе ${\displaystyle C_n^k=C(n,k)=(\genfrac{}{}{0ex}{}{n}{k})=\frac{n\cdot (n-1)\cdots (n-k+1)}{k\cdot (k-1)\cdots 1}=\frac{n!}{k!(n-k)!}}$ биномни коефициєнт.

Оталь шлїдзи:

${\displaystyle \cos n\alpha ={\cos }^n\alpha -C_n^2{\cos }^{n-2}\alpha {\sin }^2\alpha +C_n^4{\cos }^{n-4}\alpha {\sin }^4\alpha -C_n^6{\cos }^{n-6}\alpha {\sin }^6\alpha +...,}$

${\displaystyle \sin n\alpha =n{\cos }^{n-1}\alpha \sin \alpha -C_n^3{\cos }^{n-3}\alpha {\sin }^3\alpha +C_n^5{\cos }^{n-5}\alpha {\sin }^5\alpha -....}$

${\displaystyle \sin \alpha +\sin \beta =2\sin \frac{\alpha +\beta }{2}\cos \frac{\alpha -\beta }{2},}$

${\displaystyle \sin \alpha -\sin \beta =2\cos \frac{\alpha +\beta }{2}\sin \frac{\alpha -\beta }{2},}$

${\displaystyle \cos \alpha +\cos \beta =2\cos \frac{\alpha +\beta }{2}\cos \frac{\alpha -\beta }{2},}$

${\displaystyle \cos \alpha -\cos \beta =-2\sin \frac{\alpha +\beta }{2}\sin \frac{\alpha -\beta }{2},}$

${\displaystyle \tan \alpha \pm \tan \beta =\frac{\sin (\alpha \pm \beta )}{\cos \alpha \cos \beta },\cot \alpha \pm \cot \beta =\pm \frac{\sin (\alpha \pm \beta )}{\sin \alpha \sin \beta },}$

${\displaystyle \tan \alpha +\cot \beta =\frac{\cos (\alpha -\beta )}{\cos \alpha \sin \beta },\cot \alpha -\tan \beta =\frac{cos(\alpha +\beta )}{\sin \alpha \cos \beta }.}$

${\displaystyle \sin \alpha \sin \beta =\frac{1}{2}[\cos (\alpha -\beta )-\cos (\alpha +\beta )],}$

${\displaystyle \cos \alpha \cos \beta =\frac{1}{2}[\cos (\alpha -\beta )+cos(\alpha +\beta )],}$

${\displaystyle \sin \alpha \cos \beta =\frac{1}{2}[\sin (\alpha -\beta )+\sin (\alpha +\beta )].}$

${\displaystyle \sin \frac{\alpha }{2}=\sqrt{\frac{1-\cos \alpha }{2}},\cos \frac{\alpha }{2}=\sqrt{\frac{1+\cos \alpha }{2}},}$

${\displaystyle \tan \frac{\alpha }{2}=\sqrt{\frac{1-\cos \alpha }{1+\cos \alpha }}=\frac{1-\cos \alpha }{\sin \alpha }=\frac{\sin \alpha }{1+\cos \alpha },}$

${\displaystyle \cot \frac{\alpha }{2}=\sqrt{\frac{1+\cos \alpha }{1-\cos \alpha }}=\frac{1+\cos \alpha }{\sin \alpha }=\frac{\sin \alpha }{1-\cos \alpha }.}$

${\displaystyle {\sin }^2\alpha =\frac{1}{2}(1-\cos 2\alpha ),{\cos }^2\alpha =\frac{1}{2}(1+\cos 2\alpha ),}$

${\displaystyle {\sin }^3\alpha =\frac{1}{4}(3\sin \alpha -\sin 3\alpha ),{\cos }^3\alpha =\frac{1}{4}(\cos 3\alpha +3\cos \alpha ),}$

${\displaystyle {\sin }^4\alpha =\frac{1}{8}(\cos 4\alpha -4\cos 2\alpha +3),{\cos }^4\alpha =\frac{1}{8}(\cos 4\alpha +4\cos 2\alpha +3).}$

За рахованє ${\displaystyle {\sin }^n\alpha }$ и ${\displaystyle {\cos }^n\alpha }$ за векше n хаснує ше Моаврово формули.