Selesaikan untuk C
C=-\frac{dn\left(\sqrt{-\left(\sin(n)\right)^{2}+1}-1\right)}{2\sin(n)}
d\neq 0\text{ and }\nexists n_{1}\in \mathrm{Z}\text{ : }n=\pi n_{1}
Selesaikan untuk d
d=\frac{2C\left(\sqrt{-\left(\sin(n)\right)^{2}+1}+1\right)}{n\sin(n)}
\nexists n_{1}\in \mathrm{Z}\text{ : }n=\pi n_{1}\text{ and }C\neq 0
Kongsi
Disalin ke papan klip
\frac{\sqrt{\sin(n)+1}+\sqrt{-\sin(n)+1}}{d\left(\sqrt{\sin(n)+1}-\sqrt{-\sin(n)+1}\right)}C=\frac{n}{2}
Persamaan tersebut adalah dalam bentuk piawai.
\frac{\frac{\sqrt{\sin(n)+1}+\sqrt{-\sin(n)+1}}{d\left(\sqrt{\sin(n)+1}-\sqrt{-\sin(n)+1}\right)}Cd\left(\sqrt{\sin(n)+1}-\sqrt{-\sin(n)+1}\right)}{\sqrt{\sin(n)+1}+\sqrt{-\sin(n)+1}}=\frac{n}{2\times \frac{\sqrt{\sin(n)+1}+\sqrt{-\sin(n)+1}}{d\left(\sqrt{\sin(n)+1}-\sqrt{-\sin(n)+1}\right)}}
Bahagikan kedua-dua belah dengan d^{-1}\left(\sqrt{1+\sin(n)}+\sqrt{1-\sin(n)}\right)\left(\sqrt{1+\sin(n)}-\sqrt{1-\sin(n)}\right)^{-1}.
C=\frac{n}{2\times \frac{\sqrt{\sin(n)+1}+\sqrt{-\sin(n)+1}}{d\left(\sqrt{\sin(n)+1}-\sqrt{-\sin(n)+1}\right)}}
Membahagi dengan d^{-1}\left(\sqrt{1+\sin(n)}+\sqrt{1-\sin(n)}\right)\left(\sqrt{1+\sin(n)}-\sqrt{1-\sin(n)}\right)^{-1} membuat asal pendaraban dengan d^{-1}\left(\sqrt{1+\sin(n)}+\sqrt{1-\sin(n)}\right)\left(\sqrt{1+\sin(n)}-\sqrt{1-\sin(n)}\right)^{-1}.
C=\frac{dn\left(-|\cos(n)|+1\right)}{2\sin(n)}
Bahagikan \frac{n}{2} dengan d^{-1}\left(\sqrt{1+\sin(n)}+\sqrt{1-\sin(n)}\right)\left(\sqrt{1+\sin(n)}-\sqrt{1-\sin(n)}\right)^{-1}.
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