Tegak lurus: Difference between revisions

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Revision as of 03:03, 23 May 2021 (view source) Altilunium (talk \| contribs) No edit summary ← Older edit		Latest revision as of 03:26, 23 May 2021 (view source) Altilunium (talk \| contribs) No edit summary
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Line 11: Dengan menggunakan aturan sinus, kita dapat mencari panjang garis AB<br> <math> \begin{align} \frac{AB}{\sin{a}} &= \frac{r}{\sin{x}} \\ \\&.. (1) \end{align} \frac{AB}{\sin{a}} = \frac{r}{\sin{x}} \quad .. (1)▼ </math> Line 20: <math> \begin{align} ~~\angle a = 180 - 2x \\~~ \~~sin{~~angle a} &= ~~\sin{~~180 - 2x} \\ \sin{a} &= \sin{180-2x} \~~quad .. (2)~~\ ▲~~\frac{AB}{~~\sin{a}} &= ~~\frac{r}{~~\sin{x}2x} ~~\quad~~ &.. (12) \end{align} </math> Line 29 ⟶ 31: <math> \begin{align} ~~\frac{AB}{\sin{2x} } = \frac{r}{\sin{x} } \\ \\~~ \frac{AB}{2 \sin{x2x} ~~\cos{x}~~ } &= \frac{r}{ \sin{x} } \\ \\ \frac{AB}{2 = 2r\sin{x} \cos{x}} &= \frac{r}{ \sin{x}} \\ \\ AB &= 2r \cos{x} \end{align} </math>