三角函数精确值

三角函数精确值是利用三角函数的公式将特定的三角函数值加以化简，并以数学根式或分数表示

用根式或分数表达的精确三角函数有时很有用，主要用于简化的解决某些方程式能进一步化简。

注意：以下为相同角度的转换表：

相同角度的转换表
角度单位	值
转	$\mathbf {0}$	${\tfrac {1}{12}}$	${\tfrac {1}{8}}$	${\tfrac {1}{6}}$	${\tfrac {1}{4}}$	${\tfrac {1}{2}}$	${\tfrac {3}{4}}$	$\mathbf {1}$
角度	0°	30°	45°	60°	90°	180°	270°	360°
弧度	$\mathbf {0}$	${\tfrac {\pi }{6}}$	${\tfrac {\pi }{4}}$	${\tfrac {\pi }{3}}$	${\tfrac {\pi }{2}}$	$\pi$	${\tfrac {3\pi }{2}}$	$2\pi$
梯度	$0^{g}$	$33{\tfrac {1}{3}}^{g}$	$50^{g}$	$66{\tfrac {2}{3}}^{g}$	$100^{g}$	$200^{g}$	$300^{g}$	$400^{g}$

计算方式[编辑 | 编辑源代码]

基于常识[编辑 | 编辑源代码]

例如：0°、30°、45°

经由半角公式的计算[编辑 | 编辑源代码]

例如：15°、22.5°

\sin \left({\frac {x}{2}}\right)=\pm \,{\sqrt {{\tfrac {1}{2}}(1-\cos x)}}

\cos \left({\frac {x}{2}}\right)=\pm \,{\sqrt {{\tfrac {1}{2}}(1+\cos x)}}

利用三倍角公式求 ${\frac {1}{3}}\,$ 角[编辑 | 编辑源代码]

例如：10°、20°、7°......等，非三的倍数的角的精确值。

$\sin 3\theta =3\sin \theta -4\sin ^{3}\theta \,$

$\cos 3\theta =4\cos ^{3}\theta -3\cos \theta \,$

把它改为

$\sin \theta =3\sin {\frac {1}{3}}\theta -4\sin ^{3}{\frac {1}{3}}\theta \,$
$\cos \theta =4\cos ^{3}{\frac {1}{3}}\theta -3\cos {\frac {1}{3}}\theta \,$

把 $\cos {\frac {1}{3}}\theta \,$ 当成未知数， $\cos \theta \,$ 当成常数项解一元三次方程式即可求出

例如： $\sin {\frac {\pi }{9}}=\sin 20^{\circ }={\sqrt[{3}]{-{\frac {\sqrt {3}}{16}}+{\sqrt {-{\frac {1}{256}}}}}}+{\sqrt[{3}]{-{\frac {\sqrt {3}}{16}}-{\sqrt {-{\frac {1}{256}}}}}}$

经由合角公式的计算[编辑 | 编辑源代码]

例如：21° = 9° + 12°

\sin(x\pm y)=\sin(x)\cos(y)\pm \cos(x)\sin(y)\,

\cos(x\pm y)=\cos(x)\cos(y)\mp \sin(x)\sin(y)\,

经由托勒密定理的计算[编辑 | 编辑源代码]

例如：18°

\mathrm {crd} \ {36^{\circ }}=\mathrm {crd} \left(\angle \mathrm {ADB} \right)={\frac {a}{b}}={\frac {2}{1+{\sqrt {5}}}}

\mathrm {crd} \ {\theta }=2\sin {\frac {\theta }{2}}\,

\sin {18^{\circ }}={\frac {1}{1+{\sqrt {5}}}}={\tfrac {1}{4}}\left({\sqrt {5}}-1\right)

三角函数精确值列表[编辑 | 编辑源代码]

由于三角函数的特性，大于45°角度的三角函数值，可以经由自0°～ 45°的角度的三角函数值的相关的计算取得。

0°: 根本[编辑 | 编辑源代码]

\sin 0=0\,

\cos 0=1\,

\tan 0=0\,

3°: 正60边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{60}}=\sin 3^{\circ }={\tfrac {1}{16}}\left[2(1-{\sqrt {3}}){\sqrt {5+{\sqrt {5}}}}+{\sqrt {2}}({\sqrt {5}}-1)({\sqrt {3}}+1)\right]\,

\cos {\frac {\pi }{60}}=\cos 3^{\circ }={\tfrac {1}{16}}\left[2(1+{\sqrt {3}}){\sqrt {5+{\sqrt {5}}}}+{\sqrt {2}}({\sqrt {5}}-1)({\sqrt {3}}-1)\right]\,

\tan {\frac {\pi }{60}}=\tan 3^{\circ }={\tfrac {1}{4}}\left[(2-{\sqrt {3}})(3+{\sqrt {5}})-2\right]\left[2-{\sqrt {2(5-{\sqrt {5}})}}\right]\,

6°: 正30边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{30}}=\sin 6^{\circ }={\tfrac {1}{8}}\left[{\sqrt {6(5-{\sqrt {5}})}}-{\sqrt {5}}-1\right]\,

\cos {\frac {\pi }{30}}=\cos 6^{\circ }={\tfrac {1}{8}}\left[{\sqrt {2(5-{\sqrt {5}})}}+{\sqrt {3}}({\sqrt {5}}+1)\right]\,

\tan {\frac {\pi }{30}}=\tan 6^{\circ }={\tfrac {1}{2}}\left[{\sqrt {2(5-{\sqrt {5}})}}-{\sqrt {3}}({\sqrt {5}}-1)\right]\,

9°: 正20边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{20}}=\sin 9^{\circ }={\tfrac {1}{8}}\left[{\sqrt {2}}({\sqrt {5}}+1)-2{\sqrt {5-{\sqrt {5}}}}\right]\,

\cos {\frac {\pi }{20}}=\cos 9^{\circ }={\tfrac {1}{8}}\left[{\sqrt {2}}({\sqrt {5}}+1)+2{\sqrt {5-{\sqrt {5}}}}\right]\,

\tan {\frac {\pi }{20}}=\tan 9^{\circ }={\sqrt {5}}+1-{\sqrt {5+2{\sqrt {5}}}}\,

10°[编辑 | 编辑源代码]

{}_{\tan 10^{\circ }=-{\frac {-1-{\sqrt {3}}{\rm {i}}}{6}}{\sqrt[{3}]{-12{\sqrt {3}}+36{\rm {i}}}}-{\frac {-1+{\sqrt {3}}{\rm {i}}}{6}}{\sqrt[{3}]{-12{\sqrt {3}}-36{\rm {i}}}}+{\frac {\sqrt {3}}{3}}}\,

12°: 正十五边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{15}}=\sin 12^{\circ }={\tfrac {1}{8}}\left[{\sqrt {2(5+{\sqrt {5}})}}-{\sqrt {3}}({\sqrt {5}}-1)\right]\,

\cos {\frac {\pi }{15}}=\cos 12^{\circ }={\tfrac {1}{8}}\left[{\sqrt {6(5+{\sqrt {5}})}}+{\sqrt {5}}-1\right]\,

\tan {\frac {\pi }{15}}=\tan 12^{\circ }={\tfrac {1}{2}}\left[{\sqrt {3}}(3-{\sqrt {5}})-{\sqrt {2(25-11{\sqrt {5}})}}\right]\,

15°: 正十二边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{12}}=\sin 15^{\circ }={\tfrac {1}{4}}{\sqrt {2}}({\sqrt {3}}-1)\,

\cos {\frac {\pi }{12}}=\cos 15^{\circ }={\tfrac {1}{4}}{\sqrt {2}}({\sqrt {3}}+1)\,

\tan {\frac {\pi }{12}}=\tan 15^{\circ }=2-{\sqrt {3}}\,

18°: 正十边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{10}}=\sin 18^{\circ }={\tfrac {1}{4}}\left({\sqrt {5}}-1\right)={\tfrac {1}{2}}\varphi ^{-1}\,

\cos {\frac {\pi }{10}}=\cos 18^{\circ }={\tfrac {1}{4}}{\sqrt {2(5+{\sqrt {5}})}}\,

\tan {\frac {\pi }{10}}=\tan 18^{\circ }={\tfrac {1}{5}}{\sqrt {5(5-2{\sqrt {5}})}}\,

20°: 正九边形和 60°的三分之一( ${\frac {1}{3}}\,$ 60°)[编辑 | 编辑源代码]

\sin {\frac {\pi }{9}}=\sin 20^{\circ }={\sqrt[{3}]{-{\frac {\sqrt {3}}{16}}+{\sqrt {-{\frac {1}{256}}}}}}+{\sqrt[{3}]{-{\frac {\sqrt {3}}{16}}-{\sqrt {-{\frac {1}{256}}}}}}=

2^{-{\frac {4}{3}}}({\sqrt[{3}]{i-{\sqrt {3}}}}-{\sqrt[{3}]{i+{\sqrt {3}}}})

\cos {\frac {\pi }{9}}=\cos 20^{\circ }=

2^{-{\frac {4}{3}}}({\sqrt[{3}]{1+i{\sqrt {3}}}}+{\sqrt[{3}]{1-i{\sqrt {3}}}})

21°: 9° 与 12°的和[编辑 | 编辑源代码]

\sin {\frac {7\pi }{60}}=\sin 21^{\circ }={\tfrac {1}{16}}\left[2({\sqrt {3}}+1){\sqrt {5-{\sqrt {5}}}}-{\sqrt {2}}({\sqrt {3}}-1)(1+{\sqrt {5}})\right]\,

\cos {\frac {7\pi }{60}}=\cos 21^{\circ }={\tfrac {1}{16}}\left[2({\sqrt {3}}-1){\sqrt {5-{\sqrt {5}}}}+{\sqrt {2}}({\sqrt {3}}+1)(1+{\sqrt {5}})\right]\,

\tan {\frac {7\pi }{60}}=\tan 21^{\circ }={\tfrac {1}{4}}\left[2-(2+{\sqrt {3}})(3-{\sqrt {5}})\right]\left[2-{\sqrt {2(5+{\sqrt {5}})}}\right]\,

$(21{\frac {3}{17}}^{\circ }),\,$ (360/17)°：正17边形[编辑 | 编辑源代码]

\operatorname {cos} {2\pi  \over 17}={\frac {-1+{\sqrt {17}}+{\sqrt {34-2{\sqrt {17}}}}+2{\sqrt {17+3{\sqrt {17}}-{\sqrt {34-2{\sqrt {17}}}}-2{\sqrt {34+2{\sqrt {17}}}}}}}{16}}.

22.5°: 正八边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{8}}=\sin 22.5^{\circ }={\tfrac {1}{2}}({\sqrt {2-{\sqrt {2}}}}),

\cos {\frac {\pi }{8}}=\cos 22.5^{\circ }={\tfrac {1}{2}}({\sqrt {2+{\sqrt {2}}}})\,

\tan {\frac {\pi }{8}}=\tan 22.5^{\circ }={\sqrt {2}}-1\,

24°: 两倍的 12° 角[编辑 | 编辑源代码]

\sin {\frac {2\pi }{15}}=\sin 24^{\circ }={\tfrac {1}{8}}\left[{\sqrt {3}}({\sqrt {5}}+1)-{\sqrt {2}}{\sqrt {5-{\sqrt {5}}}}\right]\,

\cos {\frac {2\pi }{15}}=\cos 24^{\circ }={\tfrac {1}{8}}\left({\sqrt {6}}{\sqrt {5-{\sqrt {5}}}}+{\sqrt {5}}+1\right)\,

\tan {\frac {2\pi }{15}}=\tan 24^{\circ }={\tfrac {1}{2}}\left[{\sqrt {2(25+11{\sqrt {5}})}}-{\sqrt {3}}(3+{\sqrt {5}})\right]\,

25(6/7)°，(180/7)°：正七边形[编辑 | 编辑源代码]

\cos {\frac {\pi }{7}}=\cos {\frac {180}{7}}^{\circ }=\cos 25{\frac {6}{7}}^{\circ }={\frac {1}{6}}+{\frac {1-{\sqrt {3}}i}{24}}{\sqrt[{3}]{28-84{\sqrt {3}}i}}+{\frac {1+{\sqrt {3}}i}{24}}{\sqrt[{3}]{28-84{\sqrt {3}}i}}

27°: 12° 与 15° 的和[编辑 | 编辑源代码]

\sin {\frac {3\pi }{20}}=\sin 27^{\circ }={\tfrac {1}{8}}\left[2{\sqrt {5+{\sqrt {5}}}}-{\sqrt {2}}\;({\sqrt {5}}-1)\right]\,

\cos {\frac {3\pi }{20}}=\cos 27^{\circ }={\tfrac {1}{8}}\left[2{\sqrt {5+{\sqrt {5}}}}+{\sqrt {2}}\;({\sqrt {5}}-1)\right]\,

\tan {\frac {3\pi }{20}}=\tan 27^{\circ }={\sqrt {5}}-1-{\sqrt {5-2{\sqrt {5}}}}\,

30°: 正六边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{6}}=\sin 30^{\circ }={\tfrac {1}{2}}\,

\cos {\frac {\pi }{6}}=\cos 30^{\circ }={\tfrac {1}{2}}{\sqrt {3}}\,

\tan {\frac {\pi }{6}}=\tan 30^{\circ }={\tfrac {1}{3}}{\sqrt {3}}\,

33°: 15° 与 18° 之和[编辑 | 编辑源代码]

\sin {\frac {11\pi }{60}}=\sin 33^{\circ }={\tfrac {1}{16}}\left[2({\sqrt {3}}-1){\sqrt {5+{\sqrt {5}}}}+{\sqrt {2}}(1+{\sqrt {3}})({\sqrt {5}}-1)\right]\,

\cos {\frac {11\pi }{60}}=\cos 33^{\circ }={\tfrac {1}{16}}\left[2({\sqrt {3}}+1){\sqrt {5+{\sqrt {5}}}}+{\sqrt {2}}(1-{\sqrt {3}})({\sqrt {5}}-1)\right]\,

\tan {\frac {11\pi }{60}}=\tan 33^{\circ }={\tfrac {1}{4}}\left[2-(2-{\sqrt {3}})(3+{\sqrt {5}})\right]\left[2+{\sqrt {2(5-{\sqrt {5}})}}\right]\,

36°: 正五边形[编辑 | 编辑源代码]

\sin {\frac {\pi }{5}}=\sin 36^{\circ }={\tfrac {1}{4}}[{\sqrt {2(5-{\sqrt {5}})}}]\,

\cos {\frac {\pi }{5}}=\cos 36^{\circ }={\frac {1+{\sqrt {5}}}{4}}={\tfrac {1}{2}}\varphi \,

\tan {\frac {\pi }{5}}=\tan 36^{\circ }={\sqrt {5-2{\sqrt {5}}}}\,

39°: 18°角加21°角[编辑 | 编辑源代码]

\sin {\frac {13\pi }{60}}=\sin 39^{\circ }={\tfrac {1}{16}}[2(1-{\sqrt {3}}){\sqrt {5-{\sqrt {5}}}}+{\sqrt {2}}({\sqrt {3}}+1)({\sqrt {5}}+1)]\,

\cos {\frac {13\pi }{60}}=\cos 39^{\circ }={\tfrac {1}{16}}[2(1+{\sqrt {3}}){\sqrt {5-{\sqrt {5}}}}+{\sqrt {2}}({\sqrt {3}}-1)({\sqrt {5}}+1)]\,

\tan {\frac {13\pi }{60}}=\tan 39^{\circ }={\tfrac {1}{4}}\left[(2-{\sqrt {3}})(3-{\sqrt {5}})-2\right]\left[2-{\sqrt {2(5+{\sqrt {5}})}}\right]\,

42°: 21°的两 倍[编辑 | 编辑源代码]

\sin {\frac {7\pi }{30}}=\sin 42^{\circ }={\frac {{\sqrt {6}}{\sqrt {5+{\sqrt {5}}}}-{\sqrt {5}}+1}{8}}\,

\cos {\frac {7\pi }{30}}=\cos 42^{\circ }={\frac {{\sqrt {2}}{\sqrt {5+{\sqrt {5}}}}+{\sqrt {3}}({\sqrt {5}}-1)}{8}}\,

\tan {\frac {7\pi }{30}}=\tan 42^{\circ }={\frac {{\sqrt {3}}({\sqrt {5}}+1)-{\sqrt {2}}{\sqrt {5+{\sqrt {5}}}}}{2}}\,

45°: 正方形[编辑 | 编辑源代码]

\sin {\frac {\pi }{4}}=\sin 45^{\circ }={\frac {\sqrt {2}}{2}}={\frac {1}{\sqrt {2}}}\,

\cos {\frac {\pi }{4}}=\cos 45^{\circ }={\frac {\sqrt {2}}{2}}={\frac {1}{\sqrt {2}}}\,

\tan {\frac {\pi }{4}}=\tan 45^{\circ }=1

参见[编辑 | 编辑源代码]

参考文献[编辑 | 编辑源代码]

埃里克·韦斯坦因. Constructible polygon. MathWorld.
埃里克·韦斯坦因. Trigonometry angles. MathWorld.
- π/3 (60°) — π/6 (30°) — π/12 (15°) — π/24 (7.5°)
- π/4 (45°) — π/8 (22.5°) — π/16 (11.25°) — π/32 (5.625°)
- π/5 (36°) — π/10 (18°) — π/20 (9°)
- π/7 — π/14
- π/9 (20°) — π/18 (10°)
- π/11
- π/13
- π/15 (12°) — π/30 (6°)
- π/17
- π/19
- π/23
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