三角代換法

三角代換法是一種計算積分的方法，是代換積分法的一個特例。

含有a²-x²的積分

在積分

${\displaystyle \int {\frac {dx}{\sqrt {a^{2}-x^{2}}}}}$ 

中，我們可以用以下的代換

${\displaystyle x=a\sin \theta ,\ dx=a\cos \theta \,d\theta }$ 

${\displaystyle \theta =\arcsin {\frac {x}{a}}}$ 

這樣，積分變為：

${\displaystyle {\begin{aligned}\int {\frac {dx}{\sqrt {a^{2}-x^{2}}}}&=\int {\frac {a\cos \theta \,d\theta }{\sqrt {a^{2}-a^{2}\sin ^{2}\theta }}}\\&=\int {\frac {a\cos \theta \,d\theta }{\sqrt {a^{2}(1-\sin ^{2}\theta )}}}\\&=\int {\frac {a\cos \theta \,d\theta }{\sqrt {a^{2}\cos ^{2}\theta }}}\\&=\int d\theta =\theta +C\\&=\arcsin {\frac {x}{a}}+C\\\end{aligned}}}$ 

注意以上的步驟需要${\displaystyle a>0}$ 和${\displaystyle \cos \theta >0}$ ；我們可以選擇${\displaystyle a}$ 為${\displaystyle a^{2}}$ 的算術平方根，然後用反正弦函數把${\displaystyle \theta }$ 限制為${\displaystyle -{\frac {\pi }{2}}<\theta <{\frac {\pi }{2}}}$ 。

對於定積分的計算，我們必須知道積分限是怎樣變化。例如，當${\displaystyle x}$ 從0增加到${\displaystyle {\frac {a}{2}}}$ 時，${\displaystyle \sin \theta }$ 從0增加到${\displaystyle {\frac {1}{2}}}$ ，所以${\displaystyle \theta }$ 從0增加到${\displaystyle {\frac {\pi }{6}}}$ 。因此，我們有：

${\displaystyle \int _{0}^{\frac {a}{2}}{\frac {dx}{\sqrt {a^{2}-x^{2}}}}=\int _{0}^{\frac {\pi }{6}}d\theta ={\frac {\pi }{6}}.}$ 

含有a²+x²的積分

在積分

${\displaystyle \int {\frac {dx}{a^{2}+x^{2}}}}$ 

中，我們可以用以下的代換：

${\displaystyle x=a\tan \theta ,\ dx=a\sec ^{2}\theta \,d\theta }$ 

${\displaystyle \theta =\arctan {\frac {x}{a}}}$ 

這樣，積分變為：

${\displaystyle {\begin{aligned}\quad \int {\frac {dx}{a^{2}+x^{2}}}&=\int {\frac {a\sec ^{2}\theta \,d\theta }{a^{2}+a^{2}\tan ^{2}\theta }}\\&=\int {\frac {a\sec ^{2}\theta \,d\theta }{a^{2}[1+\tan ^{2}\theta ]}}\\&=\int {\frac {a\sec ^{2}\theta \,d\theta }{a^{2}\sec ^{2}\theta }}\\&=\int {\frac {d\theta }{a}}\\&={\frac {\theta }{a}}+C\\&={\frac {1}{a}}\arctan {\frac {x}{a}}+C\end{aligned}}}$ 

（a > 0）。

含有x² − a²的積分

以下的積分

${\displaystyle \int {\frac {dx}{x^{2}-a^{2}}}}$ 

可以用部分分式的方法來計算，但是，

${\displaystyle \int {\sqrt {x^{2}-a^{2}}}\,dx}$ 

則必須要用代換法：

${\displaystyle x=a\sec \theta ,\ dx=a\sec \theta \tan \theta \,d\theta }$ 

${\displaystyle \theta =\operatorname {arcsec} {\frac {x}{a}}}$ 

${\displaystyle {\begin{aligned}\quad \int {\sqrt {x^{2}-a^{2}}}\,dx&=\int {\sqrt {a^{2}\sec ^{2}\theta -a^{2}}}\cdot a\sec \theta \tan \theta \,d\theta \\&=\int {\sqrt {a^{2}(\sec ^{2}\theta -1)}}\cdot a\sec \theta \tan \theta \,d\theta \\&=\int {\sqrt {a^{2}\tan ^{2}\theta }}\cdot a\sec \theta \tan \theta \,d\theta \\&=\int a^{2}\sec \theta \tan ^{2}\theta \,d\theta \\&=a^{2}\int \sec \theta \ (\sec ^{2}\theta -1)\,d\theta \\&=a^{2}\int (\sec ^{3}\theta -\sec \theta )\,d\theta .\end{aligned}}}$ 

含有三角函數的積分

對於含有三角函數的積分，可以用以下的代換：

${\displaystyle \int f(\sin x,\cos x)\,dx=\int {\frac {1}{\pm {\sqrt {1-u^{2}}}}}f\left(u,\pm {\sqrt {1-u^{2}}}\right)\,du,\qquad \qquad u=\sin x}$ 

${\displaystyle \int f(\sin x,\cos x)\,dx=\int {\frac {-1}{\pm {\sqrt {1-u^{2}}}}}f\left(\pm {\sqrt {1-u^{2}}},u\right)\,du\qquad \qquad u=\cos x}$ 

${\displaystyle \int f(\sin x,\cos x)\,dx=\int {\frac {2}{1+u^{2}}}f\left({\frac {2u}{1+u^{2}}},{\frac {1-u^{2}}{1+u^{2}}}\right)\,du\qquad \qquad u=\tan {\frac {x}{2}}}$ 

${\displaystyle {\begin{aligned}\int {\frac {\cos x}{(1+\cos x)^{3}}}\,dx&=\int {\frac {2}{1+u^{2}}}{\frac {\frac {1-u^{2}}{1+u^{2}}}{\left(1+{\frac {1-u^{2}}{1+u^{2}}}\right)^{3}}}\,du\\&={\frac {1}{4}}\int (1-u^{4})\,du\\&={\frac {1}{4}}\left(u-{\frac {1}{5}}u^{5}\right)+C\\&={\frac {(1+3\cos x+\cos ^{2}x)\sin x}{5(1+\cos x)^{3}}}+C\end{aligned}}}$ 

參見

• 正切半角公式