$$$\frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}}$$$ 的積分

求$$$\int \frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}}\, dx$$$。

將分子和分母同時乘以一個 cos，並使用公式 $$$\cos^2\left(\alpha \right)=-\sin^2\left(\alpha \right)+1$$$（其中 $$$\alpha=x$$$），把其餘都用正弦表示:

$${\color{red}{\int{\frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{\sin^{2}{\left(x \right)} \cos{\left(x \right)}}{1 - \sin^{2}{\left(x \right)}} d x}}}$$

令 $$$u=\sin{\left(x \right)}$$$。

則 $$$du=\left(\sin{\left(x \right)}\right)^{\prime }dx = \cos{\left(x \right)} dx$$$ (步驟見»)，並可得 $$$\cos{\left(x \right)} dx = du$$$。

該積分變為

$${\color{red}{\int{\frac{\sin^{2}{\left(x \right)} \cos{\left(x \right)}}{1 - \sin^{2}{\left(x \right)}} d x}}} = {\color{red}{\int{\frac{u^{2}}{1 - u^{2}} d u}}}$$

由於分子次數不小於分母次數，進行多項式長除法（步驟見»）:

$${\color{red}{\int{\frac{u^{2}}{1 - u^{2}} d u}}} = {\color{red}{\int{\left(-1 + \frac{1}{1 - u^{2}}\right)d u}}}$$

逐項積分：

$${\color{red}{\int{\left(-1 + \frac{1}{1 - u^{2}}\right)d u}}} = {\color{red}{\left(- \int{1 d u} + \int{\frac{1}{1 - u^{2}} d u}\right)}}$$

配合 $$$c=1$$$，應用常數法則 $$$\int c\, du = c u$$$：

$$\int{\frac{1}{1 - u^{2}} d u} - {\color{red}{\int{1 d u}}} = \int{\frac{1}{1 - u^{2}} d u} - {\color{red}{u}}$$

進行部分分式分解（步驟可見 »）:

$$- u + {\color{red}{\int{\frac{1}{1 - u^{2}} d u}}} = - u + {\color{red}{\int{\left(\frac{1}{2 \left(u + 1\right)} - \frac{1}{2 \left(u - 1\right)}\right)d u}}}$$

逐項積分：

$$- u + {\color{red}{\int{\left(\frac{1}{2 \left(u + 1\right)} - \frac{1}{2 \left(u - 1\right)}\right)d u}}} = - u + {\color{red}{\left(- \int{\frac{1}{2 \left(u - 1\right)} d u} + \int{\frac{1}{2 \left(u + 1\right)} d u}\right)}}$$

套用常數倍法則 $$$\int c f{\left(u \right)}\, du = c \int f{\left(u \right)}\, du$$$，使用 $$$c=\frac{1}{2}$$$ 與 $$$f{\left(u \right)} = \frac{1}{u + 1}$$$：

$$- u - \int{\frac{1}{2 \left(u - 1\right)} d u} + {\color{red}{\int{\frac{1}{2 \left(u + 1\right)} d u}}} = - u - \int{\frac{1}{2 \left(u - 1\right)} d u} + {\color{red}{\left(\frac{\int{\frac{1}{u + 1} d u}}{2}\right)}}$$

令 $$$v=u + 1$$$。

則 $$$dv=\left(u + 1\right)^{\prime }du = 1 du$$$ (步驟見»)，並可得 $$$du = dv$$$。

所以，

$$- u - \int{\frac{1}{2 \left(u - 1\right)} d u} + \frac{{\color{red}{\int{\frac{1}{u + 1} d u}}}}{2} = - u - \int{\frac{1}{2 \left(u - 1\right)} d u} + \frac{{\color{red}{\int{\frac{1}{v} d v}}}}{2}$$

$$$\frac{1}{v}$$$ 的積分是 $$$\int{\frac{1}{v} d v} = \ln{\left(\left|{v}\right| \right)}$$$：

$$- u - \int{\frac{1}{2 \left(u - 1\right)} d u} + \frac{{\color{red}{\int{\frac{1}{v} d v}}}}{2} = - u - \int{\frac{1}{2 \left(u - 1\right)} d u} + \frac{{\color{red}{\ln{\left(\left|{v}\right| \right)}}}}{2}$$

回顧一下 $$$v=u + 1$$$：

$$- u + \frac{\ln{\left(\left|{{\color{red}{v}}}\right| \right)}}{2} - \int{\frac{1}{2 \left(u - 1\right)} d u} = - u + \frac{\ln{\left(\left|{{\color{red}{\left(u + 1\right)}}}\right| \right)}}{2} - \int{\frac{1}{2 \left(u - 1\right)} d u}$$

套用常數倍法則 $$$\int c f{\left(u \right)}\, du = c \int f{\left(u \right)}\, du$$$，使用 $$$c=\frac{1}{2}$$$ 與 $$$f{\left(u \right)} = \frac{1}{u - 1}$$$：

$$- u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - {\color{red}{\int{\frac{1}{2 \left(u - 1\right)} d u}}} = - u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - {\color{red}{\left(\frac{\int{\frac{1}{u - 1} d u}}{2}\right)}}$$

令 $$$v=u - 1$$$。

則 $$$dv=\left(u - 1\right)^{\prime }du = 1 du$$$ (步驟見»)，並可得 $$$du = dv$$$。

該積分可改寫為

$$- u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{{\color{red}{\int{\frac{1}{u - 1} d u}}}}{2} = - u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{{\color{red}{\int{\frac{1}{v} d v}}}}{2}$$

$$$\frac{1}{v}$$$ 的積分是 $$$\int{\frac{1}{v} d v} = \ln{\left(\left|{v}\right| \right)}$$$：

$$- u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{{\color{red}{\int{\frac{1}{v} d v}}}}{2} = - u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{{\color{red}{\ln{\left(\left|{v}\right| \right)}}}}{2}$$

回顧一下 $$$v=u - 1$$$：

$$- u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{\ln{\left(\left|{{\color{red}{v}}}\right| \right)}}{2} = - u + \frac{\ln{\left(\left|{u + 1}\right| \right)}}{2} - \frac{\ln{\left(\left|{{\color{red}{\left(u - 1\right)}}}\right| \right)}}{2}$$

回顧一下 $$$u=\sin{\left(x \right)}$$$：

$$- \frac{\ln{\left(\left|{-1 + {\color{red}{u}}}\right| \right)}}{2} + \frac{\ln{\left(\left|{1 + {\color{red}{u}}}\right| \right)}}{2} - {\color{red}{u}} = - \frac{\ln{\left(\left|{-1 + {\color{red}{\sin{\left(x \right)}}}}\right| \right)}}{2} + \frac{\ln{\left(\left|{1 + {\color{red}{\sin{\left(x \right)}}}}\right| \right)}}{2} - {\color{red}{\sin{\left(x \right)}}}$$

因此，

$$\int{\frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}} d x} = - \frac{\ln{\left(\left|{\sin{\left(x \right)} - 1}\right| \right)}}{2} + \frac{\ln{\left(\left|{\sin{\left(x \right)} + 1}\right| \right)}}{2} - \sin{\left(x \right)}$$

加上積分常數：

$$\int{\frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}} d x} = - \frac{\ln{\left(\left|{\sin{\left(x \right)} - 1}\right| \right)}}{2} + \frac{\ln{\left(\left|{\sin{\left(x \right)} + 1}\right| \right)}}{2} - \sin{\left(x \right)}+C$$

$$$\int \frac{\sin^{2}{\left(x \right)}}{\cos{\left(x \right)}}\, dx = \left(- \frac{\ln\left(\left|{\sin{\left(x \right)} - 1}\right|\right)}{2} + \frac{\ln\left(\left|{\sin{\left(x \right)} + 1}\right|\right)}{2} - \sin{\left(x \right)}\right) + C$$$A