问题
根据定积分的基本性质,若调换定积分 $\textcolor{Orange}{\int}_{\textcolor{White}{a}}^{\textcolor{White}{b}}$ $\textcolor{Orange}{f(x)}$ $\textcolor{Orange}{\mathrm{d} x}$ 的下限 $\textcolor{White}{a}$ 和上限 $\textcolor{White}{b}$, 则以下哪个选项是正确的?选项
[A]. $\int_{a}^{b}$ $f(x)$ $\mathrm{d} x$ $=$ $\int_{b}^{a}$ $f(-x)$ $\mathrm{d} (-x)$[B]. $\int_{a}^{b}$ $f(x)$ $\mathrm{d} x$ $=$ $0$
[C]. $\int_{a}^{b}$ $f(x)$ $\mathrm{d} x$ $=$ $\int_{b}^{a}$ $f(x)$ $\mathrm{d} x$
[D]. $\int_{a}^{b}$ $f(x)$ $\mathrm{d} x$ $=$ $-$ $\int_{b}^{a}$ $f(x)$ $\mathrm{d} x$
$$\int_{\textcolor{Red}{a}}^{\textcolor{Red}{b}} f(x) \mathrm{d} x =$$ $$\textcolor{Orange}{-} \int_{\textcolor{Red}{b}}^{\textcolor{Red}{a}} f(x) \mathrm{d} x$$