设在极坐标系下, 区域的表示为 $D=\{(r, \theta) \mid 0 \leqslant \theta \leqslant 2 \pi, r \leqslant 1\}$, 记
$$
\begin{aligned}
& I_1=\int_0^{2 \pi} \mathrm{d} \theta \int_0^1(\cos r+r \cos \theta+r \sin \theta) r \mathrm{~d} r, \\
& I_2=\int_0^{2 \pi} \mathrm{d} \theta \int_0^1\left(\cos r^2-r \cos \theta+r \sin \theta\right) r \mathrm{~d} r, \\
& I_3=\int_0^{2 \pi} \mathrm{d} \theta \int_0^1\left(\cos r^4-r \cos \theta-r \sin \theta\right) r \mathrm{~d} r,
\end{aligned}
$$
则
$\text{A.}$ $I_1 < I_2 < I_3$.
$\text{B.}$ $I_2 < I_1 < I_3$.
$\text{C.}$ $I_3 < I_2 < I_1$.
$\text{D.}$ $I_3 < I_1 < I_2$.