Answer: B

Let [math]P[/math] be the annual net premium

[math]P=\frac{1000 \bar{A}_{x: n}}{\ddot{a}_{x: n}}=\frac{1000(0.192)}{\ddot{a}_{x: n}}[/math]

where

[math]\ddot{a}_{x: n]}=\frac{1-A_{x: n}}{d}=\frac{(1.05)}{(0.05)}\left(1-A_{x: n]}^{1}-A_{x: n]}^{1}\right)[/math]

[math]A_{x: n}=\frac{i}{\delta}\left(A_{x: n}^{1}\right)+{ }_{n} E_{x}[/math]

[math]\Rightarrow 0.192=\frac{0.05}{0.04879}\left(A_{x: n}^{1}\right)+0.172[/math]

[math]\Rightarrow A_{x: n}^{1}=0.019516[/math]

[math]\Rightarrow \ddot{a}_{x: n \mid}=\frac{1.05}{0.05}(1-0.019516-0.172)=16.978[/math]

Therefore, we have

[math]P=\frac{1000(0.192)}{16.978}=11.31[/math]