答案： $a=10$,$b=5\sqrt{3}$,$c=10\sqrt{3}$,$d=10$, $e=\frac{34\sqrt{3}}{3}$,$f=\frac{17\sqrt{3}}{3}$.

答案： 解:过点A作$AD\perp BC$于点D.$\because S_{\triangle ABC}=\frac{1}{2}BC\cdot AD=84$,$\therefore \frac{1}{2}× 14× AD=84$,$\therefore AD=12$.$\therefore BD=\sqrt{AB^{2}-AD^{2}}=9$,$CD=14-9=5$.$\therefore \tan C=\frac{AD}{DC}=\frac{12}{5}$.在$Rt\triangle ADC$中,$AC=\sqrt{AD^{2}+DC^{2}}=13$,过点B作$BE\perp AC$于点E.$\because S_{\triangle ABC}=\frac{1}{2}AC\cdot EB=84$,$\therefore EB=\frac{168}{13}$.$\therefore \sin\angle BAC=\frac{EB}{AB}=\frac{\frac{168}{13}}{15}=\frac{56}{65}$.

答案： 1.
(1)60
(2)24°52'44''
(3)32°,54°
(4)①80.5° ②77.7°

答案： 2.
(1)0.984 8
(2)0.173 6
(3)5.671 3