(i) The bearing of B from A and angle x are supplementary, then:
[tex]\begin{gathered} 120\degree+x=180\degree \\ x=180\degree-120\degree \\ x=60\degree \end{gathered}[/tex]
(ii)
From the above diagram, the bearing angle of A from B is:
[tex]120\degree+180\degree=300\degree[/tex]
(iii)
From the above diagram, the bearing angle of C from B is:
[tex]180\degree+52\degree=232\degree[/tex]
(iv)
Applying the law of cosines with the sides AB = 145m and CB = 240 m, and the angle ABC = 68°, the distance AC is:
[tex]\begin{gathered} AC^2=AB^2+CB^2-2\cdot AB\cdot CB\cdot cos\left(\angle ABC\right) \\ AC^2=145^2+240^2-2\cdot145\cdot240\cdot cos(68\degree) \\ AC^2=21025+57600-69600\cdot cos(68\operatorname{\degree}) \\ AC^2=52552.3811 \\ AC=\sqrt{52552.3811} \\ AC\approx229\text{ m} \end{gathered}[/tex]
