Answer:
The length AD is approximately 48.3 m
Step-by-step explanation:
Notice that in triangle CBD, angle B can be found by subtracting [tex]96^o[/tex] and [tex]38^o[/tex] from [tex]180^o[/tex] (addition of all internal angles of a triangle must be [tex]180^o[/tex]):
[tex]180^o-96^o-38^o=46^o[/tex]
So we complete the value in the attached image
We go now into finding the length of the bottom side CD in the triangle CBD, by using the law of sines in that triangle:
[tex]\frac{CD}{sin(46^o)} =\frac{27.3}{sin(38^o)} \\CD=\frac{27.3\,*\,sin(46^o)}{sin(38^o)} \\CD=31.9\,\,m[/tex]
Now we use this value in the law of cosines for the larger triangle ADC, since we know two sides and the angle in between:
[tex]AD^2=AC^2+CD^2-2\,AC * CD * cos (96^o)\\AD^2=(5.8+27.3)^2+31.9^2-2*33.1*31.9*cos(98^o)\\AD^2=2334\\AD=48.3 \,\,m[/tex]
