In the given question it is given that , AC = 105 yd, BC = 60 yd and angle ACB= 69.3 degree.
We have to find the distance of AB, and for that we use law of cosine, which is
[tex] (AB)^2 = (AC)^2 +(BC)^2-2(AC)(BC) cos \theta [/tex]
Substituting the values of AC, BC and theta, we will get
[tex] (AB)^2 = 105^2 +60^2 -2(105)(60) cos 69.3 [/tex]
[tex] (AB)^2 = 10171.217 [/tex]
[tex] AB= 101 yard [/tex]
