The expression for distance AB is :389 tan 88.60°. The angle D is 88.35°.The value of angle CAD in radians is 0.0532 rad.
Step-by-step explanation:
Given the information, you can sketch triangle ACB with ∠C=88.60° and a perpendicular bisector of segment CD as AB that forms 90° at B where the diatnace from C to B given as 389 ft you can find the length of the perpendicular bisector AB which is the distance between tower A and B.
Apply the tangent of an angle rule, where tangent of angle = opposite side length/adjacent side length
tan 88.60°=O/A
tan 88.60°=AB/389
AB=389 tan 88.60° = 15916.87 ⇒ 15917 (nearest foot)
B.
Given distance BD as 459 ft and the distance between tower A and B as 15917 ft you can calculate the value of angle ∠D by applying the tangent of an angle formula.
tan Ф=O/A where Ф=∠D
tan ∠D =15917/459
tan ∠D =34.6772834701
tan⁻(34.6772834701) =88.35°
C.
Finding angle ∠A in radians will be;
Applying the sum of angles in a triangle theorem
∠A=180°-(88.60°+88.35°) = 180°-176.95°=3.05°
Changing degrees to radians, multiply value of degrees by π/180°
3.05×π/180 =0.05323254 ⇒ 0.0532 rad
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Tangent of an angle formula :https://brainly.com/question/12003325
Keywords : horizontal distance,towers, elevation, perpendicular line, distance, equation, expression,hundredth
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