A 6 feet tall man finds an apple on the ground 6√3 feet away from him. What is the angle of depression when he is looking at the apple
Imagine the man standing to be a vertical straight line, AB, and the position of the apple to be at a point C.
Now if we connect the man’s head and feet to the position of the apple we can imagine it to be a right triangle with vertices ABC.
We already know that the height of the man is 6 feet and he is standing 6√3 feet away from the apple. Therefore, we can say that, AB = 6 feet and BC = 6√3 feet.
The angle of depression is the angle the line of sight makes with the horizontal level, i.e. the angle AC and AD. Let us name the angle θ.
∠ DAB = ∠ CBA = 90∘.
Therefore we can say that DA ∥ BC.
Now we can say that ∠ DAC = ∠ ACB, because they are alternate interior angles of the parallel lines AD and BC.
Let’s apply trigonometric ratios in the right triangle △ ABC to find θ
tan θ = ABBC
=1√3
θ = 30∘
= tan(30∘)
= 30∘