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put this solution on YOUR website!The leaning tower of Pisa was originally perpendicular to the ground and 179 feet tall. Because of sinking into the earth, it now leans at a certain angle θ from the perpendicular. When the top of the tower is viewed from a point 150 feet from the center of its base, the angle of elevation is 53 degrees.Use the Lw of Sines to solve.
A) Approximate the angle θ.
:
Let Angle A = 53 degrees, then side a = 179
Let Angle B = angle of the tower, to a point on the ground, 150' from the tower center (A)
Then b = 150
:
Find Angle B
=
sin(B) =
sin(B) = .6692
B = 42 degrees
:
Find 3rd angle: 180 - 53 - 42 = 85 degrees
Angle from perpendicular: 90 - 85 = 5 degrees.
:
:
b) Approximate the distance d that the center of the top of the tower has moved from the perpendicular.
:
Find the tangent of 5 degrees:
Tan(5) =
d = .08749 * 179
d = 15.66 ft
