Answer:
31m
Step-by-step explanation:
Sung is looking at the top of the 32m tall building at an angle of 75°
So, we need to calculate the distance of Sung to the base of the building.
So we call the unknown variable x
So to find x,
We solve.
x= (Sin 75°) * 32
x= 0.9659 * 32
x= 30.9088m
So, to the nearest tenth of a metre,
x= 31m.
Answer:
9.0 m
Step-by-step explanation:
Given:-
- The top of the building is at a height of P = 32 m
- The sight elevation from Sung to top is, θ = 75°
Find:-
To the nearest tenth of a meter, how far is Sung from the base of the building? *
Solution:-
- We can construct a right angle triangle from between Sung, foot of the building and top of the building.
- We will denote the distance between the building and Sung to be "B".
- We will apply trigonometric ratio of tangent which relates the distance of building from Sung "B" to the height of the building "H" with and angle of elevation "θ".
tan ( θ ) = P / B
B = P / tan ( θ )
- Pug in the values and solve for "B":
B = 32 / tan ( 75° )
B = 8.57 m
- The distance "B" to the nearest tenth would be = 9 m
