Answer:
Approximately, there is a distance of 25,6 foot between the base of the flagpole to the house.
Step-by-step explanation:
We are given the following in the question:
Height of pole = 20 foot
Angle between pole and ground = 85 degrees
Angle of elevation from the base of the house to the top of the pole = 55 degrees
Then, the third angle of the triangle can be found as:
Angle sum property of triangle: The sum of the three angles of a triangle is 180 degrees.
[tex]x + 85 + 55 = 180\\x = 180 - 140\\x = 40^\circ[/tex]
Thus, by the sin rule, we can write:
[tex]\dfrac{\text{Distance from the base of the flagpole to the house}}{\sin 55} = \dfrac{20}{\sin 40}\\\\\Rightarrow \text{Distance from the base of the flagpole to the house} = 20\times \dfrac{\sin 55}{\sin 40}\\\\=20\times \dfrac{0.82}{0.64} = 25.625[/tex]
Approximately, there is a distance of 25,6 foot between the base of the flagpole to the house.
