Respuesta :
Draw a right triangle so that its hypotenuse is 600 ft. The adjacent side is below the vertical, and it makes an angle of 75° with the hypotenuse.
Let h = height of the right triangle.
By definition,
sin75° = h/600
h = 600*sin75° = 579.555 = 580 ft (nearest ft)
Answer: 580 ft (nearest foot)
Let h = height of the right triangle.
By definition,
sin75° = h/600
h = 600*sin75° = 579.555 = 580 ft (nearest ft)
Answer: 580 ft (nearest foot)
Answer:
Height, h = 580 ft
Explanation:
It is given that,
The distance traveled by the plane, d = 600 feet
The airplane takes off at an angle of 75° from its starting point.
Let h is the vertical height above the runway. It is the trigonometric problem. Let h is the height of the vertical height above the runway. It can be calculated using the trigonometric formula as :
[tex]sin\theta=\dfrac{h}{d}[/tex]
[tex]sin(75)=\dfrac{h}{600}[/tex]
h = 579.55 feet
or
h = 580 ft
So, the vertical height above the runway is 580 feet. Hence, this is the required solution.
