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The plane continued to descend, but leveled off to an angle of descent of 3° degrees for approximately 2 miles. How many feet did they drop in altitude (d)? Round to the nearest 10th.

User AlBaraa Sh
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Final answer:

To calculate the drop in altitude (d), we can use trigonometry. The angle of descent is given as 3° degrees, and the distance traveled horizontally is 2 miles. By using the tangent function to find the drop in altitude, we find it to be approximately 313.01 feet.

Step-by-step explanation:

To calculate the drop in altitude (d), we can use trigonometry. The angle of descent is given as 3° degrees, which is equal to 3/180 * π radians. The distance traveled horizontally is 2 miles, which is equal to 2 * 5280 feet. We can use the tangent function to find the drop in altitude:

d = 2 * 5280 * tan(3/180 * π)

Using a calculator, this comes out to be approximately 313.01 feet. Round to the nearest 10th, the drop in altitude is 313.0 feet.

User Andrew Bennett
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ANSWER: Plane dropped 6097 feet in altitude.
BECAUSE: An airplane is at point A from where it continued to descend by 30° for an approximate distance of 2 miles
∠ACB = Angle of descent = 30°
Distance BC = 2 miles
Let the plane dropped the altitude = h miles
Now tan 30° =


h = 1.155 miles
h ≈ 1.16 miles
Since 1 mile = 5280 feet
1.15 miles = 5280×1.16 feet
= 6097 feet
Therefore, the plane dropped by 6097 feet vertically.
User Chemic
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