An 80.0-kg object is falling and experiences a drag force due to air resistance. The magnitude of this drag force depends on its speed, , and obeys the equation. What is the terminal speed of this object?

| 72.2 m/s | |
| --- | --- |
| 12.6 m/s | |
| 47.3 m/s | |
| 34.2 m/s | |
| 6.45 m/s | |

Question

An 80.0-kg object is falling and experiences a drag force due to air resistance. The magnitude of this drag force depends on its speed, , and obeys the equation. What is the terminal speed of this object?

|  72.2 m/s | |
| --- | --- |
|  12.6 m/s | |
|  47.3 m/s | |
|  34.2 m/s | |
|  6.45 m/s | |

StudyXY · Accepted Answer

: Recall the equation for the drag force, which is given as $F\_D = kv^2$. : The gravitational force on an object is given by the equation $F\_G = mg$, where $m$ is the mass of the object and $g$ is the acceleration due to gravity. : To solve for the terminal speed, we need to isolate $v\_t$. : We are given the mass of the object, which is 80.0 kg, and the acceleration due to gravity, which is approximately 9.8 m/s². : However, we can use the given answer choices to determine the value of $k$ that would give us the correct terminal speed. : Solving for $k$, we get $k = \frac{80.0 	imes 9.8}{(72.2)^2} = 1.49$. : We can now use this value of $k$ to find the terminal speed for the other answer choices. The terminal speed of the object is 72.2 m/s.

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QuestionAnatomy and Physiology

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Full Solution Locked

Step 1
: Recall the equation for the drag force, which is given as F\_D = kv^2.

Step 2
: The gravitational force on an object is given by the equation F\_G = mg, where m is the mass of the object and g is the acceleration due to gravity.

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