A 90 kg Army Ranger trainee jumps out of a mechanically sound aircraft of their own free will. They quickly accelerate up to their terminal velocity of 60 m/s and then deploy their chute. The force of air resistance on their "system" (trainee and chute) can be characterized as: Fdrag = 0.25v2 Newtons, where v is the velocity of the trainee. After they deploy their chute, how far will they fall before they slow down to 10 m/s?
A 90 kg Army Ranger trainee jumps out of a mechanically sound aircraft of their own free will. They quickly accelerate up to their terminal velocity of 60 m/s and then deploy their chute. The force of air resistance on their "system" (trainee and chute) can be characterized as: Fdrag = 0.25v2 Newtons, where v is the velocity of the trainee. After they deploy their chute, how far will they fall before they slow down to 10 m/s?
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![A 90 kg Army Ranger trainee jumps out of a
mechanically sound aircraft of their own free will. They
quickly accelerate up to their terminal velocity of 60 m/s
and then deploy their chute. The force of air resistance
on their "system" (trainee and chute) can be
characterized as: Fdrag = 0.25v2 Newtons, where v is
the velocity of the trainee. After they deploy their chute,
how far will they fall before they slow down to 10 m/s?](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F285f3dd9-81e3-46a6-af72-5f837c4ea7e4%2F3747d588-4107-4f94-a664-b5535d045b82%2Fi8qgccu_processed.jpeg&w=3840&q=75)
Transcribed Image Text:A 90 kg Army Ranger trainee jumps out of a
mechanically sound aircraft of their own free will. They
quickly accelerate up to their terminal velocity of 60 m/s
and then deploy their chute. The force of air resistance
on their "system" (trainee and chute) can be
characterized as: Fdrag = 0.25v2 Newtons, where v is
the velocity of the trainee. After they deploy their chute,
how far will they fall before they slow down to 10 m/s?
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