A person stands on a scale inside an elevator accelerating upward with acceleration a. The scale reads:

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Study for the Newton's Laws of Motion Test. Engage with multiple choice and interactive questions, each hinting at concepts with detailed explanations. Master the principles and ace your exam!

Multiple Choice

A person stands on a scale inside an elevator accelerating upward with acceleration a. The scale reads:

When you’re in an elevator accelerating upward, the scale reading reflects the normal force that the scale exerts on you. That normal force must do two things at once: support your weight and provide the upward acceleration.

Apply Newton’s second law to the person: the upward normal force N minus the downward gravitational force mg equals the mass times the upward acceleration a. So N − mg = m a. Solve for N: N = m(g + a).

Since the scale reads that normal force, the reading is m(g + a).

This makes sense: you feel heavier when the elevator pushes you upward faster, and lighter if the elevator were moving downward or decelerating upward. If the elevator weren’t accelerating (a = 0), the reading would be mg.

A person stands on a scale inside an elevator accelerating upward with acceleration a. The scale reads:

Study for the Newton's Laws of Motion Test. Engage with multiple choice and interactive questions, each hinting at concepts with detailed explanations. Master the principles and ace your exam!

A person stands on a scale inside an elevator accelerating upward with acceleration a. The scale reads:

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