Textbook Question
A 2.00-kg rock has a horizontal velocity of magnitude 12.0 m/s when it is at point P in Fig. E10.35. At this instant, what are the magnitude and direction of its angular momentum relative to point O?
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Ch 10: Dynamics of Rotational Motion
Young & Freedman Calc14th EditionUniversity PhysicsISBN: 9780321973610
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Table of contents
- Ch 01: Units, Physical Quantities & Vectors41
- Ch 02: Motion Along a Straight Line67
- Ch 03: Motion in Two or Three Dimensions47
- Ch 04: Newton's Laws of Motion23
- Ch 05: Applying Newton's Laws59
- Ch 06: Work & Kinetic Energy14
- Ch 07: Potential Energy & Conservation8
- Ch 08: Momentum, Impulse, and Collisions18
- Ch 09: Rotation of Rigid Bodies42
- Ch 10: Dynamics of Rotational Motion48
- Ch 11: Equilibrium & Elasticity27
- Ch 12: Fluid Mechanics31
- Ch 13: Gravitation35
- Ch 14: Periodic Motion32
- Ch 15: Mechanical Waves25
- Ch 16: Sound & Hearing32
- Ch 17: Temperature and Heat36
- Ch 18: Thermal Properties of Matter38
- Ch 19: The First Law of Thermodynamics33
- Ch 20: The Second Law of Thermodynamics22
- Ch 21: Electric Charge and Electric Field36
- Ch 22: Gauss' Law24
- Ch 23: Electric Potential31
- Ch 24: Capacitance and Dielectrics18
- Ch 25: Current, Resistance, and EMF26
- Ch 26: Direct-Current Circuits30
- Ch 27: Magnetic Field and Magnetic Forces18
- Ch 28: Sources of Magnetic Field10
- Ch 29: Electromagnetic Induction28
- Ch 30: Inductance17
- Ch 31: Alternating Current21
- Ch 32: Electromagnetic Waves1
- Ch 33: The Nature and Propagation of Light20
- Ch 34: Geometric Optics34
- Ch 35: Interference19
- Ch 36: Diffraction25
- Ch 37: Special Relativity20
- Ch 38: Photons: Light Waves Behaving as Particles15
- Ch 39: Particles Behaving as Waves26
- Ch 40: Quantum Mechanics I: Wave Functions21
- Ch 41: Quantum Mechanics II: Atomic Structure25
- Ch 42: Molecules and Condensed Matter18
- Ch 43: Nuclear Physics16
- Ch 44: Particle Physics and Cosmology23
Young & Freedman Calc14th EditionUniversity PhysicsISBN: 9780321973610Not the one you use?Change textbook
Chapter 10, Problem 33a
Compute the torque developed by an industrial motor whose output is 150 kW at an angular speed of 4000 rev/min.
Verified step by step guidance1
First, understand the relationship between power, torque, and angular speed. The formula to use is: \( P = \tau \cdot \omega \), where \( P \) is power, \( \tau \) is torque, and \( \omega \) is angular speed.
Convert the given power from kilowatts to watts. Since 1 kW = 1000 W, multiply 150 kW by 1000 to get the power in watts.
Convert the angular speed from revolutions per minute (rev/min) to radians per second (rad/s). Use the conversion factor: \( 1 \text{ rev} = 2\pi \text{ rad} \) and \( 1 \text{ min} = 60 \text{ s} \). Therefore, \( \omega = 4000 \text{ rev/min} \times \frac{2\pi \text{ rad}}{1 \text{ rev}} \times \frac{1 \text{ min}}{60 \text{ s}} \).
Rearrange the formula \( P = \tau \cdot \omega \) to solve for torque: \( \tau = \frac{P}{\omega} \).
Substitute the values of power (in watts) and angular speed (in rad/s) into the equation to find the torque \( \tau \).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Torque
Torque is a measure of the rotational force applied to an object, causing it to rotate around an axis. It is calculated as the product of force and the distance from the axis of rotation, and is expressed in Newton-meters (Nm). In the context of motors, torque determines the motor's ability to perform work by rotating a shaft.
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Net Torque & Sign of Torque
Power
Power in physics is the rate at which work is done or energy is transferred. It is measured in watts (W) and is calculated as the product of torque and angular speed for rotating systems. In this problem, the motor's power output is given as 150 kW, which is crucial for determining the torque.
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Angular Speed
Angular speed refers to how quickly an object rotates or revolves relative to another point, typically measured in revolutions per minute (rev/min) or radians per second (rad/s). It is essential for calculating torque when combined with power, as it provides the rate of rotation needed to determine the motor's performance.
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Related Practice
Textbook Question
A 2.00-kg rock has a horizontal velocity of magnitude 12.0 m/s when it is at point P in Fig. E10.35. If the only force acting on the rock is its weight, what is the rate of change (magnitude and direction) of its angular momentum at this instant?
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Textbook Question
A 2.80-kg grinding wheel is in the form of a solid cylinder of radius 0.100 m. What constant torque will bring it from rest to an angular speed of 1200 rev/min in 2.5 s?
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Textbook Question
A playground merry-go-round has radius and moment of inertia about a vertical axle through its center, and it turns with negligible friction. A child applies an force tangentially to the edge of the merry-go-round for . If the merry-go-round is initially at rest, how much work did the child do on the merry-go-round?
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Textbook Question
An airplane propeller is 2.08 m in length (from tip to tip) and has a mass of 117 kg. When the airplane's engine is first started, it applies a constant torque of 1950 Nm to the propeller, which starts from rest. What is the instantaneous power output of the motor at the instant that the propeller has turned through 5.00 revolutions?
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Textbook Question
An electric motor consumes 9.00 kJ of electrical energy in 1.00 min. If one-third of this energy goes into heat and other forms of internal energy of the motor, with the rest going to the motor output, how much torque will this engine develop if you run it at 2500 rpm?
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