5 Must Know Facts For Your Next Test

1. In uniform circular motion, the speed of the object remains constant, but its velocity changes due to continuous direction changes.
2. The centripetal acceleration is calculated using the formula $$a_c = \frac{v^2}{r}$$, where $$v$$ is the tangential speed and $$r$$ is the radius of the circular path.
3. The net force acting on an object in uniform circular motion is always directed toward the center of the circle, keeping it in its circular path.
4. An object moving in uniform circular motion experiences a constant angular velocity if it completes equal angles in equal time intervals.
5. The work done by centripetal force in uniform circular motion is zero since the force acts perpendicular to the direction of motion.

Review Questions

• How does uniform circular motion differ from linear motion in terms of acceleration?
  • Uniform circular motion differs from linear motion primarily because, in circular motion, even though speed remains constant, the direction of velocity is continuously changing, resulting in centripetal acceleration. In contrast, linear motion can have constant velocity if both speed and direction remain unchanged. Thus, while an object in uniform circular motion maintains a consistent speed, it experiences a constant change in velocity due to its changing direction.
• Explain how centripetal force relates to uniform circular motion and what happens if this force is not present.
  • Centripetal force is essential for maintaining uniform circular motion, as it acts toward the center of the circle to keep the object moving along its curved path. If this force is not present or insufficient, the object will no longer follow a circular trajectory and instead will move off in a straight line due to inertia, following Newton's first law of motion. This deviation from circular motion occurs because there is no net force acting toward the center to change the direction of the object's velocity.
• Analyze how changes in speed or radius affect an object's angular velocity and centripetal acceleration during uniform circular motion.
  • In uniform circular motion, changes in speed or radius have significant impacts on both angular velocity and centripetal acceleration. Angular velocity can be expressed as $$\omega = \frac{v}{r}$$; thus, increasing speed while keeping radius constant results in higher angular velocity. Conversely, increasing radius while maintaining speed leads to a decrease in angular velocity. For centripetal acceleration, increasing speed increases $$a_c$$ since it depends on $$v^2$$ while keeping radius constant. On the other hand, increasing radius decreases centripetal acceleration for a constant speed because $$a_c = \frac{v^2}{r}$$ directly relates acceleration to radius inversely.

© 2025 Fiveable Inc. All rights reserved.

AP® and SAT® are trademarks registered by the College Board, which is not affiliated with, and does not endorse this website.