Announcements! Extra credit posted this coming Sunday--get your team together! Mon/Tue-Circular applications of Newton’s Laws Good examples in the book! Fuddrucker’s tomorrow (Tuesday) night Test this Thursday/Friday--practice test posted now!
An object moving in a circle of radius r w/ constant speed v has an acceleration directed toward the middle of the circle, with a magnitude Centripetal Acceleration
“Kinematics” = how things move “Dynamics” = why things move Objects moving in circles are accelerating (centripetally), so the next question is: “What causes centripetal acceleration? The answer: centripetal force. Centripetal Force! F centripetal
Centripetal Force = the “center-seeking” force necessary to keep an object moving in a circle. It’s important to understand that centripetal force is a general name used to describe any force(s) that keep an object moving in a circle, just like we use F net generally to describe the forces that accelerate an object linearly. The actual forces that make an object move centripetally are due to things that we’ve already discussed: F Tension for ropes, cords, strings, etc., F gravity for graviational force, F friction for... friction, and (in some odd cases) F normal, etc. Centripetal Force
Centripetal Force = the “center-seeking” force necessary to keep an object moving in a circle. Centripetal Force
Example At the beginning of a hammer throw, a 5 kg mass is swung in a horizontal circle of 2.0 m radius, at 1.5 revolutions per second. What is the centripetal force required to keep this object moving in a horizontal circle? (Ignore the vertical effect of gravity.)
Example: A 1000 kg car on a flat road is traveling at 14 m/s. a.On a curve of radius 50m, what centripetal force will be necessary to keep the car on the road? b. If the µ static for this road is 0.60, will the car make the turn? c. If the µ static for the road is 0.20, will the car make the turn? d. What is the maximum speed the car can have and still make the turn? Cool problem
Example: A 1000 kg car on a flat road is traveling at 14 m/s. d. How high should we bank the turn if we want the car to be able to stay on with no friction? Advanced Cool Problem
Example: A small body of mass m is suspended from a string of length L which makes an angle with the vertical. The body revolves in a horizontal circle. Find the speed of the body and the period (time) of one revolution in terms of L, , and fundamental constants. How the heck...? Problem
Vertical Circles Objects that are traveling in vertical circles are treated exactly the same as objects traveling in horizontal circles: the sum of the centripetal forces adds up to allow the object to accelerate centripetally, and thus, travel in a circle. (∑F c =ma c )
Vertical Circles One obvious challenge is that the Tension in the rope (in this example) is no longer the only force that is a factor in the ball’s circular motion--the force of gravity now has to be taken into account.
Vertical Circles Example: A 1.8-kg ball is being swung in a vertical circle, at the end of a 1.2-m long rope. a.What is the minimum velocity the ball can have at the top of its circular path? b.What is the Tension in the rope as the ball swings past the bottom of the path at 5.0 m/s?
Vertical Circles a.What is the minimum velocity the ball can have at the top of its circular path?
Vertical Circles a.What is the minimum velocity the ball can have at the top of its circular path?
Vertical Circles b. What is the Tension in the rope as the ball swings past the bottom of the path at 5.0 m/s?
Vertical Circles b. What is the Tension in the rope as the ball swings past the bottom of the path at 5.0 m/s?
So... what is centrifugal force?
Centrifugal force is an “apparent” force--a fake force!--that we mistakenly think pulls an object away from the center of the circle. There is no force pulling the ball outward!!! If you’re holding on to the string attached to the ball while it goes in a circle, it’s true that your hand feels an outward pull: this is due to Newton’s 3rd Law (your hand pulls on the ball to keep it moving in a circle, the ball pulls back on your hand). Centrifugal Force
It may help to think about what happens when we let go of the string: does the ball go flying away from the center of the circle, due to the mysterious, fake, centrifugal force? No! It continues to travel in a straight line from the point where it was let go. The fake centrifugal force is due to ball’s inertia. Centrifugal Force
Earlier, we said that an object moving in a circle can have radial and tangential accelerations. These obviously result from radial and tangential forces. Calculate the radial and tangential forces acting on the billiard ball, in terms of m, v, r, and Ø (angle from vertical). Non-Uniform Circular Motion