Download
1 / 29
290 likes | 810 Views
7.1 Characteristics of Uniform Circular Motion Objectives. Speed and Velocity Acceleration The Centripetal Force Requirement Mathematics of Circular Motion. Homework: castle learning. Uniform circular motion.
E N D
7.1 Characteristics of Uniform Circular Motion Objectives • Speed and Velocity • Acceleration • The Centripetal Force Requirement • Mathematics of Circular Motion Homework: castle learning
Uniform circular motion • Uniform circular motion is the motion of an object in a circle with a constant or uniform speed. The velocity is changing because the direction of motion is changing. • Velocity: • magnitude: constant • Direction: changing, tangent to the circle,
Circular Velocity Objects traveling in circular motion have constant speed and constantly CHANGING velocity – changing in direction but not magnitude How do we define VELOCITY? Velocity is TANGENT to the circle at all points What ‘d’ are we talking about? What ‘t’ are we talking about? PERIOD (T) Time for one revolution CIRCUMFERENCE C = 2πr = πd
Speed (tangential speed) and velocity Speed, magnitude of velocity: Direction of velocity: Tangent to the circle.
2·π·R vavg = T • The average speed and the Radius of the circle are directly proportional. The further away from the center, the bigger the speed.
Example 1 • A vehicle travels at a constant speed of 6.0 meters per second around a horizontal circular curve with a radius of 24 meters. The mass of the vehicle is 4.4 × 103 kilograms. An icy patch is located at P on the curve. On the icy patch of pavement, the frictional force of the vehicle is zero. Which arrow best represents the direction of the vehicle's velocity when it reaches icy patch P? a b c d
Example 2 • The diagram shows a 2.0-kilogram model airplane attached to a wire. The airplane is flying clockwise in a horizontal circle of radius 20. meters at 30. meters per second. If the wire breaks when the airplane is at the position shown, toward which point where will the airplane move? (A, B, C, D)
Example 3 • The diagram shows an object with a mass of 1.0 kg attached to a string 0.50 meter long. The object is moving at a constant speed of 5.0 meters per second in a horizontal circular path with center at point O. • If the string is cut when the object is at the position shown, draw the path the object will travel from this position.
Acceleration • An object moving in uniform circular motion is moving in a circle with a uniform or constant speed. The velocity vector is constant in magnitude but changing in direction. • Since the velocity is changing. The object is accelerating. where vi represents the initial velocity and vf represents the final velocity after some time of t
Example 4 • The initial and final speed of a ball at two different points in time is shown below. The direction of the ball is indicated by the arrow. For each case, indicate if there is an acceleration. Explain why or why not. Indicate the direction of the acceleration. a. No, no change in velocity yes, change in velocity, right b. yes, change in velocity, left c. yes, change in velocity, left d.
Direction of the Acceleration Vector in uniform circular moiton - • The velocity change is directed towards point C - the center of the circle. • The acceleration of the object is dependent upon this velocity change and is in the same direction as this velocity change. The acceleration is directed towards point C, the center as well, this acceleration is called the centripetal acceleration. +
Example 5 An object is moving in a clockwise direction around a circle at constant speed. • Which vector below represents the direction of the velocity vector when the object is located at point B on the circle? • Which vector below represents the direction of the acceleration vector when the object is located at point C on the circle? • Which vector below represents the direction of the velocity vector when the object is located at point C on the circle? • Which vector below represents the direction of the acceleration vector when the object is located at point A on the circle? d b a d
The Centripetal Force Requirement • According to Newton's second law of motion, an object which experiences an acceleration requires a net force. • The direction of the net force is in the same direction as the acceleration. So for an object moving in a circle, there must be an inward force acting upon it in order to cause its inward acceleration. This is sometimes referred to as the centripetal force requirement. • The word centripetal means center seeking. For object's moving in circular motion, there is a net force acting towards the center which causes the object to seek the center.
Centripetal Force Inertia causes objects to travel STRAIGHT Paths can be bent by FORCES CENTRIPETAL FORCE bends an object’s path into a circle - pulling toward the CENTER
Inertia, Force and Acceleration for an Automobile Passenger • Observe that the passenger (in blue) continues in a straight-line motion until he strikes the shoulder of the driver (in red). Once striking the driver, a force is applied to the passenger to force the passenger to the right and thus complete the turn. This force is the cause for turning. Without this force, the passenger would still travel in a straight line at constant speed (inertia).
Without a centripetal force, an object in motion continues along a straight-line path. With a centripetal force, an object in motion will be accelerated and change its direction.
Centrifugal force is a not real centrifugal (center fleeing) force A ‘fictitious’ force that is experienced from INSIDE a circular motion system centripetal (center seeking) force A true force that pushes or pulls an object toward the center of a circular path
Example 6 • An object is moving in a clockwise direction around a circle at constant speed • Which vector below represents the direction of the force vector when the object is located at point A on the circle? • Which vector below represents the direction of the force vector when the object is located at point C on the circle? • Which vector below represents the direction of the velocity vector when the object is located at point B on the circle? • Which vector below represents the direction of the velocity vector when the object is located at point C on the circle? • Which vector below represents the direction of the acceleration vector when the object is located at point B on the circle? d b d a c
2·π·R vavg = T 4π2R a = v2 T2 a = R Mathematics of Uniform Circular Motion
v2 a = R Relationship between quantities Fnet and a is directly proportional to the v2. F ~ v2 a ~ v2 If the speed of the object is doubled, the net force required for that object's circular motion and its acceleration are quadrupled. a is not related to mass F ~ m
Example 1 • A car going around a curve is acted upon by a centripetal force, F. If the speed of the car were twice as great, the centripetal force necessary to keep it moving in the same path would be • F • 2F • F/2 • 4F F = m v2 / r F in directly proportional to v2 F in increased by 22
Example 2 • Anna Litical is practicing a centripetal force demonstration at home. She fills a bucket with water, ties it to a strong rope, and spins it in a circle. Anna spins the bucket when it is half-full of water and when it is quarter-full of water. In which case is more force required to spin the bucket in a circle? Explain using an equation. It will require more force to accelerate a half-full bucket of water compared to a quarter-full bucket. According to the equation Fnet = m•v2 / R, force and mass aredirectly proportional. So the greater the mass, the greater the force.
Example 3 • The diagram shows a 5.0-kilogram cart traveling clockwise in a horizontal circle of radius 2.0 meters at a constant speed of 4.0 meters per second. If the mass of the cart was doubled, the magnitude of the centripetal acceleration of the cart would be • doubled • halved • unchanged • quadrupled ac = v2 / R
Example 4 • Two masses, A and B, move in circular paths as shown in the diagram. The centripetal acceleration of mass A, compared to that of mass B, is • the same • twice as great • one-half as great • four times as great F = m v2 / r
Example 5 • A 900-kg car moving at 10 m/s takes a turn around a circle with a radius of 25.0 m. Determine the acceleration and the net force acting upon the car. Given: = 900 kg; v = 10.0 m/s R = 25.0 m Find: a = ? Fnet = ? a = v2 / R a = (10.0 m/s)2 / (25.0 m) a = (100 m2/s2) / (25.0 m) a = 4 m/s2 Fnet = m • a Fnet = (900 kg) • (4 m/s2) Fnet = 3600 N
Example 6 • A 95-kg halfback makes a turn on the football field. The halfback sweeps out a path which is a portion of a circle with a radius of 12-meters. The halfback makes a quarter of a turn around the circle in 2.1 seconds. Determine the speed, acceleration and net force acting upon the halfback. Given: m = 95.0 kg; R = 12.0 m; Traveled 1/4 of the circumference in 2.1 s Find: v = ? a = ? Fnet = ? a = v2 / R a = (8.97 m/s)2/(12.0 m) a = 6.71 m/s2 v = d / t v = (1/4•2•π•12.0m) /(2.1s) v = 8.98 m/s Fnet = m*a Fnet = (95.0 kg)*(6.71 m/s2) Fnet = 637 N
Example 7 • Determine the centripetal force acting upon a 40-kg child who makes 10 revolutions around the Cliffhanger in 29.3 seconds. The radius of the barrel is 2.90 meters. Given: m = 40 kg; R = 2.90 m; T = 2.93 s (since 10 cycles takes 29.3 s). Find: Fnet Step 1: find speed: v = (2 • π • R) / T = 6.22 m/s. Step 2: find the acceleration: a = v2 / R = (6.22 m/s)2/(2.90 m) = 13.3 m/s2 Step 3: find net force: Fnet = m • a = (40 kg)(13.3 m/s/s) = 532 N.
