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Physics B and Honors Physics Welcome to Mr. Jones http://gljones.cmswiki.wikispaces.net

Kinematics • Kinematics is the branch of mechanics that describes the motion of objects without necessarily discussing what causes the motion. • We will learn to describe motion in two ways. • Using equations • Using graphs

Particle • A particle is an object that has mass but no volume and occupies a position described by one point in space. • Physicists love to turn all objects into particles, because it makes the math a lot easier.

Position • How do we represent a point in space? • a) One dimension • b) Two dimensions • c) Three dimensions (x) (x,y) (x,y,z)

Distance (d) • The total length of the path traveled by a particle. • “How far have you walked?” is a typical distance question. • SI unit: meter (m)

Displacement (Dx) • The change in position of a particle. • “How far are you from home?” is a typical displacement question. • Calculated by… x = xfinal – xinitial • SI unit: meter (m)

Delta (  ) •  is a Greek letter used to represent the words “change in”. x therefore means “change in x”. It is always calculated by final value minus initial value.

Concept Question Question: If x is the displacement of a particle, and d is the distance the particle traveled during that displacement, which of the following is always a true statement? • d = |Dx| • d < |Dx| • d > |Dx| • d > |Dx| • d < |Dx|

Practice Problem A particle moves from x = 1.0 meter to x = -1.0 meter. • What is the distance d traveled by the particle? • What is the displacement of the particle? 2.0 m 2.0 m @ 180°

B 100 m displacement 50 m distance A Distance vs Displacement • A picture can help you distinquish between distance and displacement.

Warm-up Problem You get on a ferris wheel of radius 20 meters at the bottom. When you reach the top on the first rotation • what distance have you traveled? • what is your displacement from the bottom? • When you are on your way back down, does the distance increase, decrease, or stay the same? What about the displacement? • What is the distance traveled after you have completed the full ride of 10 rotations? What about the displacement?

Warm-up Problem answers You get on a ferris wheel of radius 20.0 meters at the bottom. When you reach the top on the first rotation • d = ½ (2  r) =  r = 20  m = 62.8 m •  x = 20 + 20 = 40.0 m @ 90° • distance increases, displacement decreases • d = 10 (2  r) = 400  m = 1260 m  x = 0

Group Challenge Walk That Path

Average Speed • How fast a particle is moving. • vavg = d t where: vavg = rate (speed) d = distance  t = elapsed time • SI unit: m/s Average speed is always a positive number.

Average Velocity • How fast the displacement of a particle is changing. • vavg = ∆x ∆t where: vavg = average velocity ∆x = displacement ∆t = change in time • SI unit: m/s Average velocity is + or – depending on direction.

Demonstration • You are a particle located at the origin. • Demonstrate how you can move from x = 0 to x = 4.0 m with an average speed of 2.0 m/s. You may not leave the x-axis! • What was your average velocity in this case?

Demonstration • You are a particle located at the point x = 4.0 m. • Demonstrate how you can move from x = 4.0 m to x = -1.0 m with an average speed of 1.0 m/s. You may not leave the x-axis! • What is your average velocity in this case?

Demonstration • You are a particle located at the origin. • Demonstrate how you can move from x = 0 to x = 5.0 m and back with an average speed of 1.0 m/s. You may not leave the x-axis! • What was your average velocity in this case?

15.7 m/s 3.33 m/s Practice Problem A car makes a trip of 1½ laps around a circular track of diameter 100 meters in ½ minute. For this trip a) what is the average speed of the car? b) what is the magnitude of the average velocity?

Practice Problem How long will it take the sound of the starting gun to reach the ears of the sprinters if the starter is stationed at the finish line for a 100 m race? Assume that sound has a speed of about 340 m/s. Answer: 0.29 s

Practice Problem You drive in a straight line at 10 m/s for 1.0 km, and then you drive in a straight line at 20 m/s for another 1.0 km. What is your average speed? Answer: 13.3 m/s (this is probably NOT what you expected!) Always use the formula for average velocity; don’t just take an “average” of the velocities!

Acceleration (a) • Any change in velocity is called acceleration. • The sign (+ or -) of acceleration indicates its direction. • Acceleration can be… • speeding up • slowing down • turning

Uniform (Constant) Acceleration • In this course, we will generally assume that acceleration is constant. • With this assumption we are free to use this equation: a = ∆v ∆t • SI Unit: m/s2

Acceleration has a sign! • If the sign of the velocity and the sign of the acceleration is the same, the object speeds up. • If the sign of the velocity and the sign of the acceleration are different, the object slows down.

Practice Problem A 747 airliner reaches its takeoff speed of 180 mph in 30 seconds. What is its average acceleration?

Practice Problem A horse is running with an initial velocity of 11 m/s, and begins to accelerate at –1.81 m/s2. How long does it take the horse to stop?

Practice Problem What must a particular Olympic sprinter’s acceleration be if he is able to attain his maximum speed in ½ of a second? In some problems, estimation is an important part of the problem!

Big 3 Kinematic Equations x = xi + vit + 1/2at2 vf = vi + at vf2 = vi2 + 2a(xf – xi) or …

Big 3 Kinematic Equations d = vit + 1/2at2 vf = vi + at vf2 = vi2 + 2ad

Practice Problem A plane is flying in a northwest direction when it lands, touching the end of the runway with a speed of 130 m/s. If the runway is 1.0 km long, what must the acceleration of the plane be if it is to stop while leaving ¼ of the runway remaining as a safety margin?

Practice Problem Air bags are designed to deploy in 10 ms. Estimate the acceleration of the front surface of the bag as it expands. Express your answer in terms of the acceleration of gravity g.

Practice Problem You are driving through town at 12.0 m/s when suddenly a ball rolls out in front of you. You apply the brakes and decelerate at 3.5 m/s2. • How far do you travel before stopping? • When you have traveled only half the stopping distance, what is your speed? • How long does it take you to stop? • Sketch approximate x-vs-t, v-vs-t, a-vs-t graphs for this situation.

Practice Problem On a ride called the Detonator at Worlds of Fun in Kansas City, passengers accelerate straight downward from 0 to 20 m/s in 1.0 second. • What is the average acceleration of the passengers on this ride? • How fast would they be going if they accelerated for an additional second at this rate? • Sketch approximate x-vs-t, v-vs-t and a-vs-t graphs for this ride.

v t Practice Problem Describe the motion of this particle. It is moving in the +x direction at constant velocity. It is not accelerating.

v t Practice Problem Describe the motion of this particle. It is stationary.

v t Practice Problem Describe the motion of this particle. It starts from rest and accelerates in the +x direction. The acceleration is constant.

B v A Dv Dt t Practice Problem What physical feature of the graph gives the acceleration? The slope, because Dv/Dt is rise over run! a = Dv/Dt

Practice Problem Determine the acceleration from the graph. Ans: 10 m/s2

Practice Problem Determine the displacement of the object from 0 to 4 seconds. Ans: 0 Describe the motion. The object is initially moving in the negative direction at –20 m/s, slows gradually and momentarily is stopped at 2.0 seconds, and then accelerates in the + direction. At 4.0 seconds, it is back at the origin, and continues to accelerate in the + direction.

Position vs Time Graphs • Particles moving with no acceleration (constant velocity) have graphs of position vs time with one slope. The velocity is not changing since the slope is constant. • Position vs time graphs for particles moving with constant acceleration look parabolic. The instantaneous slope is changing. In this graph it is increasing, and the particle is speeding up.

Uniformly Accelerating Objects • You see the car move faster and faster. This is a form of acceleration. • The position vs time graph for the accelerating car reflects the bigger and bigger Dx values. • The velocity vs time graph reflects the increasing velocity.

Position vs Time Graphs • This object is moving in the positive direction and accelerating in the positive direction (speeding up). • This object is moving in the negative direction and accelerating in the negative direction (speeding up). • This object is moving in the negative direction and accelerating in the positive direction (slowing down).

x v A C t t v x B D t t Pick the constant velocity graph(s)… (This is not in the notes.)

x v a t t t Acceleration vs time Position vs time Velocity vs time Draw Graphs forStationary Particles

x v a t t t Acceleration vs time Position vs time Velocity vs time Draw Graphs forConstant Non-zero Velocity

x v a t t t Acceleration vs time Position vs time Velocity vs time Draw Graphs for ConstantNon-zero Acceleration

Kinematic Equations • v = vo + at • Use this one when you aren’t worried about x. • x = xo + vot + ½ at2 • Use this one when you aren’t worried about v. • v2 = vo2 + 2a(∆x) • Use this one when you aren’t worried about t.

Practice problems • Landing with a speed of 115 m/s and traveling due south, a jet comes to rest in 7.00 x 102 m. Assuming the jet slows with constant acceleration, find the magnitude and direction of its acceleration.

Practice problems • When you see a traffic light turn red you apply the brakes until you come to a stop. If your initial speed was 12 m/s, and you were headed due west, what was your average acceleration during braking? • Suppose the car in the previous problem comes to rest in 35 m. How much time does this take?

Practice problems • Starting from rest, a boat increases its speed to 4.30 m/s with constant acceleration • (a) What was the boat’s average speed? • (b) If it takes the boat 5.00 s to reach this speed, how far has it traveled?

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