chapter 2: kinematics in one dimension displacement velocity acceleration hw2: chap. 2:...

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Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

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Page 1: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Chapter 2: Kinematics in one Dimension

DisplacementVelocity

AccelerationHW2: Chap. 2:

pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Page 2: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Position on a line

1. Reference point (origin)2. Distance3. Direction

Symbol for position: xSI units: meters, m

Page 3: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Displacement on a line

xf

xi

• Change of position is called Displacement:

Displacement is a vector quantityIt has magnitude and direction

Page 4: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Displacement

Defined as the change in position during some time interval Represented as x

SI units are meters (m) x can be positive or negative

Different than distance – the length of a path followed by a particle.

Displacement has both a magnitude and a direction so it is a vector.

Page 5: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Reference Frames and Displacement

We make a distinction between distance and displacement.

Displacement (blue line) is how far the object is from its starting point, regardless of how it got there.

Distance traveled (dashed line) is measured along the actual path.

Page 6: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Reference Frames and Displacement

The displacement is written:

Left:

Displacement is positive.

Right:

Displacement is negative.

Page 7: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Vectors and Scalars Vector quantities need both magnitude

(size or numerical value) and direction to completely describe them Will use + and – signs to indicate vector

directions Scalar quantities are completely described

by magnitude only

Page 8: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Average Speed and Average Velocity

Speed is how far an object travels in a given time interval:

Velocity includes directional information:

Page 9: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Average Speed Average speed =distance traveled/ time

elapsed Example: if a car travels 300 kilometer (km) in

2 hours (h), its average speed is 150km/h. Not to confuse with average velocity.

Page 10: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Example

Page 11: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Average Velocity The average velocity is rate at which

the displacement occurs

The SI units are m/s Is also the slope of the line in the

position – time graph

t

xx

t

xv ifaverage

Page 12: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Average Velocity, cont Gives no details about the motion Gives the result of the motion It can be positive or negative

It depends on the sign of the displacement It can be interpreted graphically

It will be the slope of the position-time graph

Page 13: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Example

Mary walks 4 meters East, 2 meters South, 4 meters West, and finally 2 meters North. The entire motion lasted for 24 seconds. Determine the average speed and the average velocity.

Page 14: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Mary walked a distance of 12 meters in 24 seconds; thus, her average speed was 0.50 m/s.

However, since her displacement is 0 meters, her average velocity is 0 m/s.

Remember that the displacement refers to the change in position and the velocity is based upon this position change. In this case of the teacher's motion, there is a position change of 0 meters and thus an average velocity of 0 m/s.

Page 15: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Not to Confuse Speed is a number : a scalar Velocity is a vector : with magnitude

and direction

Page 16: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Example 2-1: Runner’s average velocity.

The position of a runner as a function of time is plotted as moving along the x axis of a coordinate system. During a 3.00-s time interval, the runner’s position changes from x1 = 50.0 m to x2 = 30.5 m, as shown. What was the runner’s average velocity?

Average Velocity

Page 17: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

x2

t2

Average velocity from a graph of x(t)

Time (t)

Pos

ition

(x)

x1

t1

chord of slope12

12,

run

rise

tt

xx

t

xv xav

v(t) = slope of x(t)

Page 18: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Average Velocity

Example 2-2: Distance a cyclist travels.

How far can a cyclist travel in 2.5 h along a straight road if her average velocity is 18 km/h?

Page 19: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Instantaneous VelocityThe instantaneous velocity is the average velocity in the limit as the time interval becomes infinitesimally short.

Ideally, a speedometer would measure instantaneous velocity; in fact, it measures average velocity, but over a very short time interval.

Page 20: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Instantaneous velocity from a graph of x(t)

x

tTime (t)

Pos

ition

(x)

t

v(t) = slope of x(t)

+direction-direction

Sign+ slope- slope

P1 P2

Page 21: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Instantaneous Velocity

The instantaneous speed always equals the magnitude of the instantaneous velocity; it only equals the average velocity if the velocity is constant.

Page 22: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Instantaneous Velocity

Example 2-3: Given x as a function of t.

A jet engine moves along an experimental track (which we call the x axis) as shown. We will treat the engine as if it were a particle. Its position as a function of time is given by the equation x = At2 + B, where A = 2.10 m/s2 and B = 2.80 m. (a) Determine the displacement of the engine during the time interval from t1 = 3.00 s to t2 = 5.00 s. (b) Determine the average velocity during this time interval. (c) Determine the magnitude of the instantaneous velocity at t = 500 s.

Page 23: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

AccelerationAcceleration is the rate of change of velocity.

Example 2-4: Average acceleration.

A car accelerates along a straight road from rest to 90 km/h in 5.0 s. What is the magnitude of its average acceleration?

Page 24: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

Acceleration

Conceptual Example 2-5: Velocity and acceleration.

(a) If the velocity of an object is zero, does it mean that the acceleration is zero?

(b) If the acceleration is zero, does it mean that the velocity is zero? Think of some examples.

Page 25: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

AccelerationExample 2-6: Car slowing down.

An automobile is moving to the right along a straight highway, which we choose to be the positive x axis. Then the driver puts on the brakes. If the initial velocity (when the driver hits the brakes) is v1 = 15.0 m/s, and it takes 5.0 s to slow down to v2 = 5.0 m/s, what was the car’s average acceleration?

Page 26: Chapter 2: Kinematics in one Dimension Displacement Velocity Acceleration HW2: Chap. 2: pb.3,pb.8,pb.12,pb.22,pb.27,pb.29,pb.46

AccelerationThere is a difference between negative acceleration and deceleration:

Negative acceleration is acceleration in the negative direction as defined by the coordinate system.

Deceleration occurs when the acceleration is opposite in direction to the velocity.