Kinematics in One Dimension

Kinematics in One Dimension Chapter 2

Motion • Motion is defined as movement from one place to another. However, before we can say an object has moved, we have to define the frame of reference. • The frame of reference is going to be an object that you pick and relate to the motion of the object. • For example: Are you moving right now?

Motion • Remember that all motion is relative. • You can pick your frame of reference to make it easier on you. For example, a train…

Motion • Mechanics is the study of the motion of objects and is divided into two parts • Kinematics – how objects move • Dynamics – why objects move

Kinematics • We will be studying kinematics in one dimension. • This means we will be dealing with translational motion only.

Kinematics • When we are studying motion, there are 4 factors that we have to keep track of: • Time • Displacement • Velocity • Acceleration

Distance • Distance is the measure of how far an object has traveled. A distance is never negative and is denoted with the symbol x for movement in the horizontal distance and y for movement in the vertical distance. • Example: Running 100 m on a track.

Displacement • Displacement is another way to measure the distance covered but a displacement has a direction associated with it. It is also denoted with the symbol x (for horizontal) but the x has an arrow over it. • A displacement can be negative. • Example: Texas two-step.

Displacement is change in position. • Δx = x – x0

Velocity • Just measuring the change in position is only half of the story. To understand the motion of an object we must also know the velocity. • Velocity is how fast the object moves and the direction that the object moves. It is denoted by the symbol v with an arrow over it.

Velocity is the change in the displacement over the change in time. • v = Δx/Δt = (x-x0)/(t-t0) • What are the units of velocity?

Velocity vs. Speed • We often use the terms speed and velocity interchangeably but speed is how fast the object goes without relation to the direction. • Speed = distance/time • Velocity = displacement/time

Scalar vs. Vector • Velocity has a magnitude and a direction. It is a vector quantity. Displacement is also a vector quantity. • Speed, however, has only a magnitude. It is a scalar quantity. Time is also a scalar quantity. • Vectors are usually boldfaced and have a half arrow drawn over the top of them.

2 Kinds of Velocity • Average velocity is the total displacement divided by the time. Example: road trips • Instantaneous velocity is the velocity that you are going as the change in time approaches zero. Example: speedometer

Problem • 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. What is the runner’s average velocity?

Acceleration • Changes in velocity over time are known as accelerations. • As we speed up and slow down, we are constantly accelerating in a positive or negative direction.

Acceleration • a = Δv/Δt =(vf-vi)/Δt • Acceleration is the change of velocity over a period of time. With this in mind, what would be the units of acceleration?

A shuttle bus slows to a stop with an average acceleration of 1.8 m/s2 . How long does it take the bus to slow from 9.0 m/s to 0.0 m/s?

Just like velocity, acceleration has a magnitude and a direction. • In order to change acceleration, you have to change velocity. This means a change in direction or a change in magnitude.

Constant Acceleration • Constant acceleration occurs when the velocity changes by the same interval over the same time interval. • This also means that the displacement increases by the same interval. This does NOT mean that the intervals are the same! • The most famous acceleration is what?

Uniformly Accelerated Motion • When the acceleration is constant, there exists several well defined relationships between the velocity and the displacement.

The Equations • v = vo + at • vavg= ½ (v+v0)

Problem • Suppose a planner is designing an airport for small planes. One kind of airplane that might use this airport must reach a speed before takeoff of 100 km/h (27.8 m/s) and can accelerate at 2.0 m/s2. If the runway is 150m long, can this plane reach the proper speed to take off?

Problem Solving Strategy • Read it! • Draw a diagram! • Identify knowns and unknowns. • Identify the equation and solve it algebraically. • Calculate! • Check it!

Problem • A baseball pitcher throws a fastball with a speed of 44 m/s. Estimate the average acceleration of the ball during the throwing motion. It is observed that in throwing the baseball, the pitcher accelerates the ball through a displacement of about 3.5 m from behind the body to the point where it is released.

Free Fall • What falls faster, a crumpled up piece of paper or a bowling ball? • Neither falls faster. They fall at the same rate. Can you think why that would be? • They are both falling with the same acceleration – gravity!!

Anything that falls has a constant acceleration of 9.8 m/s2. • This motion is known as free fall. • Free fall allows objects to fall at the same rate.

The time is the same for each ball. What happens to the distance covered? So what is changing?

Gravity is a downward directed acceleration. • What sign does it have? • Now, the acceleration due to gravity does change as you get higher from the ground, but it is negligible.

What would happen if you first threw a ball up? • The acceleration would still be 9.8 m/s2. If the movement is in the y plane, the acceleration is going to be due to gravity.

Free Fall • Watch the ball. What happens? • When you throw the ball in the air, it will slow down until it reaches the top. At the top of its path, it will stop for a short time. After it stops, it will speed up until it hits the ground.

Bob throws a ball upward with a velocity of 3 m/s. He catches it in his hand a short while later. • What is the velocity that he catches it at? • How long does it take to get to the top of its path? • How long does it take for him to catch the ball again?

Graphing

Graphing • We can visualize how an object moves by graphing it. • Remember that the independent variable goes on the x-axis and the dependent variable goes on the y-axis. • What is the independent variable in a D vs T graph?

D vs T • When we graph distance vs. time, we can identify several key parts: • The speed • The total distance • The total time

D vs T • The speed of the graph is demonstrated by the slope of the line. • The slope is defined as the change in the rise over the change in the run. • What is the rise in a D vs T graph? • What is the run in a D vs T graph?

D vs T • How do you think that you could figure out the total distance covered? • The last number on the line! • How do you think that you could figure out the total time? • The last number on the line! • How do you think that you could figure out the total displacement covered? • The difference from zero.

D vs T

D vs T Summary • Flat line = no movement! • Slope = speed • Total distance = the last number • Total time = the last number • Total displacement = the difference from zero

V vs T • In a V vs T graph we can establish the same points as in a D vs T graph. However, we have to do it differently. • The velocity • The total distance • The total displacement • The total time • The acceleration

V vs T

V vs T Summary • Flat line = constant velocity • Slope = acceleration • Area under the curve is the distance • Area under the curve is the displacement but you need to consider direction. • Total time = the last time reading

What if the object is accelerating? Does this change the graph? • Yes it does! The D vs T graph becomes curved. • Can you figure out the velocity at a specific time? • Yes! You can take the tangent at that specific point.

When the object is accelerating in the positive direction, the curve is downward – like in a positive parabola. • When the object is accelerating in the negative direction, the curve is upward – like in a negative parabola.

Your turn!!! • Graph the following description of motion: • Bob decides that he wants to go to his friend Tim’s house. He walks 7 m to Tim’s house in 10 seconds. He then stays at Tim’s house for 1 minute. They decide to go to the comic book store 20 m away. It takes them 45 seconds to get there. They then spend 20 minutes there. • Graph the first 5 minutes of their journey.

What type of graph is it? • What was Bob’s speed for the first 10 seconds? • What was Bob and Tim’s speed for the trip to the comic book store? • What was their average speed?

Your turn again!!! • Graph the following description of motion: • Bob bikes over to his friend Fred’s house at a constant velocity of 2 m/s in 25 seconds. He stops at Fred’s house for 45 seconds and then they race to school at an acceleration of 0.5 m/s2 for 1 minute. They then coast to a stop for 30 seconds.

What type of graph was it? • What was their acceleration for the last 30 seconds of their trip? • What was the total displacement covered?

Translating the Graphs • If you know one of the graphs, you can get any of the others. • This is known as translation.

Kinematics in One Dimension