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Kinematics (1-d)Mr. Austin
Motion• Kinematics is the classification and comparison of an objects
motion.
• Three “rules” we will follow:• The motion is in a straight line• The cause of the motion is ignored (coming soon!)• The objects considered is a particle (not for long!)
• Particles and particle like objects move uniformly• Ex. A sled going down a hill• ANTI Ex. A ball rolling down a hill
Position• The location of the particle in space.
• Needs a mathematical description to be useful.
• We assign a number to represent the particles position on a coordinate grid.• There needs to be a zero point to reference• The positions to the left are negative• The positions to the right are positive
Vectors (more to come)• A vector is a mathematical representation of something that
has:• Size• Direction
• A scalar is a mathematical representation of something that has only size, but no direction.
• Direction is represented mathematically using a variety of methods.• Angles• Unit vectors• Algebraic signs
Displacement• Displacement is the change in a particles position
• It is a vector quantity• Has a size• Has a direction
• SI unit of: meters (m)
• Mathematically displacement is:
Sample Problem• What is the displacement of a car that starts at x = 5 meters
and ends at x = -3 meters?
• What is the displacement of a car that starts at x = -10 meters and ends at x = -12 meters?
Challenge• What is your displacement if you run one lap on a round 400m
track?
Displacement vs. Distance• Displacement is only concerned with the difference between
the starting point and ending point. It is a vector.
• Distance is the total length an object covers. It is a scalar.
Sample Problem• What is the distance and displacement, from position A (25m)
to F (-55m), of the car?
Distance Displacement
Plotting an Objects Position with Time
Average Velocity• The rate at which the position of an object changes with time• It is a vector
• Has a magnitude• Has a direction
• SI unit: meter/second (m/s)• Mathematically:
• This is the slope of a position time graph
Sample Problem• What is the average velocity if you run the length of football
field (91.4 meters) in 20 seconds?
Challenge• What is the average velocity if you circumnavigate the globe in
3 days?
• Always remember, velocity deals with the change in position from where an object started to where it ended with respect to time.• If you end where you started the displacement is zero!
Average Speed• The rate that a distance is covered relative to time• It is a scalar.• Unit: m/s• Mathematically:
• Challenge: Can average speed and average velocity be the same? Can they be different?
Sample Problem• A car pulls out of a driveway and goes 5 meters forward than
reverses 3 meters. All of this happens in 8 seconds. What is the average speed and velocity of the car?
Average Speed Average Velocity
Book Practice for Homework• Page 29 #1• Page 30 #1, 2, 3, 5, 8
Riddle
A man wishes to marry a wealthy kings daughter. The wealthy king, hoping to make a fool of the man, gives him a test. If the man
passes, the king explains, he will be married to the daughter. The man is blindfolded and taken outside. There are 20 statues in a line. All the
statues are black except for one which is white. The blindfolded man must find the white
statue to marry the daughter. How does he find it?
Instantaneous Velocity• Mr. Austin traveled from Garnet Valley High School’s parking
lot to the Franklin Institute (24.2 miles) in 42 minutes. What was Mr. Austin’s average speed?• Am I in trouble?
• Instantaneous velocity is the velocity of a particle at any given moment in time.• Can be positive, negative, or zero.
Instantaneous Velocity, graph
• The instantaneous velocity is the slope of the line tangent to the x vs. t curve
• This would be the green line
• The light blue lines show that as t gets smaller, they approach the green line
Average Speed vs Speed• Average speed is the distance traveled divided by the time it
takes to travel. Its is a scalar.
• Speed is simply the magnitude of instantaneous velocity. • Strip the velocity of any direction information• It is a scalar
Acceleration• The change in velocity of an object.
• It is a vector• Has a size• Has a direction
• Unit:
• Average acceleration is represented mathematically as:
Viewing Acceleration
Instantaneous Acceleration -- graph• The slope of the velocity-
time graph is the acceleration
• The green line represents the instantaneous acceleration
• The blue line is the average acceleration
Acceleration Expressed in g’s• When accelerations are large we express them as a multiple of
“g”•
• It is the acceleration due to gravity near the surface of the Earth
• A man starts from rest and is accelerated to the speed of sound (340.2 m/s) on a rocket sled. This occurs in .75 seconds. What is his acceleration in terms of g?
Constant Acceleration• This is a special case that tends to simplify things.
• Constant, or mostly constant, acceleration occurs all the time.• Car starting from rest when a light turns green• Car braking at a light when a light turns red
• There are a set of equations that are used to describe this motion.
Constant Acceleration Problem• A car starts from rest and accelerates uniformly to 23 m/s in 8
seconds. What distance did the car cover in this time?
Book Practice• Page 31 #22, 24, 28.
Free Fall Acceleration
• This is a case of constant acceleration that occurs vertically.• All things fall to the Earth with the same acceleration
• In the absence of air resistance, all things fall to the Earth with the same acceleration:
• This is invariant of the objects dimensions, density, weight etc.• When using the kinematic equations we use
• ay = -g = -9.80 m/s2
Free Fall – an object dropped
• Initial velocity is zero• Let up be positive• Use the kinematic
equations• Generally use y instead
of x since vertical
• Acceleration is • ay = -g = -9.80 m/s2
vo= 0
a = -g
Free Fall – an object thrown downward• ay = -g = -9.80 m/s2
• Initial velocity 0• With upward being
positive, initial velocity will be negative vo≠ 0
a = -g
Free Fall -- object thrown upward• Initial velocity is upward, so
positive• The instantaneous velocity
at the maximum height is zero
• ay = -g = -9.80 m/s2 everywhere in the motion
v = 0
vo≠ 0
a = -g
Thrown upward, cont.
• The motion may be symmetrical• Then tup = tdown
• Then v = -vo
• The motion may not be symmetrical• Break the motion into various parts
• Generally up and down
Free Fall Example
• Initial velocity at A is upward (+) and acceleration is -g (-9.8 m/s2)
• At B, the velocity is 0 and the acceleration is -g (-9.8 m/s2)
• At C, the velocity has the same magnitude as at A, but is in the opposite direction
• The displacement is –50.0 m (it ends up 50.0 m below its starting point)
Vertical motion sample problem• A ball is thrown upward with an initial velocity of 20 m/s.
• What is the max height the ball will reach?• What will the velocity of the ball be half way to the
maximum height?• What will the velocity of the ball be half way down to the
hand?• What is the total time the ball is in the air?
Book Practice
• Page 32 # 43, 47, 51.
Graphical Look at Motion: displacement – time curve• The slope of the curve
is the velocity• The curved line
indicates the velocity is changing• Therefore, there is an
acceleration
Graphical Look at Motion: velocity – time curve• The slope gives the
acceleration• The straight line
indicates a constant acceleration
• The zero slope indicates a constant acceleration
Graphical Look at Motion: acceleration – time curve
Test Graphical Interpretations
• Match a given velocity graph with the corresponding acceleration graph
Time (s)
v (m
/s)
Interpreting a Velocity vs. Time Graph
The area under the curve is the objects displacement.
Interpreting a Velocity vs. Time Graph
The area under the curve is the objects displacement.
Time (s)
v (m
/s)
Interpreting a Velocity vs. Time Graph
The area under the curve is the objects displacement.
Time (s)
v (m
/s)
General Problem Solving Strategy• Conceptualize• Categorize• Analyze• Finalize
Problem Solving – Conceptualize • Think about and understand the situation• Make a quick drawing of the situation• Gather the numerical information
• Include algebraic meanings of phrases
• Focus on the expected result• Think about units
• Think about what a reasonable answer should be
Problem Solving – Categorize • Simplify the problem
• Can you ignore air resistance? • Model objects as particles
• Classify the type of problem• Substitution• Analysis
• Try to identify similar problems you have already solved• What analysis model would be useful?
Problem Solving – Analyze
• Select the relevant equation(s) to apply• Solve for the unknown variable• Substitute appropriate numbers• Calculate the results
• Include units
• Round the result to the appropriate number of significant figures
Problem Solving – Finalize• Check your result
• Does it have the correct units?• Does it agree with your conceptualized ideas?
• Look at limiting situations to be sure the results are reasonable
• Compare the result with those of similar problems
Problem Solving – Some Final Ideas• When solving complex problems, you may need to
identify sub-problems and apply the problem-solving strategy to each sub-part
• These steps can be a guide for solving problems in this course
Quest Practice
•P. 29 Q1, 5a-c, 8; P. 30 P1, 6, 15, 22, 28, 35, 38, 40, 41, 47, 52, 63, 64, 74