Physics GR-9A EOT1 2024-2025 PDF

Summary

This document is a preparation guide for the End of Term 1 final summative assessment in Grade 9 Advanced Physics (AY: 2024 – 2025). It covers topics like mechanics in one dimension, representing motion, and accelerated motion, including explanations, equations, and examples. The document also includes multiple-choice questions and critical thinking exercises.

Full Transcript

Grade 9 – Advanced. AY: 2024 – 2025... T 1.

End of Term 1 Final Summative Assessment Preparation.

Contents.
[Unit – 1] Mechanics in One Dimension.
Lessons.

Lesson – 1: Methods of Science.

Module 1: Physics Toolkit. Lesson – 2: Mathematics and Physics.
Lesson – 3: Measurement.
Lesson – 4: Graphing Data.

Lesson – 1: Picturing Motion.

Module 2: Representing Motion. Lesson – 2: Where and when?
Lesson – 3: Position – Time Graphs.
Lesson – 4: How Fast?

Lesson – 1: Acceleration.
Module 3: Accelerated Motion.
Lesson – 2: Motion with Constant Acceleration.
Lesson – 3: Free Fall.

You may use the following equations

∆𝑥 = 𝑥f − 𝑥i 𝑣f = 𝑣i + 𝑎̅∆𝑡 1 ∆𝑥 𝑥f − 𝑥i
𝑥f = 𝑥i + 𝑣i 𝑡 + 𝑎̅𝑡f2 𝑣̅ ≡ =
2 ∆𝑡 𝑡f − 𝑡i

𝑥 = 𝑣̅ 𝑡 + 𝑥i 𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) 𝑔 = 9.8 m⁄s2 ∆𝑣 𝑣f − 𝑣i
𝑎̅ ≡ =
∆𝑡 𝑡f − 𝑡i

Page 1 of 45
 PART ONE – MULTIPLE CHOICE QUESTIONS (MCQ)............. (LO): Learning Objective

LO – 1. Pages: 4 – 6. Questions 1 – 6 page 8.
(1) Define the term scientific method and list the common steps of scientific methods used in investigations.
(2) Define the term hypothesis and identify the ways in which a hypothesis can be tested.

Check Your Progress
1. Summarize the steps you might use to carry out an investigation using scientific methods.
1) Make observations and ask a question.
2) Research the problem and make a hypothesis.
3) Design and carry out an experiment.
4) Analyze to see if my hypothesis was supported.
5) Refine my question based on experimental results.

2. Define the term hypothesis. Identify three ways to test a hypothesis.
A hypothesis is an educated explanation. Hypotheses can be tested and evaluated.
A hypothesis is a possible explanation for a problem using what you know and what you observe. A
hypothesis can be tested by making observations, by building a model, or by performing an experiment.

3. Describe why it is important for scientists to avoid bias.
Bias can affect the results or conclusion of an investigation, making them invalid.

4. Explain why scientists use models. Give an example of a scientific model not mentioned in this lesson and
explain how it is useful.
Scientists use models to help explain or learn more about things that are too large, too small, or too far to
visualize or observe easily. Examples may include the solar system, a cell, or the aerodynamics of an aircraft.

Page 2 of 45
5. Analyze Your friend finds that 90 percent of students surveyed in the cafeteria like pizza. She says this
scientifically proves that everyone likes pizza. How would you respond?
Testing opinions is not scientific. It is impossible to prove that an opinion is true for everyone. In addition,
the survey was based on a small part of the population, and it only included students at one school. The
results cannot be extended to the entire population.

6. Critical Thinking An accepted value for free-fall acceleration is 9.8 m⁄s2. In an experiment with
pendulums, you calculate a value to be 9.4 m⁄s2. Should the accepted value be tossed out because of your
finding? Explain.
No; the value of 9.8 m⁄s 2 has been established by many other experiments, and to discard the finding you
would have to explain why it is wrong. There are probably some factors affecting your calculation, such as
friction or how precisely you measured the variables.

LO – 2: Pages: 9 – 10. Question 9 page 12.
Recognize physical quantities like time, mass, temperature, volume, density, and classify them into base and
derived quantities and specify the dimension of each quantity in the SI - system of units.

You need to memorize them.

Q (9). How many seconds are in a leap year?
Number of seconds in a leap year = 366 × 24 × 3600 = 31,622,400 s

Question: Which is NOT an Sl base unit?
[A] meter
[B] kilogram
[C] second
[D] degree Celsius

LO – 3: Pages: 10 – 11. Questions 9 – 11 page 12.
Use dimensional analysis to validate equations and to choose the appropriate conversion factor when
converting units.

Q (10) Rewrite 𝐹 = 𝐵𝑞𝑣 to find 𝑣 in terms of 𝐹, 𝑞, and 𝐵.

𝐹 = 𝐵𝑞𝑣

Page 3 of 45
𝐹 𝐵𝑞𝑣
=
𝐵𝑞 𝐵𝑞

𝐹
𝑣=
𝐵𝑞

Q (11). Using values given in a problem and the equation for distance, 𝑑𝑖𝑠𝑡𝑎𝑛𝑐𝑒 = 𝑠𝑝𝑒𝑒𝑑 𝑥 𝑡𝑖𝑚𝑒, you
calculate a car's speed to be 290 km/h. Is this answer reasonable? Explain. Under what circum-
stances might this be a reasonable answer?
For most cars, the answer is unreasonable because 290 km/h is equivalent to 81 m/s or 180 mph. The speed
might be reasonable for a race car.

LO – 4: Pages: 13 – 15. Q 12 – 17 Page 16.
Determine the sources of error and distinguish between precision and accuracy.

12. Precision and Accuracy You find a micrometer (a tool used to measure objects to the nearest 0.001 mm)
that has been bent. How does it compare to a new, high-quality meter-stick in its precision and accuracy?
It would be more precise but less accurate.

13. Accuracy Some wooden rulers do not start with 0 at the edge, but have it set in a few millimeters. How
could this improve the accuracy of the ruler?
As the edge of the ruler gets worn away over time, the first millimeter or two of the scale would also be worn
away if the scale started at the edge.

14. Parallax Does parallax affect the precision of a measurement that you make? Explain.
No; it doesn't change the fineness of the divisions on its scale.

15. Uncertainty Your friend tells you that his height is 182 cm. In your own words, explain the range of
heights implied by this statement.
His height would be between 181.5 cm and 182.5 cm. Precision of a measurement is one-half the smallest
division on the instrument. The height 182 cm would range ±0.5 cm.

16. Precision A box has a length of 18.1 cm, a width of 19.2 cm, and is 20.3 cm tall.
a. What is its volume?
b. How precise is the measurement of length? Of volume?
c. How tall is a stack of 12 of these boxes?
d. How precise is the measurement of the height of one box? Of 12 boxes?

[a]
Volume = Length × Width × Height
Volume = 18.1 cm × 19.2 cm × 20.3 cm
Volume = 7054.656 cm3
Volume = 7050 cm3 (3 Significant Figures )
Volume = 7.05 × 103 cm3

[b] nearest tenth of a cm; nearest 10 cm3
[c] Height of 12 boxes = 12 × 20.3 = 234.6 cm
[d] nearest tenth of a cm; nearest tenth of a cm

Page 4 of 45
17. Critical Thinking Your friend states in a report that the average time required for a car to circle a 2.4-km
track was 65.414 s. This was measured by timing 7 laps using a clock with a precision of 0.1 s. How much
confidence do you have in the results of the report? Explain.
You should not have much confidence in the precision of the report. A result can never be more precise than
the least precise measurement. The calculated average lap time exceeds the precision possible with the clock.

LO – 5: Pages: 14 – 15. Q 12 – 17 Page 16.
Measure the base quantities and some derived quantities using suitable measurement tools and record those
measurements taking into account significant figures and scientific notation.

LO – 6: Pages: 37 – 39. Questions: 10 – 14, Pages: 38 – 39.
Analyze curves of position versus time graphs and velocity versus time graphs for an object moving along a
straight line in uniform or non-uniform motion with constant or variable acceleration, and use the equations
of motion to solve relevant problems

For problems 10-12, refer to Figure 13.

Figure 13

10. The graph in Figure 13 represents the motion of a car moving along a straight highway. Describe in
words the car's motion.
The car begins at a position of 125.0 m and moves toward the origin, arriving at the origin 5.0 s after it
begins moving. The car continues beyond the origin.

11. Draw a particle model motion diagram that corresponds to the graph.

12. Answer the following questions about the car's motion. Assume that the positive x-direction is east of
the origin and the negative x-direction is west of the origin.
a. At what time was the car's position 25.0 m east of the origin?
b. Where was the car at time 𝑡 = 1.0 s?
c. What was the displacement of the car between times 𝑡 = 1.0 s and 𝑡 = 3.0 s?

Page 5 of 45
 [a] [b]
Average velocity Equation of Motion When is 𝑥 = 25 m? Where was the car at time 𝑡 = 1.0 s?

𝑥f − 𝑥i 𝑥 = 𝑣̅ 𝑡 + 𝑥i 25 = (−25)𝑡 + 125 𝑥 = (−25)𝑡 + 125
𝑣̅ =
𝑡f − 𝑡i
𝑥 = (−25)𝑡 + 125 𝑡 = 4.0 s 𝑥 = (−25)(1.00) + 125
0 − 125
𝑣̅ =
5−0 𝑥 = 100.0 m east of origin

𝑣̅ = −25 m⁄s

[c] The displacement of the car between times 𝑡 = 1.0 s and 𝑡 = 3.0 s?

∆𝑥 = 𝑥f − 𝑥i
∆𝑥 = 𝑥at 𝑡=3 − 𝑥at 𝑡=1
∆𝑥 = [(−25)(3) + 125] − [(−25)(1) + 125]
∆𝑥 = −50 m
∆𝑥 = 50.0 m to the west

13. The graph in Figure 14 represents the motion of two pedestrians who are walking along a straight
sidewalk in a city. Describe in words the motion of the pedestrians. Assume that the positive direction is east
of the origin.

Figure 13
The pedestrians walk the same distance during each time interval, and they both walk east the entire time.
Pedestrian A starts west of the origin, walks toward the origin, and continues walking east. Pedestrian B
starts east of the origin and walks east.

14. CHALLENGE Ari walked down the hall at school from the cafeteria to the band room, a distance of
100.0 m. A class of physics students recorded and graphed his position every 2.0 s, noting that he moved 2.6
m every 2.0 s. When was Ari at the following positions?
a. 25.0 m from the cafeteria
b. 25.0 m from the band room
c. Create a graph showing Ari's motion.

Page 6 of 45
 [a] [b]
Average velocity Equation of Motion When was Ari 25.0 m from When was Ari 25.0 m from the
the cafeteria? band room?
∆𝑥
𝑣̅ =
∆𝑡 𝑥 = 𝑣̅ 𝑡 + 𝑥i 𝑥 = (1.3)𝑡 𝑥 = (1.3)𝑡

2.6 𝑥 = (1.3)𝑡 + 0.0 25 = (1.3)𝑡 75 = (1.3)𝑡
𝑣̅ =
2.0
𝑥 = (1.3)𝑡 𝑡 = 19 s 𝑡 = 58 s
𝑣̅ = 1.3 m⁄s

Position – time graph. Motion diagram.

LO – 7: Pages: 43 – 44. Questions: 26 – 31, Pages: 45.
Explain the meaning of instantaneous position for an object in motion.

26. The graph in Figure 22 describes the motion of a cruise ship drifting slowly through calm waters.
The positive x-direction (along the vertical axis) is defined to be south.
a. What is the ship's average speed?
b. What is its average velocity?

Figure 22 Average velocity Average speed

𝑥f − 𝑥i ̅̅̅̅̅̅̅̅ = |𝑣̅ |
speed
𝑣̅ =
𝑡f − 𝑡i
̅̅̅̅̅̅̅̅
speed = |−0.3 m⁄s|
−1 − 0
𝑣̅ =
3−0 ̅̅̅̅̅̅̅̅
speed = 0.3 m⁄s

𝑣̅ = −0.3 m⁄s

𝑣̅ = 0.3 m⁄s north

Page 7 of 45
27. Describe, in words, the cruise ship's motion in the previous problem.
The ship is moving north at a speed of 0.3 m/s.

28. What is the average velocity of an object that moves from 6.5 cm to 3.7 cm relative to the origin in 2.3 s?
𝑥f − 𝑥i
𝑣̅ =
𝑡f − 𝑡i

3.7 − 6.5
𝑣̅ =
2.3
𝑣̅ = −1.2 cm⁄s
29. The graph in Figure 23 represents the motion of a bicycle.
a. What is the bicycle's average speed?
b. What is its average velocity?
Figure 23 Average velocity Average speed

𝑥f − 𝑥i ̅̅̅̅̅̅̅̅
speed = |𝑣̅ |
𝑣̅ =
𝑡f − 𝑡i
̅̅̅̅̅̅̅̅
speed = |0.7 km⁄min|
10 − 0
𝑣̅ =
15 − 0 ̅̅̅̅̅̅̅̅
speed = 0.7 km⁄min

𝑣̅ = 0.7 km⁄min (+ve)

30. Describe, in words, the bicycle's motion in the previous problem.
The bicycle is moving in the positive direction at a speed of 0.7 km/min.

31. CHALLENGE When Marshall takes his pet dog for a walk, the dog walks at a very consistent
pace of 0.55 m/s. Draw a motion diagram and a position-time graph to represent Marshall's dog
walking the 19.8-m distance from in front of his house to the nearest stop sign.
Equation of Motion Position – time Graph Motion Diagram

𝑥 = 𝑣̅ 𝑡 + 𝑥i

𝑥 = (0.55)𝑡 + 0.0

𝑥 = 0.55 𝑡

Page 8 of 45
LO – 8: Pages: 42 – 44. Figure 19 & Questions: 37 – 39, Pages: 48.
Analyze a position-time graph to describe an object's motion.

Figure 19.

For problems 37-39, refer to Figure 25.
Figure 25. 𝑥f − 𝑥i
𝑣̅ =
𝑡f − 𝑡i

−3 − 3
𝑣̅A = = −2 m⁄s
3−0

3−0
𝑣̅B = = 1.5 m⁄s
2−0

−3 − 2
𝑣̅C = = −1 m⁄s
5−0

4 − (−1)
𝑣̅D = = 1 m⁄s
5−0

37. Ranking Task Rank the position-time graphs according to the average speed, from greatest average
speed to least average speed. Specifically indicate any ties.
A, B, C = D

38. Contrast Average Velocities Describe differences in the average velocities shown on the graph for
objects A and B. Describe differences in the average velocities shown on the graph for objects C and D.
The magnitude of the average velocity of A is greater than that of B, but the average velocity of A is
negative, and the average velocity of B is positive. The magnitudes of the average velocities of C and D are
equal, but the average velocity of D is positive, and the average velocity of C is negative.

Page 9 of 45
39. Ranking Task Rank the graphs in Figure 25 according to each object's initial position, from most
positive position to most negative position. Specifically indicate any ties. Would your ranking be different if
you ranked according to initial distance from the origin?
A, C, B, D. Yes, the ranking from greatest to least distance would be A, C, D, B.

40. Average Speed and Average Velocity Explain how average speed and average velocity are related to
each other for an object in uniform motion.
Average speed is the absolute value of the average velocity if an object is in uniform motion.

41. Position Two cars are traveling along a straight road, as shown in Figure 26. They pass each other at
point B and then continue in opposite directions. The orange car travels for 0.25 h from point B to point C at
a constant velocity of 32 km/h east. The blue car travels for 0.25 h from point B to point D at a constant
velocity of 48 km/h west. How far has each car traveled from point B?
What is the position of each car relative to the origin, point A?

The orange car has traveled 8 The blue car has traveled 12
km east of point B. km west of point B.

∆𝑥BC = (32)(0.25) ∆𝑥BD = (−48)(0.25)
∆𝑥BC = 8.0 km ∆𝑥BD = −12.0 km

The orange car's position is 14 km east of the origin. The blue car's position is 6 km west of the origin.

LO – 9: Pages: 30 – 31. Questions: 1 – 5, Page: 31. Questions: 20 – 24, Page: 41
Conduct an investigation to show different kinds of motion using motion diagrams and particle models.

Q (1) How does a motion diagram represent an object's motion?
A motion diagram shows the positions of a moving object at equal time intervals.

Q (2) Describe the particle model motion diagram for a bike rider moving at a constant pace along a straight
path.
A series of equally spaced dots along a straight line. Each dot represents the position of the bike rider at
successive equal time intervals.

Page 10 of 45
Q (3) Draw a particle motion diagram corresponding to the motion in Figure 4 for a car coming to a stop at a
stop sign. What point on the car did you use to represent the car?

The point should be close to the center of the car.
As the car slowed down as it moved to the left,
the distance it traveled during each equal time
interval became less and less.

Q (4) Draw a particle model motion diagram corresponding to the motion diagram in Figure 5. What point on
the bird did you choose to represent the bird?
Figure 5

The point should be close to the center of the bird. The equal distances between the dots indicate
that the bird was flying at a constant speed.

Q (5) Draw particle model motion diagrams for two runners during a race in which the first runner crosses
the finish line as the other runner is three-fourths of the way to the finish line.
First Runner: Starts at the origin and moves steadily to the right, reaching the finish line (position 𝑥 = 𝐿) at
time 𝑡 = 𝑇.

Second Runner: Starts at the origin and moves to the right, but at a slower pace, reaching only three-fourths
of the distance to the finish line (𝑥 = 0.75𝐿) at time 𝑡 = 𝑇.

Page 11 of 45
Numerically Example.
The path length is 144 m. Runner 2 speed is 24 m/s, and runner 1 speed is 18 m/s.

𝑥2 = 24 𝑡 Runner 2 will pass the finish line in
𝑥1 = 18 𝑡 6.0 seconds.

Runner 2: While Runner 1 will be at:
144 = 24 𝑡
𝑡2 = 6 s 𝑥1 = 18 (6)
𝑥1 = 108 m
Runner 1:
144 = 18 𝑡 Form the finish line.
𝑡1 = 8 s
Note that:
108 3
=
144 4

Three-fourths of the way to the
finish line.

Q (20) Using the particle model motion diagram in Figure 16 of a baby crawling across a kitchen floor, plot
a position-time graph to represent the baby’s motion. The time interval between successive dots on the
diagram is 1 s.

The straight line formed by the dots indicated the baby crawled at a constant speed.
The positive slope of the line of dots shows that the baby was crawling in the positive direction away from
the origin.

Page 12 of 45
For problems 21–24, refer to Figure 17.

Q (21) Create a particle model motion diagram from the position-time graph of a hockey puck gliding across
the ice.
The diagram should show equally spaced dots. If the time interval between successive dots is one second, the
dots should be spaced to represent 20 m apart.

Time (s) 0 1 2 3 4 5 6 7
Position (m) 0 20 40 60 80 100 120 140

Q (22) Use the hockey puck’s position-time graph to determine the time when the puck was 10.0 m beyond
the origin. 0.5 seconds.

Q (23) Use the position-time graph to determine how far the hockey puck moved between 0.0 s and 5.0 s.
∆𝑥 = 𝑥f − 𝑥i
∆𝑥 = 100 − 0
∆𝑥 = 100 m
Q (24) Use the position-time graph for the hockey puck to determine how much time it took for the puck to
go from 40 m beyond the origin to 80 m beyond the origin.

∆𝑡 = 𝑡f − 𝑡i
∆𝑡 = 4 − 2
∆𝑡 = 2.0 s

LO – 10: Page 33. Questions 7 – 9, Page 36.
Express the motion of an object along a straight line (uniform and non-uniform) using motion and vector
diagrams and describe the motion in own words.

Page 13 of 45
Q (7) The motion diagram for a car traveling on an interstate highway is shown below. The starting and
ending points are indicated.
Start End

Make a copy of the diagram. Draw a vector to represent the car’s displacement from the starting time to the
end of the third time interval.

Q (8) Two students added a vector for a moving object's position at 𝑡 = 2 s to a motion diagram. When they
compared their diagrams, they found that their vectors did not point in the same direction. What is a possible
explanation for this?

A position vector goes from the origin to the object. When the
origins are different, the position vectors are different. On the other
hand, a displacement vector has nothing to do with the origin.

Q (9) The motion diagram for a boy walking to school is shown below.

Home School

Make a copy of this motion diagram and draw vectors to represent the displacement between each pair of
dots.

Page 14 of 45
LO – 11: Pages 58 – 60. Questions 1 – 4, Page 60.
Calculate the instantaneous acceleration from a velocity-time graph.

Q (1) The velocity-time graph in Figure 8 describes Steven's motion as he walks along the midway at the
state fair. Sketch the corresponding motion diagram. Include velocity vectors in your diagram.

Figure 8

Q (2) Use the 𝑣 − 𝑡 graph of the toy train in Figure 9 to answer these questions.
a. When is the train's speed constant?
b. During which time interval is the train's acceleration positive?
c. When is the train's acceleration most negative?

a. 5.0 to 15.0 s

b. 0.0 to 5.0 s

c. 15.0 to 20.0 s

Q (3) Refer to Figure 9 to find the average acceleration of the train during the following time intervals.
a. 0.0 s to 5.0 s
b. 15.0 s to 20.0 s
c. 0.0 s to 40.0 s
[a] [b] [c]
𝑣f − 𝑣i 𝑣f − 𝑣i 𝑣f − 𝑣i
𝑎̅ = 𝑎̅ = 𝑎̅ =
𝑡f − 𝑡i 𝑡f − 𝑡i 𝑡f − 𝑡i

10 − 0 4 − 10 0−0
𝑎̅ = 𝑎̅ = 𝑎̅ =
5−0 20 − 15 40 − 0

𝑎̅ = 2.0 m⁄s2 𝑎̅ = −1.2 m⁄s2 𝑎̅ = 0.0 m⁄s2

Page 15 of 45
Q (4) Plot a 𝑣 − 𝑡 graph representing the following motion: An elevator starts at rest from the ground floor
of a three-story shopping mall. It accelerates upward for 2.0 s at a rate of 0.5 m⁄s2 , continues up at a
constant velocity of 1.0 m/s for 12.0 s, and then slows down with a constant downward acceleration of
0.25 m⁄s2 for 4.0 s as it reaches the third floor.

LO – 12: Pages 56. Figure 4.
Describe the motion of an object if its velocity and acceleration are either in the same directions or opposite
directions, hence state if an object is slowing down or speeding up.

Question: The motion diagrams below show the motion of four busses moving along the 𝑥 – axis. Which
busses have positive acceleration?

(a) A and C

(b) B and D

(c) A and D

(d) B and C

Page 16 of 45
Example:

Assume the four buses have the same speed of
1.0 m/s.

Velocity – time function.
Bus – A 𝑣= 𝑡
Bus – B 𝑣 = −𝑡 + 6
Bus – C 𝑣 =𝑡−6
Bus – D 𝑣 =−𝑡

LO – 13: Page 57. Questions 1 – 4, Pages 60 – 61.
Analyze curves of position versus time graphs and velocity versus time graphs for an object moving along a
straight line in uniform or non-uniform motion with constant or variable acceleration and use the equations of
motion to solve relevant problems.

Q (1) A car moves forward up a hill at 12 m/s with a uniform backward acceleration of 1.6 m/s2.

1
∆𝑥 = 𝑣i 𝑡 + 𝑎 𝑡2
2
1
a. What is its displacement after 6.0 s? ∆𝑥 = (12 × 6.0) + ( × (−1.6) × 6.02 )
2
∆𝑥 = 43 m up the hill

1
∆𝑥 = 𝑣i 𝑡 + 𝑎 𝑡2
2
1
b. What is its displacement after 9.0 s? ∆𝑥 = (12 × 9.0) + ( × (−1.6) × 9.02 )
2
∆𝑥 = 43 m up the hill

Diagrams.
During the first 7.5 seconds. During the second 7.5 seconds.

Page 17 of 45
Graphs.
Position – Time Graph. 𝑥 = 12 𝑡 − 0.8 𝑡 2 Velocity – Time Graph. 𝑣 = 12 − 1.6 𝑡

LO – 14: Pages 67 – 69. Questions 23 – 27, Pages 68 – 69.
Apply the equation of motion relating the final position of an object to its initial position, initial velocity,
1
uniform acceleration, and time 𝑥f = 𝑥i + 𝑣i 𝑡 + 2 𝑎̅𝑡f2

Q (23) A skateboarder is moving at a constant speed of 1.75 m/s when she starts up an incline that causes
her to slow down with a constant acceleration of −0.20 m⁄s 2. How much time passes from when she begins
to slow down until she begins to move back down the incline?

𝑣f = 𝑣i + 𝑎̅∆𝑡
0 = 1.75 + (−0.20)(∆𝑡)

∆𝑡 = 8.75 s
∆𝑡 = 8.8 s

Q (24) A race car travels on a straight racetrack with a forward velocity of 44 m/s and slows at a constant rate
to a velocity of 22 m/s over 11 s. How far does it move during this time?

𝑣f − 𝑣i 1
𝑎̅ = 𝑥f = 𝑥i + 𝑣i 𝑡 + 𝑎̅𝑡f2
𝑡f − 𝑡i 2
1
22 − 44 𝑥f = 0 + (44 × 11) + (−2)(11)2
𝑎̅ = 2
11 𝑥f = 363 m
𝑎̅ = −2 m⁄s2 𝑥f = 360 m (2 Significant Figures )

Page 18 of 45
Q (25) A car accelerates at a constant rate from 15 m/s to 25 m/s while it travels a distance of 125 m. How
long does it take to achieve the final speed?

𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) 𝑣f = 𝑣i + 𝑎̅∆𝑡
252 = 152 + 2𝑎̅(125 − 0) 25 = 15 + (1.6)(∆𝑡)
𝑎̅ = 1.6 m⁄s2 ∆𝑡 = 6.25 s
∆𝑡 = 6.3 s (2 Significant Figures )

Q (26) A bike rider pedals with constant acceleration to reach a velocity of 7.5 m/s north over a time of 4.5 s.
During the period of acceleration, the bike's displacement is 19 m north. What was the initial velocity of the
bike?
Alternative Solution:
𝑣f = 𝑣i + 𝑎̅∆𝑡 𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) 𝑣i + 𝑣f
∆𝑥 = ( )𝑡
7.5 − 𝑣i 2
7.5 = 𝑣i + 𝑎̅(4.5)
7.52 = 𝑣i2 + 2 ( ) (19)
4.5 𝑣i + 7.5
7.5 − 𝑣i 19 = ( ) (4.5)
𝑎̅ = 𝑣i = 0.94 m⁄s north 2
4.5
𝑣i = 0.94 m⁄s north

Q (27) The car in the diagram travels west with a forward acceleration of 0.22 m/s 2. What was the car’s
velocity (𝑣i ) at point 𝑥i if it travels a distance of 350 m in 18.4 s?

1
∆𝑥 = 𝑣i 𝑡 + 𝑎 𝑡2
2
1
350 = (𝑣i × 18.4) + ( × 0.22 × 18.42 )
2

𝑣i = 17 m⁄s west

LO – 15: Pages 71 – 75. Questions 40 – 51 Pages 75 – 76.
Analyze the position-time, velocity-time, and acceleration-time graphs for an object under free fall.

Q (40) A construction worker accidentally drops a brick from a high scaffold.
a. What is the velocity of the brick after 4.0 s?
b. How far does the brick fall during this time?

Page 19 of 45
 [a] [b] Directions.
𝑣f = 𝑣i − 𝑔∆𝑡 1
∆y = 𝑣i 𝑡 − 𝑔 𝑡 2
2
𝑣f = 0 − (9.8)(4.0) 1
∆y = 0 − (9.8) (4.0)2
𝑣f = −39.2 m⁄s 2

𝑣f = 39 m⁄s downward ∆y = −78.4 m

|∆y| = 78 m

Q (41) Suppose for the previous problem you choose your coordinate system so that the opposite direction is
positive.
a. What is the brick's velocity after 4.0 s?
b. How far does the brick fall during this time?

[a] [b] Directions.
𝑣f = 𝑣i + 𝑔∆𝑡 1
∆y = 𝑣i 𝑡 + 𝑔 𝑡 2
2
𝑣f = 0 + (9.8)(4.0) 1
∆y = 0 + (9.8) (4.0)2
𝑣f = +39.2 m⁄s 2

𝑣f = 39 m⁄s downward ∆y = +78.4 m

|∆y| = 78 m

Q (42) A student drops a ball from a window 3.5 m above the sidewalk. How fast is it moving when it hits
the sidewalk?

𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦)

𝑣f2 − 0.02 = 2 (−9.8) (−3.5)

𝑣f = 8.3 m⁄s downward

Q (43) A tennis ball is thrown straight up with an initial speed of 22.5 m/s. It is caught at the same distance
above the ground.
a. How high does the ball rise?
b. How long does the ball remain in the air?

Page 20 of 45
 Vertical Displacement. Time of Flight. Diagram.

𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦) 𝑣f = 𝑣i + 𝑎𝑡

0.02 − (22.0)2 = 2 (−9.8)(∆𝑦) 0.0 = 22.5 + (−9.8 × 𝑡)

∆𝑦 = 25.8 m 𝑡max = 2.29 s

∆𝑦 = 26 m (2 Significant Figures ) 𝑡total = 2 × 𝑡max

𝑡total = 2 × 2.30

𝑡total = 4.6 s

Q (44) You decide to flip a coin to determine whether to do your physics or English homework first. The
coin is flipped straight up.
a. What are the velocity and acceleration of the coin at the top of its trajectory?
b. If the coin reaches a high point of 0.25 m above where you released it, what was its initial speed?
c. If you catch it at the same height as you released it, how much time was it in the air?

[a] [b] [c]

𝑣 = 0.0 m/s 𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦) 𝑣f = 𝑣i + 𝑎𝑡

𝑎 = 9.8 m/s2 downward 0.02 − 𝑣i2 = 2 (−9.8)(0.25) 0.0 = 2.2 + (−9.8 × 𝑡)

𝑣i2 = 4.9 𝑡max = 0.23 s

𝑣i = 2.2 m⁄s 𝑡total = 2 × 𝑡max

𝑡total = 2 × 0.23

𝑡total = 0.46 s

Q (45) A basketball player is holding a ball in her hands at a height of 1.5 m above the ground. She drops the
ball, and it bounces several times. After the first bounce, the ball only returns to a height of 0.75 m. After the
second bounce, the ball only returns to a height of 0.25 m.

a. Suppose downward is the positive direction. What would the shape of a velocity-time graph look like for
the first two bounces?
b. What would be the shape of a position-time graph for the first two bounces?

a. The velocity-time graph would be straight line segments that start at the origin and then rise, fall, and rise
again.
b. The graph would start at the origin and have an inverted parabolic shape.

Page 21 of 45
 The first fall After the first bounce. After the second bounce.
𝑣f = 𝑣i − 𝑔∆𝑡 𝑣f = 𝑣i − 𝑔∆𝑡 𝑣f = 𝑣i − 𝑔∆𝑡
𝑣f = 0 − (9.8)(𝑡) 0 = 𝑣i − (9.8)(𝑡max ) 0 = 𝑣i − (9.8)(𝑡max )
𝑣f = −9.8 𝑡 𝑣i 𝑣i
𝑡max = 𝑡max =
𝑔 𝑔
1 1
1 y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2 y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2
y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡 2 2 2
2
𝑣i 𝑔 𝑣i 2 𝑣i 𝑔 𝑣i 2
y = 1.5 − 4.9 𝑡 2 0.75 = 0 + 𝑣i ( ) − ( ) ( ) 0.25 = 0 + 𝑣i ( ) − ( ) ( )
𝑔 2 𝑔 𝑔 2 𝑔

𝑣i2 𝑣i2
0.75 = 0.25 =
2𝑔 2𝑔

𝑣i = √1.5 𝑔 𝑣i = √0.5 𝑔

y = √1.5 𝑔 𝑡 − 4.9 𝑡 2 y = √0.5 𝑔 𝑡 − 4.9 𝑡 2

y = √14.7 𝑡 − 4.9 𝑡 2 y = √4.9 𝑡 − 4.9 𝑡 2

The first fall After the first bounce. After the second bounce.
𝑣f = −9.8 𝑡 𝑣f = 𝑣i − 𝑔 𝑡 𝑣f = 𝑣i − 𝑔 𝑡
1 𝑣f = √14.7 − 9.8 𝑡 𝑣f = √4.9 − 9.8 𝑡
y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2
2
Time of flight: Time of flight:
2
0 = 1.5 − 4.9 𝑡 √14.7 √4.9
𝑡hang = 2 × 𝑡hang = 2 ×
3 9.8 9.8
𝑡 = √ = 0.55 s
𝑔 𝑡hang = 0.78 s 𝑡hang = 0.45 s

Page 22 of 45
Q (46) Free Fall Suppose you hold a book in one hand and a flat sheet of paper in your other hand. You drop
them both, and they fall to the ground. Explain why the falling book is a good example of free fall, but the
paper is not.

Free fall is the motion of an object when gravity is the only significant force on it. Air significantly affects
the paper but not the book.

Q (47) Your sister drops your house keys down to you from the second-floor window, as shown in the image.
What is the velocity of the keys when you catch them?

𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑥)

𝑣f2 − 0.02 = 2 (−9.8) (− 4.3)

𝑣f = 9.2 m⁄s downward

Q (48) Suppose a free-fall ride at an amusement park starts at rest and is in free fall.
a. What is the velocity of the ride after 2.3 s?
b. How far do people on the ride fall during the 2.3-s time period?

Velocity Displacement.
𝑣f = 𝑣i + 𝑎𝑡 1
∆𝑦 = 𝑣i 𝑡 + 𝑎 𝑡 2
2
𝑣f = 0.0 + (−9.8 × 2.3)
1
∆𝑦 = (0.0 × 𝑡) + (−9.8) (2.3)2
𝑣f = −22.54 m⁄s 2

𝑣f ≈ 23 m⁄s downward ∆𝑦 = −25.921 m

∆𝑦 ≈ −26 m
|∆𝑦| = 26 m

Page 23 of 45
Q (49) The free-fall acceleration on Mars is about one-third that on Earth. Suppose you throw a ball
upward with the same velocity on Mars as on Earth.
a. How would the ball's maximum height compare to that on Earth?
b. How would its flight time compare?

Maximum height. Flight time
Earth Mars Earth Mars
1
𝑔Mars = ×𝑔
𝑔 = 9.8 m⁄s2 3 𝑣f = 𝑣i − 𝑔𝑡 𝑣f = 𝑣i − 𝑔Mars 𝑡

𝑣f2 − 𝑣i2 = −2 𝑔 (𝑦 − 𝑦0 ) 𝑣f2 − 𝑣i2 = −2 𝑔Mars (𝑦 − 𝑦0 ) 0 = 𝑣i − 𝑔𝑡max 𝑔
0 = 𝑣i − 𝑡
3 max
0 − 𝑣i2 = −2 𝑔 (𝑦max − 0) 𝑔 𝑣i
0 − 𝑣i2 = −2 ( ) (𝑦max − 0) 𝑡max = 𝑣i
3 𝑔 𝑡max = 3 ×
𝑔
𝑣i2 = 2 𝑔 𝑦max Mars.
2 𝑔 𝑦max
𝑣i2 =
𝑣i2 3
𝑦max =
2𝑔 𝑣i2
𝑦max = 3 ×
2𝑔
a. The maximum height would be three times higher on Mars.
b. Flight time is three times longer on Mars.

Q (50) Suppose you throw a ball straight up into the air. Describe the changes in the velocity of the ball.
Describe the changes in the acceleration of the ball.
Velocity decreases at a constant rate as the ball travels upward. At the ball's highest point, velocity is zero.
As the ball begins to drop, the velocity begins to increase in the negative direction until it reaches the height
from which it was initially released. At that point, the ball has the same speed it had upon release. The
acceleration is constant throughout the ball's flight.

Q (51) A ball thrown vertically upward continues upward until it reaches a certain position, and then falls
downward. The ball's velocity is instantaneously zero at that highest point. Is the ball accelerating at that
point? Devise an experiment to prove or disprove your answer.

The ball is accelerating; its velocity is changing. Take a multi-flash photo to measure its position. From
photos, calculate the ball's velocity.

Page 24 of 45
 PART TWO – FREE RESPONSE QUESTIONS (FRQ)
QUESTION – 1:
Part A:
Define the terms scientific methods, hypothesis, model, scientific theory, and scientific law.
Pages 3 – 8, and Pages 17 – 22.

Scientific methods: The patterns of investigation procedures.

Hypothesis: A possible explanation for a problem using what you know and what you observe.

Model: A representation of an idea, event, structure, or object to help people better understand it.

Scientific theory: an explanation based on many observations during repeated experiments; valid only if
consistent with observations, can be used to make testable predictions, and is the simplest explanation; can be
changed or modified with the discovery of new data.

Scientific law: A statement about what happens in nature and seems to be true all the time.

Part B:
1. Identify variables in tabulated data and represent them in a suitable graph to determine the relationship
between the variables and obtain the mathematical equation describing that relationship to determine the value
of the dependent variable for a specific value of the independent variable and vice versa.
Page 8, and Page 22. Questions 1 – 6, and Questions 19 – 23.

2. Identify the relationship between the average change of a function between two points and the slope of the
secant joining these points and relate the slope of the tangent to the curve at a point to the rate of change of the
function at that point.

Q (1) Summarize the steps you might use to carry out an investigation using scientific methods.
1) Make observations and ask a question.
2) Research the problem and make a hypothesis.
3) Design and carry out an experiment.
4) Analyze to see if my hypothesis was supported.
5) Refine my question based on experimental results.

Mnemonic: MR. DAR

Q (2) Define the term hypothesis. Identify three ways to test a hypothesis.
A hypothesis is an educated explanation. Hypotheses can be tested and evaluated.

Q (3) Describe why it is important for scientists to avoid bias.
Bias can affect the results or conclusion of an investigation, making them invalid.

Q (4) Explain why scientists use models. Give an example of a scientific model not mentioned in this lesson
and explain how it is useful.
Scientists use models to help explain or learn more about things that are too large, too small, or too far to
visualize or observe easily. Examples may include the solar system, a cell, or the aerodynamics of an aircraft.
Page 25 of 45
Q (5) Your friend finds that 90 percent of students surveyed in the cafeteria like pizza. She says this
scientifically proves that everyone likes pizza. How would you respond?
Testing opinions is not scientific. It is impossible to prove that an opinion is true for everyone. In addition, the
survey was based on a small part of the population, and it only included students at one school. The results
cannot be extended to the entire population.

Q (6) An accepted value for free-fall acceleration is 9.8 m⁄s 2. In an experiment with pendulums, you
calculate a value to be 9.8 m⁄s2. Should the accepted value be tossed out because of your finding? Explain.
No; the value of 9.8 m⁄s2 has been established by many other experiments, and to discard the finding you
would have to explain why it is wrong. There are probably some factors affecting your calculation, such as
friction or how precisely you measured the variables.

Q (19) Graph the following data. Time is an independent variable.

Time (s) 0 5 10 15 20 25 30 35
Speed (m/s) 12 10 8 6 4 2 2 2

Q (20) What would be the meaning of a nonzero y-intercept in a graph of total mass versus volume?
There is a nonzero total mass when the volume of the material is zero. This could happen if the mass value
includes the material's container.

Mass = Density × Volume

𝑚 = 𝜌𝑉

Page 26 of 45
In graph representations, it is standard practice to position the dependent variable along the vertical axis (y-
axis) and the independent variable along the horizontal axis (x-axis).

This convention ensures clarity in data interpretation, as the dependent variable is understood to change in
response to variations in the independent variable.

Consequently, when naming graphs, we refer to the dependent variable "versus" the independent variable—for
instance, "mass versus volume," "position versus time," or "velocity versus time." This approach facilitates
accurate communication of data relationships and trends.

Q (21) Use the relationship illustrated in Figure 16 to determine the mass required to stretch the spring 15 cm.

Figure 16
Mathematically: intercept
𝑦 = Slope(𝑥) + Intercept

rise
Slope =
run
16 − 13.7
Slope =
30 − 0

Slope = 0.0766 cm⁄g

ℓ = Slope(𝑚) + Intercept

ℓ = 0.0766 𝑚 + 13.7

15 = 0.0766 𝑚 + 13.7

𝑚 = 17 g

Q (22) Use the relationship shown in Figure 18 to predict the travel time when speed is 110 km/h.
The graph represents an inverse relationship between Figure 18
time and speed.
𝑎 𝑎
𝑦= ⟹ 𝑡=
𝑥 𝑠

Choose point to find (a) ⟹ (60,5)
𝑎
5=
60

𝑎 = 300

300
𝑡=
𝑠
300
Calculate: 𝑡 = = 2.7 hours
110

Page 27 of 45
Q (23) Look again at the graph in Figure 16. In your own words, explain how the spring would be different if
the line in the graph were shallower or had a smaller slope.
The spring whose line has a smaller slope is stiffer and, therefore, requires more mass to stretch it 1 cm.

QUESTIONS – 2:
Part A:
Analyze curves of position versus time graphs and velocity versus time graphs for an object moving along a
straight line in uniform or non-uniform motion with constant or variable acceleration, and use the equations of
motion to solve relevant problems
Pages: 33 and 46 – 48. Questions 32 – 35. Questions: 36 – 42.

Part B:
Differentiate between scalar and vector quantities with examples.

For problems 32 - 35, refer to Figure 24.

32. The diagram at the right shows the path of a ship that sails at a constant velocity of 42 km/h east.
What is the ship's position when it reaches point C, relative to the starting point A. if it sails from point B to
point C in exactly 1.5 h?
𝑥 = 𝑣̅ 𝑡 + 𝑥i
𝑥 = (42 × 1.5) + 25
𝑥 = 88 km east
33. Another ship starts at the same time from point B, but its average velocity is 58 km/h east. What is
its position, relative to A, after 1.5 h?
𝑥 = 𝑣̅ 𝑡 + 𝑥i
𝑥 = (58 × 1.5) + 25
𝑥 = 112 km east
34. What would a ship's position be if that ship started at point B and traveled at an average velocity of 35
km/h west to point D in a time period of 1.2 h?
𝑥 = 𝑣̅ 𝑡 + 𝑥i
𝑥 = (35 × 1.2) − 25
𝑥 = 17 km west

Page 28 of 45
35. Suppose two ships start from point B and travel west. One ship travel at an average velocity of 35 km/h for
2.2 h. Another ship travels at an average velocity of 26 km/h for 2.5 h. What is the final position of each ship?

First Ship Second Ship
𝑥 = 𝑣̅ 𝑡 + 𝑥i 𝑥 = 𝑣̅ 𝑡 + 𝑥i
𝑥 = (35 × 2.2) − 25 𝑥 = (26 × 2.5) − 25
𝑥 = 52 km west 𝑥 = 40 km west

Q (36) Velocity and Position How is an object's velocity related to its position?
An object's velocity is the rate of change in its position.

For problems 37-39, refer to Figure 25.
Figure 25. 𝑥f − 𝑥i
𝑣̅ =
𝑡f − 𝑡i

−3 − 3
𝑣̅A = = −2 m⁄s
3−0

3−0
𝑣̅B = = 1.5 m⁄s
2−0

−3 − 2
𝑣̅C = = −1 m⁄s
5−0

4 − (−1)
𝑣̅D = = 1 m⁄s
5−0

37. Ranking Task Rank the position-time graphs according to the average speed, from greatest average speed
to least average speed. Specifically indicate any ties.
A, B, C = D

38. Contrast Average Velocities Describe differences in the average velocities shown on the graph for
objects A and B. Describe differences in the average velocities shown on the graph for objects C and D.
The magnitude of the average velocity of A is greater than that of B, but the average velocity of A is negative,
and the average velocity of B is positive. The magnitudes of the average velocities of C and D are equal, but
the average velocity of D is positive, and the average velocity of C is negative.

39. Rank the graphs in Figure 25 according to each object's initial position, from most positive position to
most negative position. Specifically indicate any ties. Would your ranking be different if you ranked according
to initial distance from the origin?
Page 29 of 45
A, C, B, D. Yes, the ranking from greatest to least distance would be A, C, D, B.

40. Explain how average speed and average velocity are related to each other for an object in uniform motion.
Average speed is the absolute value of the average velocity if an object is in uniform motion.

41. Two cars are traveling along a straight road, as shown in Figure 26. They pass each other at point B and
then continue in opposite directions. The orange car travels for 0.25 h from point B to point C at a constant
velocity of 32 km/h east. The blue car travels for 0.25 h from point B to point D at a constant velocity of 48
km/h west. How far has each car traveled from point B?
What is the position of each car relative to the origin, point A?

The orange car has traveled 8 The blue car has traveled 12 km
km east of point B. west of point B.

∆𝑥BC = (32)(0.25) ∆𝑥BD = (−48)(0.25)
∆𝑥BC = 8.0 km ∆𝑥BD = −12.0 km

The orange car's position is 14 km east of the origin. The blue car's position is 6 km west of the origin.

42. A car travels north along a straight highway at an average speed of 85 km/h. After driving 2.0 km, the car
passes a gas station and continues along the highway. What is the car's position relative to the start of its trip
0.25 h after it passes the gas station?

𝑥 = 𝑣̅ 𝑡 + 𝑥i

𝑥 = (85 × 0.25) + 2.0

𝑥 = 23.25 km

𝑥 = 23 km

QUESTION – 3:
Solve problems using the combination of equations of motion for constant acceleration.
Pages: 63 – 70. Questions: 16 – 39.

16. A golf ball rolls up a hill toward a miniature-golf hole. Assume the direction toward the hole is positive.
a. If the golf ball starts with a speed of 2.0 m/s and slows at a constant rate of 0.50 m⁄s 2 , what is its velocity
after 2.0 s?
b. What is the golf ball's velocity if the constant acceleration continues for 6.0 s?
c. Describe the motion of the golf ball in words and with a motion diagram.

Page 30 of 45
 [a] [b] [c]
The ball's velocity decreased in the first
𝑣f = 𝑣i + 𝑎̅∆𝑡 𝑣f = 𝑣i + 𝑎̅∆𝑡 case. In the second, the ball slowed to a stop
and then began rolling back down the hill.
𝑣f = 2.0 + (−0.5)(2.0) 𝑣f = 2.0 + (−0.5)(6.0)

𝑣f = 1.0 m⁄s 𝑣f = −1.0 m⁄s

17. A bus traveling 30.0 km/h east has a constant increase in speed of 1.5 m⁄s2. What is its velocity 6.8 s
later?
km 1000 m
30 = 30 × = 8.3 m⁄s
h 3600 h

𝑣f = 𝑣i + 𝑎̅∆𝑡
𝑣f = 8.3 + (1.5)(6.8)
𝑣f = 18.5 m⁄s
𝑣f = 66.72 km⁄h east

18. If a car accelerates from rest at a constant rate of 5.5 m⁄s 2 north, how long will it take for the car to reach
a velocity of 28 m/s north?
𝑣f = 𝑣i + 𝑎̅∆𝑡
28 = 0.0 + (5.5)(𝑡)
𝑡 = 5.1 s

19. A car slows from 22 m/s to 3.0 m/s at a constant rate of 2.1 m⁄s2. How many seconds are required before
the car is traveling at a forward velocity of 3.0 m/s?
𝑣f = 𝑣i + 𝑎̅∆𝑡
3.0 = 22 + (−2.1)(𝑡)
𝑡 = 9.0 s

20. The graph in Figure 13 describes the motion of two bicyclists, Akiko and Brian, who start from rest and
travel north, increasing their speed with constant acceleration. What was the total displacement of each
bicyclist during the time shown for each?
1
Hint: Use the area of a triangle: 𝑎𝑟𝑒𝑎 = (2) (𝑏𝑎𝑠𝑒)(ℎ𝑒𝑎𝑖𝑔ℎ𝑡)

Page 31 of 45
 Cyclist A Cyclist A Figure 18.

1 1
∆𝑥 = × 𝑏𝑎𝑠𝑒 × ℎ𝑒𝑖𝑔ℎ𝑡 ∆𝑥 = × 𝑏𝑎𝑠𝑒 × ℎ𝑒𝑖𝑔ℎ𝑡
2 2
1 1
∆𝑥 = × 3.0 × 6.0 ∆𝑥 = × 4.0 × 4.0
2 2

∆𝑥 = 9.0 m north ∆𝑥 = 8.0 m north

21. The motion of two people, Carlos and Diana, moving south along a straight path is described by the graph
in Figure 14. What is the total displacement of each person during the first 4.0-s interval shown on the graph?

Person C Person D Figure 14.

∆𝑥 = length × width 1
∆𝑥 = × base × height
2
∆𝑥 = 4.0 × 2.0
1
∆𝑥 = × 4.0 × 2.0
∆𝑥 = 8.0 m south 2

∆𝑥 = 4.0 m south

22. A car, just pulling onto a straight stretch of highway, has a constant acceleration from 0 m/s to 25 m/s west
in 12 s.
a. Draw a 𝑣 − 𝑡 graph of the car's motion.
b. Use the graph to determine the car's displacement during the 12.0-s time interval.
c. Another car is traveling along the same stretch of highway. It travels the same distance in the same time as
the first car, but its velocity is constant. Draw a 𝑣 − 𝑡 graph for this car's motion.
d. Explain how you knew this car's velocity.

Page 32 of 45
 [a] [b]

Displacement (∆𝑥) = Bounded Area
1
∆𝑥 = × base × height
2
1
∆𝑥 = × 12 × (−25)
2
∆𝑥 = −150 m = 150 m west

[c] [d]

The displacement was the same for both cars. For
the second car, then,

∆𝑥
𝑣̅ =
∆𝑡

− 150
𝑣̅ =
12

𝑣̅ = −12.5 m⁄s

𝑣̅ = 12.5 m⁄s West

Q (23) A skateboarder is moving at a constant speed of 1.75 m/s when she starts up an incline that causes her
to slow down with a constant acceleration of −0.20 m⁄s 2. How much time passes from when she begins to
slow down until she begins to move back down the incline?

𝑣f = 𝑣i + 𝑎̅∆𝑡
0 = 1.75 + (−0.20)(∆𝑡)

∆𝑡 = 8.75 s
∆𝑡 = 8.8 s

Page 33 of 45
Q (24) A race car travels on a straight racetrack with a forward velocity of 44 m/s and slows at a constant rate
to a velocity of 22 m/s over 11 s. How far does it move during this time?

𝑣f − 𝑣i 1
𝑎̅ = 𝑥f = 𝑥i + 𝑣i 𝑡 + 𝑎̅𝑡f2
𝑡f − 𝑡i 2
1
22 − 44 𝑥f = 0 + (44 × 11) + (−2)(11)2
𝑎̅ = 2
11 𝑥f = 363 m
𝑎̅ = −2 m⁄s2 𝑥f = 360 m (2 Significant Figures )

Q (25) A car accelerates at a constant rate from 15 m/s to 25 m/s while it travels a distance of 125 m. How
long does it take to achieve the final speed?

𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) 𝑣f = 𝑣i + 𝑎̅∆𝑡
252 = 152 + 2𝑎̅(125 − 0) 25 = 15 + (1.6)(∆𝑡)
𝑎̅ = 1.6 m⁄s 2 ∆𝑡 = 6.25 s
∆𝑡 = 6.3 s (2 Significant Figures )

Q (26) A bike rider pedals with constant acceleration to reach a velocity of 7.5 m/s north over a time of 4.5 s.
During the period of acceleration, the bike's displacement is 19 m north. What was the initial velocity of the
bike?
Alternative Solution:
𝑣f = 𝑣i + 𝑎̅∆𝑡 𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) 𝑣i + 𝑣f
∆𝑥 = ( )𝑡
7.5 − 𝑣i 2
7.5 = 𝑣i + 𝑎̅(4.5)
7.52 = 𝑣i2 + 2 ( ) (19)
4.5 𝑣i + 7.5
7.5 − 𝑣i 19 = ( ) (4.5)
𝑎̅ = 𝑣i = 0.94 m⁄s north 2
4.5
𝑣i = 0.94 m⁄s north

Q (27) The car in the diagram travels west with a forward acceleration of 0.22 m/s2. What was the car’s
velocity (𝑣i ) at point 𝑥i if it travels a distance of 350 m in 18.4 s?

1
∆𝑥 = 𝑣i 𝑡 + 𝑎 𝑡2
2
1
350 = (𝑣i × 18.4) + ( × 0.22 × 18.42 )
2

𝑣i = 17 m⁄s west

Page 34 of 45
28. A car with an initial velocity of 24.5 m/s east has an acceleration of 4.2 m⁄s2 west. What is its
displacement at the moment that its velocity is 18.3 m/s east?

𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i )

18.32 = 24.52 + 2(−4.2)(𝑥f − 0)
𝑥f = 32 m east

29. A man runs along the path shown in Figure 17. From point A to point B, he runs at a forward velocity of
4.5 m/s for 15.0 min. From point B to point C, he runs up a hill. He slows down at a constant rate of
0.050 m⁄s 2 for 90.0 s and comes to a stop at point C. What was the total distance the man ran?

(∆𝑥)total = (∆𝑥)AB + (∆𝑥)BC

1
(∆𝑥)total = (𝑣1 𝑡1 ) + (𝑣1 𝑡2 + 𝑎𝑡22 )
2

1
(∆𝑥)total = (4.5 × 15 × 60) + (4.5 × 90 + (−0.05)(90)2 )
2
(∆𝑥)total = 4252.5 m

(∆𝑥)total = 4.2525 km

(∆𝑥)total = 4.3 km

30. You start your bicycle ride at the top of a hill. You coast down the hill at a constant acceleration of
2.00 m⁄s2. When you get to the bottom of the hill, you are moving at 18.0 m/s, and you pedal to maintain that
speed. If you continue at this speed for 1.00 min, how far will you have gone from the time you left the
hilltop?
The nonuniform motion period The uniform motion period

𝑣f2 = 𝑣i2 + 2𝑎̅(𝑥f − 𝑥i ) ∆𝑥 = 𝑣 𝑡
(∆𝑥)total = 81 + 1080
2 2 ∆𝑥 = (18.0)(1.00 × 60)
18.0 = 0.0 + 2(2.0)(∆𝑥)
(∆𝑥)total = 1161 m
∆𝑥 = 81 m ∆𝑥 = 1080 m
(∆𝑥)total = 1.161 km

Page 35 of 45
31. Sunee is training for a 5.0-km race. She starts out her training run by moving at a constant pace of 4.3 m/s
for 19 min. Then she accelerates at a constant rate until she crosses the finish line 19.4 s later. What is her
acceleration during the last portion of the training run? Nonuniform

(∆𝑥)total = (∆𝑥)Uniform + (∆𝑥)Nonuniform

1
(∆𝑥)total = (𝑣1 𝑡1 ) + (𝑣1 𝑡2 + 𝑎𝑡22 )
2

1
5.0 × 1000 = (4.3 × 19 × 60) + (4.3 × 19.4 + (𝑎)(19.4)2 )
2

5000 = (4902) + (83.42 + 188.18 𝑎)

𝑎 = 0.077 m⁄s2

32. Sekazi is learning to ride a bike without training wheels. His father pushes him with a constant
acceleration of 0.50 m⁄s 2 east for 6.0 s. Sekazi then travels at 3.0 m/s east for another 6.0 s before falling.
What is Sekazi's displacement? Solve this problem by constructing a velocity-time graph for Sekazi's motion
and computing the area underneath the graphed line.

Displacement = Bounded Area.

1
∆𝑥 = ( × base × height) + (length × width)
2

1
∆𝑥 = ( × 6.0 × 3.0) + (6.0 × 3.0)
2

∆𝑥 = 27 m east

33. Given initial and final velocities and the constant acceleration of an object, what mathematical relationship
would you use to find the displacement?
The time independent equation of motion: 𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑥)

34. A woman driving west along a straight road at a speed of 23 m/s sees a deer on the road ahead. She applies
the brakes when she is 210 m from the deer. If the deer does not move and the car stops right before it hits the
deer, what is the acceleration provided by the car's brakes?

Page 36 of 45
 At the moment of applying the brakes. A complete stop before hitting
the deer.
𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑥)

0.02 − 232 = 2 (𝑎) (210)

𝑎 = −1.3 m⁄s 2

𝑎 = 1.3 m⁄s 2 east

35. The airplane in Figure 18 starts from rest and accelerates east at a constant 3.00 m⁄s 2 for 30.0 s before
leaving the ground.
a. What was the plane's displacement (∆𝑥)?
b. How fast was the airplane going when it took off?

The displacement. The velocity after 30.0 s.
1 𝑣f = 𝑣i + 𝑎𝑡
∆𝑥 = 𝑣i 𝑡 + 𝑎 𝑡 2
2
1 𝑣f = 0.0 + (3.0 × 30.0)
∆𝑥 = (0.0 × 30.0) + ( × 3.00 × 30.02 )
2
∆𝑥 = 1350 m 𝑣f = 90.0 m⁄s

36. An in-line skater accelerates from 0.0 m/s to 5.0 m/s in 4.5 s, then continues at this constant speed for
another 4.5 s. What is the total distance traveled by the in-line skater?

(∆𝑥)total = (∆𝑥)Nonuniform + (∆𝑥)Uniform

1
(∆𝑥)total = (𝑣1 𝑡2 + 𝑎𝑡22 ) + (𝑣1 𝑡1 )
2

1 5.0
(∆𝑥)total = (0.0 × 4.5 + ( ) (4.5)2 ) + (5.0 × 4.5)
2 4.5

(∆𝑥)total = 11.25 + 22.5

(∆𝑥)total = 34 m

Page 37 of 45
37. A plane travels 5.0 × 102 m north while accelerating uniformly from rest at 5.0 m⁄s 2. What final velocity
does it attain?

𝑣f2 = 𝑣i2 + 2 𝑎 (∆𝑥)

𝑣f2 = 0.02 + 2 (5) (500)
𝑣f = 71 m⁄s north

38. An airplane accelerated uniformly from rest at the rate of 5.0 m⁄s2 south for 14 s. What final velocity did
it attain?
𝑣f = 𝑣i + 𝑎𝑡
𝑣f = 0.0 + (5.0 × 14)
𝑣f = 70.0 m⁄s south

39. A sprinter walks to the starting blocks at a constant speed, then waits. When the starting pistol sounds, she
accelerates rapidly until she attains a constant velocity. She maintains this velocity until she crosses the finish
line, and then she slows to a walk, taking more time to slow down than she did to speed up at the beginning of
the race. Sketch a velocity-time and a position-time graph to represent her motion. Draw them one above the
other using the same time scale. Indicate on your position time graph where the starting blocks and finish line
are.

QUESTION – 4:
Pages: 9 – 10, 33 – 36, 71 – 74.
Questions: 9 – 11 Page 12, 7 – 9 Page 36, 40 – 51 Page 75.
Part A:
Recognize physical quantities like time, mass, temperature, volume, density, and classify them into base and
derived quantities and specify the dimension of each quantity in the SI - system of units.
Part B:
Differentiate between distance travelled and displacement and calculate them.
Part C:
1. Describe the motion of an object under free fall during its rising and falling motion.
2. Perform an investigation to study the acceleration due to gravity for a system in free fall.

Page 38 of 45
QUESTIONS: 9 – 11 PAGE 12.
Q (9). How many seconds are in a leap year?
Number of seconds in a leap year = 366 × 24 × 3600 = 31,622,400 s

Q (10) Rewrite 𝐹 = 𝐵𝑞𝑣 to find 𝑣 in terms of 𝐹, 𝑞, and 𝐵.

𝐹 = 𝐵𝑞𝑣

𝐹 𝐵𝑞𝑣
=
𝐵𝑞 𝐵𝑞

𝐹
𝑣=
𝐵𝑞

Q (11). Using values given in a problem and the equation for distance, 𝑑𝑖𝑠𝑡𝑎𝑛𝑐𝑒 = 𝑠𝑝𝑒𝑒𝑑 𝑥 𝑡𝑖𝑚𝑒, you
calculate a car's speed to be 290 km/h. Is this answer reasonable? Explain. Under what circum-
stances might this be a reasonable answer?
For most cars, the answer is unreasonable because 290 km/h is equivalent to 81 m/s or 180 mph. The speed
might be reasonable for a race car.

QUESTIONS: 7 – 9 PAGE 36.
Q (7) The motion diagram for a car traveling on an interstate highway is shown below. The starting and
ending points are indicated.
Start End

Make a copy of the diagram. Draw a vector to represent the car’s displacement from the starting time to the
end of the third time interval.

Q (8) Two students added a vector for a moving object's position at 𝑡 = 2 s to a motion diagram. When they
compared their diagrams, they found that their vectors did not point in the same direction. What is a possible
explanation for this?

A position vector goes from the origin to the object. When the
origins are different, the position vectors are different. On the other
hand, a displacement vector has nothing to do with the origin.

Page 39 of 45
Q (9) The motion diagram for a boy walking to school is shown below.

Home School

Make a copy of this motion diagram and draw vectors to represent the displacement between each pair of dots.

QUESTIONS: 40 – 51 PAGE 75.

Q (40) A construction worker accidentally drops a brick from a high scaffold.
a. What is the velocity of the brick after 4.0 s?
b. How far does the brick fall during this time?
[a] [b] Directions.
𝑣f = 𝑣i − 𝑔∆𝑡 1
∆y = 𝑣i 𝑡 − 𝑔 𝑡 2
2
𝑣f = 0 − (9.8)(4.0) 1
∆y = 0 − (9.8) (4.0)2
𝑣 = −39.2 m⁄s 2
f

𝑣f = 39 m⁄s downward ∆y = −78.4 m

|∆y| = 78 m

Q (41) Suppose for the previous problem you choose your coordinate system so that the opposite direction is
positive.
a. What is the brick's velocity after 4.0 s?
b. How far does the brick fall during this time?

[a] [b] Directions.
𝑣f = 𝑣i + 𝑔∆𝑡 1
∆y = 𝑣i 𝑡 + 𝑔 𝑡 2
2
𝑣f = 0 + (9.8)(4.0) 1
∆y = 0 + (9.8) (4.0)2
𝑣f = +39.2 m⁄s 2

𝑣f = 39 m⁄s downward ∆y = +78.4 m

|∆y| = 78 m

Page 40 of 45
Q (42) A student drops a ball from a window 3.5 m above the sidewalk. How fast is it moving when it hits the
sidewalk?

𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦)

𝑣f2 − 0.02 = 2 (−9.8) (−3.5)

𝑣f = 8.3 m⁄s downward

Q (43) A tennis ball is thrown straight up with an initial speed of 22.5 m/s. It is caught at the same distance
above the ground.
a. How high does the ball rise?
b. How long does the ball remain in the air?
Vertical Displacement. Time of Flight. Diagram.

𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦) 𝑣f = 𝑣i + 𝑎𝑡

0.02 − (22.0)2 = 2 (−9.8)(∆𝑦) 0.0 = 22.5 + (−9.8 × 𝑡)

∆𝑦 = 25.8 m 𝑡max = 2.29 s

∆𝑦 = 26 m (2 Significant Figures ) 𝑡total = 2 × 𝑡max

𝑡total = 2 × 2.30

𝑡total = 4.6 s

Q (44) You decide to flip a coin to determine whether to do your physics or English homework first. The coin
is flipped straight up.
a. What are the velocity and acceleration of the coin at the top of its trajectory?
b. If the coin reaches a high point of 0.25 m above where you released it, what was its initial speed?
c. If you catch it at the same height as you released it, how much time was it in the air?

[a] [b] [c]
𝑣f = 𝑣i + 𝑎𝑡
𝑣 = 0.0 m/s 𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑦)
0.0 = 2.2 + (−9.8 × 𝑡)
2
𝑎 = 9.8 m/s downward 0.0 − 2
𝑣i2 = 2 (−9.8)(0.25)
𝑡max = 0.23 s
𝑣i2 = 4.9
𝑡total = 2 × 𝑡max
𝑣i = 2.2 m⁄s
𝑡total = 2 × 0.23

𝑡total = 0.46 s

Page 41 of 45
Q (45) A basketball player is holding a ball in her hands at a height of 1.5 m above the ground. She drops the
ball, and it bounces several times. After the first bounce, the ball only returns to a height of 0.75 m. After the
second bounce, the ball only returns to a height of 0.25 m.

a. Suppose downward is the positive direction. What would the shape of a velocity-time graph look like for the
first two bounces?
b. What would be the shape of a position-time graph for the first two bounces?

a. The velocity-time graph would be straight line segments that start at the origin and then rise, fall, and rise
again.
b. The graph would start at the origin and have an inverted parabolic shape.

The first fall After the first bounce. After the second bounce.
𝑣f = 𝑣i − 𝑔∆𝑡 𝑣f = 𝑣i − 𝑔∆𝑡 𝑣f = 𝑣i − 𝑔∆𝑡
𝑣f = 0 − (9.8)(𝑡) 0 = 𝑣i − (9.8)(𝑡max ) 0 = 𝑣i − (9.8)(𝑡max )
𝑣f = −9.8 𝑡 𝑣i 𝑣i
𝑡max = 𝑡max =
𝑔 𝑔
1 1
1 y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2 y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2
y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡 2 2 2
2
𝑣i 𝑔 𝑣i 2 𝑣i 𝑔 𝑣i 2
y = 1.5 − 4.9 𝑡 2 0.75 = 0 + 𝑣i ( )− ( ) ( ) 0.25 = 0 + 𝑣i ( )− ( ) ( )
𝑔 2 𝑔 𝑔 2 𝑔

𝑣i2 𝑣i2
0.75 = 0.25 =
2𝑔 2𝑔

𝑣i = √1.5 𝑔 𝑣i = √0.5 𝑔

y = √1.5 𝑔 𝑡 − 4.9 𝑡 2 y = √0.5 𝑔 𝑡 − 4.9 𝑡 2

y = √14.7 𝑡 − 4.9 𝑡 2 y = √4.9 𝑡 − 4.9 𝑡 2

Page 42 of 45
 The first fall After the first bounce. After the second bounce.
𝑣f = −9.8 𝑡 𝑣f = 𝑣i − 𝑔 𝑡 𝑣f = 𝑣i − 𝑔 𝑡
1 𝑣f = √14.7 − 9.8 𝑡 𝑣f = √4.9 − 9.8 𝑡
y = 𝑦0 + 𝑣i 𝑡 − 𝑔 𝑡2
2
Time of flight: Time of flight:
2
0 = 1.5 − 4.9 𝑡 √14.7 √4.9
𝑡hang = 2 × 𝑡hang = 2 ×
3 9.8 9.8
𝑡 = √ = 0.55 s
𝑔 𝑡hang = 0.78 s 𝑡hang = 0.45 s

Q (46) Free Fall Suppose you hold a book in one hand and a flat sheet of paper in your other hand. You drop
them both, and they fall to the ground. Explain why the falling book is a good example of free fall, but the
paper is not.

Free fall is the motion of an object when gravity is the only significant force on it. Air significantly affects the
paper but not the book.

Q (47) Your sister drops your house keys down to you from the second-floor window, as shown in the image.
What is the velocity of the keys when you catch them?

Page 43 of 45
 𝑣f2 − 𝑣i2 = 2 𝑎 (∆𝑥)

𝑣f2 − 0.02 = 2 (−9.8) (− 4.3)

𝑣f = 9.2 m⁄s downward

Q (48) Suppose a free-fall ride at an amusement park starts at rest and is in free fall.
a. What is the velocity of the ride after 2.3 s?
b. How far do people on the ride fall during the 2.3-s time period?

Velocity Displacement.
𝑣f = 𝑣i + 𝑎𝑡 1
∆𝑦 = 𝑣i 𝑡 + 𝑎 𝑡 2
2
𝑣f = 0.0 + (−9.8 × 2.3) 1
∆𝑦 = (0.0 × 𝑡) + (−9.8) (2.3)2
2
𝑣f = −22.54 m⁄s
∆𝑦 = −25.921 m
𝑣f ≈ 23 m⁄s downward
∆𝑦 ≈ −26 m
|∆𝑦| = 26 m

Q (49) The free-fall acceleration on Mars is about one-third that on Earth. Suppose you throw a ball
upward with the same velocity on Mars as on Earth.
a. How would the ball's maximum height compare to that on Earth?
b. How would its flight time compare?
Maximum height. Flight time
Earth Mars Earth Mars
1
𝑔Mars = × 𝑔
𝑔 = 9.8 m⁄s 2 3 𝑣f = 𝑣i − 𝑔𝑡 𝑣f = 𝑣i − 𝑔Mars 𝑡

𝑣f2 − 𝑣i2 = −2 𝑔 (𝑦 − 𝑦0 ) 𝑣f2 − 𝑣i2 = −2 𝑔Mars (𝑦 − 𝑦0 ) 0 = 𝑣i − 𝑔𝑡max 𝑔
0 = 𝑣i − 𝑡
3 max
0 − 𝑣i2 = −2 𝑔 (𝑦max − 0) 𝑔 𝑣i
0 − 𝑣i2 = −2 ( ) (𝑦max − 0) 𝑡max = 𝑣i
3 𝑔 𝑡max = 3 ×
𝑔
𝑣i2 = 2 𝑔 𝑦max Mars.
2 𝑔 𝑦max
𝑣i2 =
𝑣i2 3
𝑦max =
2𝑔 𝑣i2
𝑦max = 3 ×
2𝑔
Page 44 of 45
 a. The maximum height would be three times higher on Mars.
b. Flight time is three times longer on Mars.

Q (50) Suppose you throw a ball straight up into the air. Describe the changes in the velocity of the ball.
Describe the changes in the acceleration of the ball.
Velocity decreases at a constant rate as the ball travels upward. At the ball's highest point, velocity is zero. As
the ball begins to drop, the velocity begins to increase in the negative direction until it reaches the height from
which it was initially released. At that point, the ball has the same speed it had upon release. The acceleration
is constant throughout the ball's flight.

Q (51) A ball thrown vertically upward continues upward until it reaches a certain position, and then falls
downward. The ball's velocity is instantaneously zero at that highest point. Is the ball accelerating at that
point? Devise an experiment to prove or disprove your answer.

The ball is accelerating; its velocity is changing. Take a multi-flash photo to measure its position. From
photos, calculate the ball's velocity.

the end

Page 45 of 45