1. Projectile Motion
AP Physics

2. What is projectile?
Projectile -Any object which projected by some means and continues to move due to its own inertia (mass).

3. Projectiles move in TWO dimensions
Since a projectile moves in 2-dimensions, it therefore has 2 components just like a resultant vector.
Horizontal and Vertical

4. Horizontal “Velocity” Component
NEVER changes, covers equal displacements in equal time periods. This means the initial horizontal velocity equals the final horizontal velocity
In other words, the horizontal velocity is CONSTANT. BUT WHY?
Gravity DOES NOT work horizontally to increase or decrease the velocity.

5. Vertical “Velocity” Component
Changes (due to gravity), does NOT cover equal displacements in equal time periods.
Both the MAGNITUDE and DIRECTION change. As the projectile moves up the MAGNITUDE DECREASES and its direction is UPWARD. As it moves down the MAGNITUDE INCREASES and the direction is DOWNWARD.

6. Combining the Components
Together, these components produce what is called a trajectory or path. This path is parabolic in nature.
Component
Magnitude
Direction
Horizontal
Constant
Vertical
Changes

7. Horizontally Launched Projectiles
Is simply an object that is initially shot horizontally or parallel to the ground.
Will have a constant horizontal velocity and no initial vertical velocity.

8. Time
Imagine a marble horizontally launched while another marble is simultaneously dropped from the same height.
Note only one will move vertically and the other will move both horizontally and vertically.
They will both hit the ground at the SAME time.

9. AP Tip # 1
Get into the habit of distinguishing horizontal and vertical variables by writing the appropriate x and y subscripts.
Remember that directions are independent, you cannot mix subscripts.

10. AP Tip # 2
Knowns for horizontal projectile problems, you can immediately write
Viy = 0 m/s
ax = 0 m/s/s
ay = -9.8 m/s/s

11. Horizontally Launched Projectiles
To analyze a projectile in 2 dimensions we need 2 equations. One for the “x” direction and one for the “y” direction. And for this we use kinematic #2.
Remember, the velocity is CONSTANT horizontally, so that means the acceleration is ZERO!
Remember that since the projectile is launched horizontally, the INITIAL VERTICAL VELOCITY is equal to ZERO.

12. Horizontally Launched Projectiles
Example: A plane traveling with a horizontal velocity of 100 m/s is 500 m above the ground. At some point the pilot decides to drop some supplies to designated target below. (a) How long is the drop in the air? (b) How far away from point where it was launched will it land?
What do I know?
What I want to know?
vox=100 m/s
t = ?
y = 500 m
x = ?
voy= 0 m/s
g = -9.8 m/s/s
1010 m
10.1 seconds

13. Problem # 1
Cliff divers in Acapulco, Mexico, dive from 32.0 m high cliff. The rocks at the cliff base extend outward (horizontally) 15 m before clear water begins.
A. determine the amount of time it takes the diver to reach the water.
B. determine the minimum horizontal velocity of the diver such that he clears the 15 m of rock at the base of the cliff and lands in the water.

14. What we know… Horizontal Component Vertical Component
A = 0 m/s/s X = 15 m
A = -9.8 m/s/s Y = -32 m Vi = 0 m/s

15. Solve for time – first Solve for velocity - second
Y = 1/2gt2
-32 = ½(-9.8)t2
t = 2.56 s
X = vit
15 = vi2.56
Vi = 5.86 m/s

16. Vertically Launched Projectiles
Since the projectile was launched at an angle, the velocity MUST be broken into components!!! vo
voy q
vox

17. Vertically Launched Projectiles
There are several things you must consider when doing these types of projectiles besides using components. If it begins and ends at ground level, the “y” displacement is ZERO: y = 0

18. Vertically Launched Projectiles
You will still use kinematic #2, but YOU MUST use COMPONENTS in the equation. vo
voy q
vox

19. Example
A place kicker kicks a football with a velocity of 20.0 m/s and at an angle of 53 degrees.
(a) How long is the ball in the air?
(b) How far away does it land?
(c) How high does it travel?
vo=20.0 m/s
q = 53

20. AP Tip # 3 Range R = [vi2 (sin2ϴ) ]/g
Sometimes, it may be necessary to calculate the entire horizontal distance traveled by the projectile when no information about time of flight is given.

21. Example # 2
A golfer hits a golf ball upward at 50.0 m/s at an angle of 30 degrees relative to the ground. Shortly thereafter, the ball lands on the same level ground some distance from where it was hit.
A. determine the time of flight of the ball
B. determine the maximum height of the ball
C. determine the range of the ball

22. What we know… Horizontal Component Vertical Component
A = 0 m/s/s Vix = 43.3 m/s
A = -9.8 m/s/s Viy = 25 m/s

23. Solve for time – first Solve for max
Solve for time – first Solve for max. height – second Solve for range - third
A = (vf-vi)/t
-9.8 = (0 – 25)/t
t = 2.5 s X 2 = 5 s
Y = vit + 1/2gt2
Y = 25(2.5) + ½(-9.8)(2.52)
Y = m
X = vit
X = 43.3(5)
X = m