Chapter 9A - Impulse and Chapter 9A - Impulse and MomentumMomentum
A PowerPoint Presentation byA PowerPoint Presentation by
Paul E. Tippens, Professor of Paul E. Tippens, Professor of PhysicsPhysics
Southern Polytechnic State Southern Polytechnic State UniversityUniversity
A PowerPoint Presentation byA PowerPoint Presentation by
Paul E. Tippens, Professor of Paul E. Tippens, Professor of PhysicsPhysics
Southern Polytechnic State Southern Polytechnic State UniversityUniversity© 2007
ASTRONAUT Edward H. White II floats in the zero gravity of space. By firing the gas-powered gun,
he gains momentum and maneuverability. Credit: NASA
Objectives: After Completing Objectives: After Completing This Module, You Should Be This Module, You Should Be Able To:Able To:
• Write and apply a relationship between Write and apply a relationship between impulse and momentum in one dimension.impulse and momentum in one dimension.
• Write and apply a relationship between Write and apply a relationship between impulse and momentum in two dimensions.impulse and momentum in two dimensions.
• Define and give examples of Define and give examples of impulse impulse andand momentum momentum along with appropriate units.along with appropriate units.
IMPULSEIMPULSE
t
F
J = F tJ = F t
Impulse:Impulse J is a force F acting for a small time interval t.
Example 1:Example 1: The face of a golf club The face of a golf club exerts an average force of exerts an average force of 4000 N4000 N for for 0.002 s0.002 s. What is the impulse . What is the impulse imparted to the ball?imparted to the ball?
t
F
J = F tJ = F tImpulse:
J = (4000 N)(0.002 s)
J = 8.00 NsJ = 8.00 Ns
The unit for impulse is the Newton-second (N s)
Impulse from a Varying Impulse from a Varying ForceForce
Normally, a force acting for a short interval is not constant. It may be large initially and then play off to zero as shown in the graph.
F
time, t
In the absence of calculus, we use the average force
Favg.
avgJ F t avgJ F t
Example 2:Example 2: Two flexible balls Two flexible balls collide. The ball collide. The ball BB exerts an average exerts an average force of force of 1200 N1200 N on ball on ball AA. How long . How long were the balls in contact if the were the balls in contact if the impulse is impulse is 5 N s5 N s??
t = 0.00420 st = 0.00420 s
The impulse is The impulse is negativenegative; the force on ; the force on ball A is to the left. Unless told ball A is to the left. Unless told otherwise, treat forces as otherwise, treat forces as average average forcesforces..
BAavgJ F t
-5 N s
-1200 Navg
Jt
F
Impulse Changes VelocityImpulse Changes VelocityConsider a mallet hitting a
ball:F
; f ov vF ma a
t
; f ov v
F ma at
f oF t mv mv f oF t mv mv 0fv vF m
t
Impulse = Change in “mv”Impulse = Change in “mv”
Momentum DefinedMomentum DefinedMomentum p is defined as the product of mass and velocity, mv. Units: kg m/s
p = mvp = mv Momentum
m = 1000 kg
v = 16 m/s
p = (1000 kg)(16 m/s)
p = 16,000 kg m/sp = 16,000 kg m/s
Impulse and MomentumImpulse and Momentum
Impulse = Change in momentumImpulse = Change in momentum
F t = mvf - mvoF t = mvf - mvo
t
F mvA force F acting on a ball for a time t increases its momentum mv.
Example 3:Example 3: A A 50-g50-g golf ball leaves golf ball leaves the face of the club at the face of the club at 20 m/s20 m/s. If . If the club is in contact for the club is in contact for 0.002 s0.002 s, , what average force acted on the what average force acted on the ball?ball?
t
F mv
Given:Given: m = 0.05 kg; vo = 0;
t = 0.002 s; vf = 20 m/s+
Choose right as Choose right as positive.positive.
F t = mvf - mvo
F (0.002 s) = (0.05 kg)(20 m/s)
Average Force: F = 500 NF = 500 N
0
Vector Nature of Vector Nature of MomentumMomentum
Consider the change in momentum of a ball that is dropped onto a rigid
plate:
vo
vf
A 2-kg ball strikes the plate with a speed of 20 m/s and rebounds with a speed of 15 m/s. What is the change in momentum?
+
p = mvf - mvo = (2 kg)(15 m/s) - (2 kg)(-20 m/s)p = 30 kg m/s + 40 kg m/s
p = 70 kg m/s
p = 70 kg m/s
Directions Are EssentialDirections Are Essential
1. Choose and label a positive direction.1. Choose and label a positive direction.
+ vf
v0
vvff – v – v00 = = (10 m/s) – (-30 (10 m/s) – (-30
m/s)m/s)
40 m/sv
2. A velocity is positive 2. A velocity is positive when with this direction when with this direction
and negative when and negative when against it.against it.Assume Assume vv00 is 30 m/s is 30 m/s
to the left and to the left and vvff is is 10 m/s to the right.10 m/s to the right. What is the change What is the change in velocity in velocity v?v?
vvff = +10 m/s= +10 m/s
vv00= -30 m/s= -30 m/s
Example 4:Example 4: A A 500-g500-g baseball moves baseball moves to the left at to the left at 20 m/s20 m/s striking a bat. striking a bat. The bat is in contact with the ball for The bat is in contact with the ball for 0.002 s0.002 s, and it leaves in the opposite , and it leaves in the opposite direction at direction at 40 m/s40 m/s. What was . What was average force on ball?average force on ball?
40 m/s
t
F20 m/s
m = 0.5 kg
+
- +
F t = mvf - mvo
F(0.002 s) = (0.5 kg)(40 m/s) - (0.5 kg)(-20 m/s)
vo = -20 m/s; vf = 40 m/s
Continued . . .
Example Continued:Example Continued:
40 m/s
t
F20 m/s
m = 0.5 kg
+
-+
F t = mvf - mvo
F(0.002 s) = (0.5 kg)(40 m/s) - (0.5 kg)(-20 m/s)
F(0.002 s) = (20 kg m/s) + (10 kg m/s)
F(0.002 s) = 30 kg m/s F = 15,000 NF = 15,000 N
Impulse in Two Impulse in Two DimensionsDimensions
Fx t = mvfx - mvox
+
voF
Fx
Fy
vf
vfx
vfyA baseball with an initial velocity vo hits a bat and leaves with vf at an angle. Horizontal and vertical impulse are independent.
Fy t = mvfy - mvoy
F = Fx i + Fy j vo = vox i + voy j vf = vxi + vy j
+
Example 5:Example 5: A A 500-g500-g baseball baseball travelling at travelling at 20 m/s20 m/s leaves a bat leaves a bat with a velocity of with a velocity of 50 m/s50 m/s at an at an angle of angle of 303000. If . If t = t = 0.002 s0.002 s, what , what was the average force was the average force FF??
+
voF
Fx
Fy
vf
vfx
vfy+
300
-20 m/s
50 m/s vox = -20 m/s; voy = 0vfx = 50 Cos 300 = 43.3
m/svfy = 50 Sin 300 = 25 m/s
First consider horizontal:
Fx t = mvfx - mvox
Fx(.002 s) = (0.5 kg)(43.3 m/s) - (0.5 kg)(-20 m/s)
Example Continued . . .Example Continued . . .Fx(.002 s) = (0.5 kg)(43.3 m/s) - (0.5 kg)(-20 m/s)
+
voF
Fx
Fy
vf
vfx
vfy+
300
20 m/s
50 m/s
Fx(.002 s) = 21.7 kg m/s + 10 kg m/s)
Fx = 15.8 kNFx = 15.8 kN
Now apply to vertical:
Fy t = mvfy - mvoy0
Fy(.002 s) = (0.5 kg)(25 m/s)
Fy = 6.25 kNFy = 6.25 kN F = 17.0 kN, 21.50
F = 17.0 kN, 21.50and
Summary of Formulas:Summary of Formulas:
Momentum p = mvMomentum p = mv
Impulse J = FavgtImpulse J = Favgt
Impulse = Change in momentumImpulse = Change in momentumImpulse = Change in momentumImpulse = Change in momentum
F t = mvf - mvoF t = mvf - mvo
CONCLUSION: Chapter 9ACONCLUSION: Chapter 9AImpulse and MomentumImpulse and Momentum