kinetics of a particle · system of particles •we may extend the previous analysis to a system of...
TRANSCRIPT
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Kinetics of a Particle
Impulse & Momentum II
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Outline
• Angular Momentum
• Steady Flow of a Fluid Stream
• Jet Propulsion
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Angular Momentum
• Angular momentum about a point O is the moment (HO)of the particles linear momentum about O.
• Magnitude of Angular Momentum:
• The sense of the rotation of mv can be obtained using the right hand rule
mv
dy
x
O
z
HO
mvdHzO
(15-12)
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Angular Momentum - Vector
• If a particle moves along a space curve then the angular momentum (vector) can be determined using the vector cross product about O.
• The cross product is evaluated as the determinant of
O
x
y
z
HO = r x mv
mv
r
vmO rH (15-13)
zyx
zyx
mvmvmv
rrr
kji
(15-13)
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Moment of a Force Versus Angular Momentum
• From Newton’s 2nd law,
• Evaluating the moments
• Also
• Now
• So O
x
y
z
Σ F
r
Inertial coordinate system
vm F
vr r mO FM
vr vrvr mmmdt
dOH
0rrrr vr mmm
H OM (15-15)
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Moment of a Force Versus Angular Momentum
• So the resultant moment about point O of all forces acting the particle equals the rate of change of the particle’s angular momentum about point O.
• Interestingly, this is the same result of Eqn 15-1 (definition of linear momentum)
• Eqns 15-1 and 15-15, are alternate ways of expressing Newton's 2nd law. We shall see how this enables solve problems later in the topic rigid bodies
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System of Particles
• We may extend the previous analysis to a system of particles.
• Consider the ith particle subject to a resultant external force Fi, and a resultant internal force fi
• From Eqn 15-15, the rate of change of angular momentum of the ith particle about is
• Summing for all particles in thissystem
i
Fifi
Inertial coordinate system
O
x
ri
z
y
Oiiiii HfrFr
Oiiiii HfrFr
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System of Particles
• Since internal forces will essentially cancel each other out,
• So for the system
• In other words, the sum of moments about O of all the external forces acting on the system of particles equals the rate of change of the total angular momentum of the system about O.
Oiii HFr
OO HM (15-17)
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Principle of Angular Impulse and Momentum
• Let us rewrite Eqn 15-15 in the formand integrate from time t1 to t2 which have corresponding angular momenta (Ho)1 and (Ho)2
• This is the principle of angular impulse and momentum.
• The second term on the LHS is the angular impulse.
OO ddt HM
12
2
1
OO
t
t
Odt HHM
21
2
1
O
t
t
OO dt HMH (15-18)
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Angular Impulse
• Angular impulse
• By extension, we may apply the principle of angular momentum to a system of particles
• where
2
1
2
1
t
t
t
t
O dtdt ) F(rM (15-19)
21
2
1
O
t
t
OO dt HMH (15-20)
iiO mvrH
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Angular Momentum
• We may rewrite a vector formulation of Eqn 15-3 and Eqn 15-18 using the impulse and momentum principles
21
21
2
1
2
1
O
t
t
OO
t
t
dt
mdtm
H MH
F vv(15-21)
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Angular Momentum – Scalar Formulation
• Eqn 15-21 may be expressed in x, y, and zcomponents. For the x – y plane we have the following
21
21
21
2
1
2
1
2
1
O
t
t
OO
y
t
t
yy
x
t
t
xx
HdtMH
vmdtFvm
vmdtFvm
(15-21)
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Conservation of Angular Momentum• When the angular impulses on a particle are zero
from time t1 to time t2, from Eqn 15-18,
• For a system of particles
• The above equations represent the principle of conservation of angular momentum.
• If no external impulse acts on a particle, linear and angular momentum will be conserved. In some cases angular momentum will be conserved by linear momentum may not. E.g central force motion
21 OO HH (15-23)
21 OO HH (15-24)
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Questions
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Steady Flow of Fluid Stream
• We shall now apply impulse and momentum principles to fluid flowing through a pipe, under the following conditions:
1. The mass of fluid flowing into and out of the control volume are equal.
2. The size and shape of the control volume coincides with the internal boundaries and openings of the pipe.
• If the above are met the fluid has steady flow.
A
B
vA
vB
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• Consider a small amount of fluid of mass dm about to enter the control volume at A with vA at time t
• Due to steady flow the same amount of fluid that entered over dt will leave at B, with vA leaving at B
• The momenta of the fluid entering and leaving will be dm vA and dm vB respectively
• Momentum of the fluid inside control volume remains constant over dt
Steady Flow of a Fluid Stream
A
B
dm vA
dm
AB
Σ F dt
A
B
dm
dm vA
+ =
OO O
rBrr’
rrA
Time t Time dt Time t + dt
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Steady Flow of a Fluid
• The resultant external force on the pipe stream (from the reactive force from the pipe wall) produces an impulse Σ F dt
• Applying the principle of linear impulse and momentum
• r, rA, and rB denote the position vectors of the centers of the control volume, and openings at A and B respectively. Therefore by principle of angular impulse and momentum
vvFvv mdmdtmdmBA
vrvrFrvrvr mdmdtmdmBBAA
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Steady Flow of a Fluid
• Diving both sides by dt
• The term dm/dt is called the mass flow
AB
dt
dmvvF (15-25)
AABBO
dt
dmvrvrM (15-26)
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Steady Flow of a Fluid
• AA denotes the cross section area of the control volume at A. Let ρA denote the density of the fluid at A.
• For an incompressible fluid, the continuity of mass requires that or
• And likewise for any other point of interest. Therefore, in general
• Q is called the discharge, or volumetric flow rate
dsA
dsB
dm
dm AB
AA
dmdV dVdm
AAAAAAdsdVdm
QvAdt
dm(15-27)
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Questions
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Propulsion With Variable Mass
• Consider a rocket of mass m at an instant in time, moving with velocity v.
• At the same instant an amount of mass me
is expelled with velocity ve.
• The control volume in this case is that of both m and me.
• During an interval dt, velocity increases from v to v + dv, due to loss of mass dme that is ejected. However ve remains constant from the view of a stationary observer.
v
m
ve
me
Control volume
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Propulsion with Variable Mass
• Applying the Principle of impulse and momentum to the control volume between time t and time t + dt,
• or
• Now and dividing by dt
• The velocity of the rocket as observed from a rider “riding’ on the exhaust stream is vD/e = v + ve , therefore
eeeecvee vdmmdvvdmmdtFvmmv
eeeecv dmvdvdmmdvvdmdtF
0dvdme
dt
dmvv
dt
dvmF e
ecv
dt
dmv
dt
dvmF e
eDcv /(15-28)
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Propulsion with Variable Mass
• Note that the second term on the RHS is the rate of mass ejection
• Eqn 15-28 is the famous Tsiolkovsky rocket equation or ideal rocket equation, after Konstantin Tsiolkovsky(Russia) who published it in 1903.
Hermann Oberth Robert Goddard
Founding “Fathers” of Rocketry and Astronautics
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Propulsion with Variable Mass
• Consider a rocket of weight W moving upwards with velocity v, subject to atmospheric drag FD.
• If the control volume is that associated with the mass of the rocket and the mass of ejected gas me
• From Eqn 15-28
• The last term on the RHS is called the thrust (T), it is the equal but opposite reaction of the force exerted by ejecta on the surroundings
FD
W
T
Tve
v
dt
dmv
dt
dv
g
WWF e
eDD /
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Propulsion with Variable Mass
• Also we know that dv/dt = a, so
• Or
• So yes, Newton’s 2nd law applies and is consistent with the idealrocket equation.
ag
WWFT D
maF
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Control Volume that Gains Mass
• In some applications the control volume will rather gain mass
• Example: scoop or blade of mechanical excavator
• The analysis is identical save the increase in mass rather than the decrease as previously learned
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Control Volume that Gains Mass
• If vi is the velocity of injected mass and v > vi .
• Using the same procedure
• Resulting in
v
m
vi
mi
Control volume
iiiicvii vdmmdvvdmmdtFvmmv
dt
dmvv
dt
dvmF i
icv
dt
dmv
dt
dvmF i
iDcv /(15-29)
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Control Volume that Gains Mass
• dmi/dt is the rate of mass injected into the device.
• The last term on the RHS represents the magnitude of force (R) which the injected mass exerts on the device, so
maRFcv
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Questions