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Introduction From Newton’s 2nd Law: F = m a
= m v.= d/dt (m v) The term m v is known as the linear momentum, and it is
abbreviated by G. F = G. (1) This formula states that the resultant of all forces acting
on a particle equals its time rate of change of linear momentum.
The SI unit of the linear momentum is N.s. Note that the rate of change of linear momentum G. is a
vector quantity, and its direction coincides with the direction of the resultant forces, i.e. coincides with the direction of the acceleration. Where the direction of G coincides with the direction of the velocity.
In rectangular coordinates, the three scalar components of formula (1) are:
Fx = Gx. Fy = Gy
. Fz = Gz
.
Note: the momentum formula is valid as long as the mass m is not changing.
The Linear Impulse-Momentum Principle
From formula (1), F = G.
F = d/dt (G)F dt = d (G)
By the integration of both sides,
The product of force and time, represented by the term , is known as the linear impulse.
The formula (2) states that the total linear impulse on m equals to the change in the linear momentum of m.
In rectangular coordinates, the magnitudes versions of (2) are:
GGG F 12
2
1
t
tdt
2
1
Ft
tdt
21 G FG2
1
t
tdtor (2)
12
2
1xx
t
t x mvmv dtF 12
2
1yy
t
t y mvmv dtF 12
2
1zz
t
t z mvmv dtF
Conservation of Linear Momentum
When the sum of all forces acting on a particle is zero, i.e F = 0, thus,
G = 0 or G1 = G2
Note: If the force, which is acting on a particle, varies with time, the impulse will be the integration of this force w.r.t. time or the area under the above curve.
Time, t
Force, FF2
F1
t1 t2
Impact Impact: is the collision between two
bodies. It leads to the generation of relatively large contact forces that act over a very short interval of time. There are two main types of impact, they are: a) direct central impact and b) oblique central impact.
a) Direct central impact: a collinear motion of two spheres of masses m1 and m2, traveling with velocities v1 and v2. If v1 > v2, collision will occur with contact forces directed along the line of centers of the two spheres. Note that the sum of forces are zero or relatively small (produces negligible impulses), thus,
F1 F2
'22
'112211 vmvmvmvm
Impact – Cont.
'2
'1 & vv
Coefficient of restitution (e): in the direct impact formula, there are two unknowns . An additional relationship is needed to find the these final velocities. This relationship must reflect the capacity of the contacting bodies to recover from the impact and can be expressed in by the ratio e of the magnitude of the restoration impulse to the magnitude of the deformation impulse. This ratio is known as the coefficient of restitution.
o
o
o
ot
d
t
t r
vv
vv
vvm
vvm
dtF
dtFe
o
o
1
'1
11
'11
0
2
'2
22
'22
0
vv
vv
vvm
vvm
dtF
dtFe
o
o
o
ot
d
t
t r
o
o
For particle 1
For particle 2
By eliminating vo in both equation
approach of velocity relative
separation of velocity relative
21
'1
'2
vv
vve
Impact – Cont. b) Oblique central impact: the initial
and final velocities are not parallel. The directions of the velocity vectors are measured from the direction tangent to the contacting surfaces.
However, there are four unknowns; they are To find them, the following four formulas will be used: nnnn vmvmvmvm '
22'112211
222222
111111
cos sin
cos sin
vvvv
vvvv
tn
tn
. and , , , '2
'2
''
11 tntnvvvv
tt
tt
vmvm
vmvm
'2222
'111 1
nn
nn
vv
vve
21
'1
'2
(1)
(2)
(3)
(4)Note: There is no impulse on either particle in the t-direction
Exercise # 1
3/179: A 75-g projectile traveling at 600 m/s strikes and becomes embedded in the 50-kg block, which is initially stationary. Compute the energy lost during the impact. Express your answer as an absolute value |E| and as a percentage n of the original system energy E.
Exercise # 23/180: A jet-propelled airplane with a mass of 10 Mg is flying
horizontally at a constant speed of 1000 km/h under the action of the engine thrust T and the equal and opposite air resistance R. The pilot ignites two rocket-assist units, each of which develops a forward thrust T0 of 8 kN for 9 s. If the velocity of the airplane in its horizontal flight is 1050 km/h at the end of the 9 s, calculate the time-average increase R in air resistance. The mass of the rocket fuel used is negligible compared with that of the airplane .
Exercise # 3
3/199: Car B (1500 kg) traveling west at 48 km/h collides with car A (1600 kg) traveling north at 32 km/h as shown. If the two cars become entangled and move together as a unit after the crash, compute the magnitude v of their common velocity immediately after the impact and the angle made by the velocity vector with
the north direction .
Exercise # 4 3/248: The sphere of mass m1 travels with an initial velocity v1
directed as shown and strikes the sphere of mass m2. For a given coefficient of restitution e, determine the mass ratio m1/m2 which results in m1 being motionless after the impact.