Transcript Lect22

Chapter 11 – Gravity
Lecture 2
April 8, 2010
•
•
•
•
Gravitational potential energy
Escape velocity
Gravitational Field of a point mass
Gravitational Field for mass distributions
–
–
–
–
Discrete
Rod
Spherical shell
Sphere
• Gravitational potential energy of a system of particles
• Black holes
From work to
gravitational
potential energy.
In the last example,
it does not matter on what path the
person is elevated to 2 Earth radii
above.
Only the final height (or distance)
matters for the total amount of
work performed.
The feature of “conservative force”
Potential Energy
m
2
r
r
r 12
M1
Force (1,2) 
G
mM
2
r1 ,2
rˆ1, 2
G  6.67  10
11
2
N m / kg
2
Work done to bring mass m from initial to final position.
f
f
mM 

P E  W    F dr      G 2  dr 

r 
i
i
 1
1
2
 G m M  r dr   G m M 
 
ri 
 rf
i
f
Zero point is arbitrary. Choose zero at infinity.
PE  G
Mm
r
P E (r   )  0
U (r )   G
Mm
r
Gravitational potential energy
U (r )   G
Mm
r
Total energy
Etot = K+U = ½ m v2 – G (M m)/r
Apollo 14, at lift-off
Escaping Gravity
E>0: object is not bound
E<0: object is bound to gravity. Field
E=0: kinetic energy just enough to
escape gravity (K=U)
Escaping Gravity
• Kinetic energy of the object must be greater than its
gravitational potential energy
– This defines the minimum velocity to escape
• KE+PE = constant
– Consider case when speed is just sufficient to escape to infinity
with vanishing final velocity
– At infinity, KE+PE=0, therefore, on Earth,
1
2
mv
2
esc
v esc 
4/29/2015
G
M Em
 0
RE
2GM E
RE
 11.2 km /s  25000 m ph
Quiz
• You are on the moon and you know how to calculate the
escape velocity:
v esc 
2GM
R
• You find that it is 2.37km/s
A projectile from the moon surface will escape even if it is
shot horizontally, not vertically with a speed of at least
2.37km/s
A) Correct
B) Not correct
Gravity near Earth’s surface...
• Near the Earth’s surface:
– R12 = RE
• Won’t change much if we stay near the Earth's surface.
– since RE >> h, RE + h ~ RE.
Fg  G
m
h
Fg
RE
M
M Em
2
RE
Gravity...
• Near the Earth’s surface...
M Em
Fg  G
• So |Fg| = mg = ma
–
a=g
gG
2
RE
ME
2
 ME
 mG 2 
RE 


=g
 9.81 m / s
2
RE
All objects accelerate with acceleration
g, regardless of their mass!
Or: the equivalence principle: m=mg = mi
Choosing U(RE) = 0, then
U(h) = m g h ,
for h << RE
Variation of g with Height
This is twice the Earth
radius: RE = 6000km
We know F should drop
with r2
Indeed, “g” has dropped
to 9.81/4 m/s2
Question
Suppose you are standing on a bathroom scale in your dorm room and
it says that your weight is W. What will the same scale say your
weight is on the surface of the mysterious Planet X ?
You are told that RX ~ 20 REarth and MX ~ 300 MEarth.
Fg  G
(a)
0.75 W
(b)
1.5 W
(c)
2.25 W
mM
r
E
2
Fg , X 
300
20
2
Fg , Earth
X
Gravitational Field
• Gravitational force:
ur
m1m 2
F 12  G
rˆ12
2
r12
it is a function of space-time (r, t).
• Definition of the gravitational field that will act on any
masspoint:
r
g 
uru
Fg
m
r
g 

uru
r Fg
gi
m
Must be a function of space-time (r, t)  concept of “field”.
• If the field is caused by a mass distribution we need to
sum over all masspoints as the source.
Gravitational field
•
•
•
The gravitational field vectors point in
the direction of the acceleration for a
particle would experience if placed in
that field
The magnitude is that of the freefall
acceleration at that location
The gravitational field describes the
“effect” that any source object M has
on the empty space around itself in
terms of the force that would be
present if a second object m were
somewhere in that space
independent of m, only on M !
Gravitational Field
Two source mass points M,
fieldpoint in plane of symmetry
r
g

r
gi
Magnitude of field due to each
mass:
M
g1  g 2  G 2
r
Need to add x and y component of
g1 and g2
X-component:
g x  g1 x  g 2 x  2G
m
2
cos    2G
m xp
2
 2G
r
r r
Y-component is zero for symmetry reasons
mx p
r
gy  0
3
Gravitational Field
r
g 
Field due to rod of length L
on a point along its axis.
r
 dg
Field by one mass element
dm:
dg   G
dm
r
2
r  x p  xs
dm   dx 
L
Integrate over all mass elements dm:
L
g
 dg 
 G
dm
r
2
 
2

L
G
M
L
2
dx s
x
p
 xs
M

2
GM
 ...  
 2
x  L
2
p
2
dx
Gravitational Field
Field due to spherical
symmetric mass distribution,
a shell of mass M and radius
R:
Field of a spherical shell
r
M $
g  G 2 r
r
r
g  0
r  R
r  R
Geometry: spherical shell
is 0 anywhere inside (see p.384)
Gravitational Field
Field due to homogeneous
massive sphere
Field inside the sphere
g  G
M
R
3
r
r  R
Binding Energy
• The absolute value of the potential energy can be thought
of as the binding energy
• At infinite separation, binding energy U=0, thus unbound.
• If an external agent applies a force larger than the binding
energy, the excess energy will be in the form of kinetic
energy of the particles when they are at infinite separation
4/29/2015
19
Systems with Three or More
Particles
• The total gravitational potential
energy of the system is the
sum over all pairs of particles:
simple scalar sum
• Gravitational potential energy
obeys the superposition
principle
• Each pair of particles
contributes a term of Uij
• The absolute value of Utotal
represents the work needed to
separate the particles by an
infinite distance
4/29/2015
20
Potential energy of a system of masses
m
L
m
• What is the total potential
energy of this mass system?
U  3G
mm
L
L
L
m
Four identical masses, each of mass M, are placed
at the corners of a square of side L. The total
potential energy of the masses is equal to
–xGM2/L, where x equals
A.
4
B.
42 2
C.
4
2
4
1
D.
2
E.
22 2
Four identical masses, each of mass M, are placed
at the corners of a square of side L. The total
potential energy of the masses is equal to
–xGM2/L, where x equals
A.
4
B.
42 2
C.
4
2
4
1
D.
2
E.
22 2
Black Holes
•
•
•
•
4/29/2015
A black hole is the remains of a
star that has collapsed under its
own gravitational force
The escape speed for a black
hole is very large due to the
concentration of a large mass
into a sphere of very small
radius
– If the escape speed
exceeds the speed of light,
radiation cannot escape and
it appears black
The critical radius at which the
escape speed equals c is called
the Schwarzschild radius, RS
The imaginary surface of a
sphere with this radius is called
the event horizon
– This is the limit of how close
you can approach the black
hole and still escape
24
Black Holes and Accretion Disks
•
•
•
•
•
•
•
Although light from a black hole cannot
escape, light from events taking place
near the black hole should be visible
If a binary star system has a black
hole and a normal star, the material
from the normal star can be pulled
into the black hole
This material forms an accretion disk
around the black hole
Friction among the particles in the disk transforms mechanical energy into
internal energy
The orbital height of the material above the event horizon decreases and the
temperature rises
The high-temperature material emits radiation, extending well into the x-ray
region
These x-rays are characteristics of black holes
4/29/2015
Physics 201, UW-Madison
25
Black Holes at Centers of
Galaxies
• There is evidence that
supermassive black holes
exist at the centers of
galaxies (M=100million
solar masses)
• Theory predicts jets of
materials should be
evident along the rotational
axis of the black hole
An Hubble Space Telescope image of the
galaxy M87. The jet of material in the right
frame is thought to be evidence of a
supermassive black hole at the galaxy’s
center.
Physics 201, UW-Madison
26