Transcript Lecture 9a

Sect. 5-6: Newton’s Universal Law of Gravitation
This cartoon mixes 2 legends:
1. The legend of Newton,
the apple & gravity
which led to
Newton’s
Universal
Law of
Gravitation.
2
2. The legend of William
Tell & the apple.
• It was very SIGNIFICANT
Sir Isaac Newton first wrote
& PROFOUND in the 1600's when
Newton's Universal Law of Gravitation!
• This was done at the age of about 30. It was this, more than any of his other
achievements, which caused him to be well-known in the world scientific
community of the late 1600's.
• He used this law, along with Newton's 2nd Law (his 2nd Law!) plus
Calculus, which he also (co-) invented, to PROVE that
The orbits of the planets around
the sun MUST be ellipses.
– For simplicity, we assume in Ch. 5 that these orbits are circular.
• Ch. 5 fits THE COURSE THEME OF NEWTON'S LAWS OF
MOTION because he used his Gravitation Law & his 2nd Law in his
analysis of planetary motion. His prediction that planetary orbits are
elliptical is in excellent agreement with Kepler's analysis of observational data
& with Kepler's empirical laws of planetary motion.
• When Newton first wrote the
Universal Law of Gravitation,
it was the first time, anyone had EVER written a theoretical
expression (physics in math form) & used it to PREDICT something
that is in agreement with observations! For this reason,
Newton's formulation of his
Universal Gravitation Law is considered the BEGINNING OF
THEORETICAL PHYSICS.
• It also gave Newton his major “claim to fame”. After this, he was considered
to be a “major leader” in science & math among his peers.
• In modern times, this, plus the many other things he did, have led to the
consensus that Sir Isaac Newton was the
GREATEST SCIENTIST
WHO EVER LIVED
Newton’s Law of Universal Gravitation
• This is an EXPERIMENTAL LAW describing the
gravitational force of attraction between 2 objects.
• Newton’s reasoning:
the Gravitational force of attraction
between 2 large objects (Earth - Moon, etc.) is the
SAME
force as the attraction of objects to the Earth.
• Apple story: This is likely not a true historical
account, but the reasoning discussed there is correct.
This story is probably legend rather than fact.
Newton’s Question: If the force of gravity is being exerted
on objects on Earth, what is
the origin of that force?
Newton’s realization was that
this force must come from
the Earth.
He further realized that
this force must be what
keeps the Moon in its
orbit.
The gravitational force on you is half of a Newton’s 3rd Law pair:
Earth exerts a downward force on you, & you exert an upward force
on Earth. When there is such a large difference in the 2 masses, the
reaction force (force you exert on the Earth) is undetectable, but for 2
objects with masses closer in size to each other, it can be significant.

Must be true from
Newton’s 3rd Law!
The Force of Attraction between 2 small masses is the
same as the force between Earth & Moon, Earth & Sun, etc.
By observing planetary orbits, Newton concluded that the gravitational force
decreases as the inverse of the square of the distance r between the masses.
Newton’s Universal Law of Gravitation:
“Every particle in the Universe attracts every other
particle in the Universe with a force that is proportional to
the product of their masses and inversely proportional
to the square of the distance between them:
F12 = -F21  [(m1m2)/r2]
 Must be true from
Newton’s 3rd Law
The direction of this force is
along the line joining the 2 masses.
• The FORCE between 2 small masses has the same
origin (Gravity) as the FORCE between the Earth &
the Moon, the Earth & the Sun, etc.

From Newton’s 3rd Law!
Newton’s Universal Gravitation Law
• This force is written as:
G  a constant,
G  the Universal Gravitational Constant
G is measured & is the same for ALL objects. G must be small!
• Measurement of G in the lab is tedious &
sensitive because it is so small.
– First done by Cavendish in 1789.
• A modern version of the Cavendish
experiment: Two small masses are fixed at
ends of a light horizontal rod. Two larger
masses were placed near the smaller ones.
• The angle of rotation is measured.
• Use Newton’s 2nd Law to get the vector
force between the masses. Relate to the
angle of rotation & then extract G.

Cavendish Measurement
Apparatus
G = the Universal Gravitational Constant
• Measurements find, in SI Units:
• The force given above is strictly valid only for:
– Very small masses m1 & m2 (point masses)
– Uniform spheres
• For other objects: Need integral calculus!
• The Universal Law of Gravitation is an
example of an inverse square law
– The magnitude of the force varies as the
inverse square of the separation of the particles
• The law can also be expressed in vector form
The negative sign means it’s an attractive force
• Aren’t we glad it’s not repulsive?
Comments
 Force exerted by particle 1
on particle 2
21
 Force exerted by particle 2
on particle 1
=-
This tells us that the forces form a
Newton’s 3rd Law action-reaction pair,
as expected.
The negative sign in the above vector equation tells us
that particle 2 is attracted toward particle 1
21
More Comments
• Gravity is a “field force” that always
exists between 2 masses, regardless
of the medium between them.
• The gravitational force decreases
rapidly as the distance between
the 2 masses increases
– This is an obvious consequence of
the inverse square law
Example 5-10:
The Gravitational Force Between 2 People
A 50-kg person & a 70-kg person are sitting
on a bench close to each other.
Estimate the magnitude of the gravitational
force each exerts on the other.
Example 5-11: Spacecraft at 2rE
• A spacecraft at an altitude of twice the Earth radius.
• Earth Radius: rE = 6320 km
Earth Mass: ME = 5.98  1024 kg
FG = G(mME/r2)
• At the surface (r = rE)
FG = weight
= mg = G[mME/(rE)2]
• At r = 2rE
FG = G[mME/(2rE)2]
= (¼)mg = 4900 N
Earth, mass ME
m
Example 5-12: Force on the Moon
Find the net force on the
Moon due to the gravitational
attraction of both the Earth &
the Sun, assuming they are at
right angles to each other.
ME= 5.99  1024kg
MM=7.35 1022kg
MS = 1.99  1030 kg
rME = 3.85  108 m
rMS = 1.5  1011 m
F = FME + FMS
(vector sum!)
F = FME + FMS
(vector sum!)
FME = G [(MMME)/(rME)2]
= 1.99  1020 N
FMS = G [(MMMS)/(rMS)2]
= 4.34  1020 N
F = [ (FME)2 + (FMS)2](½)
= 4.77  1020 N
tan(θ) = 1.99/4.34
 θ = 24.6º
Gravitational Force Due to a Mass Distribution
• It can be shown with integral calculus that:
The gravitational force exerted by a spherically symmetric
mass distribution of uniform density on a particle
outside the distribution is the same as if the entire mass
of the distribution were concentrated at the center.
• So, assuming that the Earth is such a sphere, the gravitational force exerted
by the Earth on a particle of mass m on or near the Earth’s surface is
FG = G[(mME)/r2]; ME  Earth Mass, rE  Earth Radius
• Similarly, to treat the gravitational force due to large spherical shaped
objects, can show with calculus, that: 1) If a (point) particle is outside a thin
spherical shell, the gravitational force on the particle is
the same as if all the mass of the sphere were at center of the shell.
• 2) If a (point) particle is inside a thin spherical shell, the gravitational force on
the particle is zero. So, we can model a sphere as a series of thin shells. For a
mass outside any large spherically symmetric mass, the gravitational force acts
as though all the mass of the sphere is at the sphere’s center.
Vector Form of the Universal Gravitation Law
In vector form,
The figure gives the directions
of the displacement & force
vectors.
If there are many particles,
the total force is the vector
sum of the individual forces:
Example: Billiards (Pool)
• 3 billiard (pool) balls, masses m1 = m2 =
m3 = 0.3 kg on a table as in the figure.
Triangle sides: a = 0.4 m, b = 0.3 m,
c = 0.5 m. Calculate the magnitude &
direction of the total gravitational force F
on m1 due to m2 & m3.
Note: Gravitational force is a vector, so
we have to add the vectors F21 & F31 to
get the vector F (using the vector addition
methods of earlier). F = F21 + F31
Using components:
Fx = F21x + F31x = 0 + 6.67  10-11
Fy = F21y + F31y = 3.75  10-11 N + 0
So, F = [(Fx)2 + (Fy)2]½ = 3.75  10-11 N
tanθ = 0.562, θ = 29.3º
Sect. 5-7: Gravity Near the Earth’s Surface
The Gravitational
Acceleration g
g
and
d
The Gravitational
Constant G
G vs. g
• Obviously, it’s very important to distinguish
between G and g!
– They are obviously very different physical quantities!
• G  The Universal Gravitational Constant
– It is the same everywhere in the Universe
G = 6.673  10-11 N∙m2/kg2
ALWAYS at every location anywhere
• g  The Acceleration due to Gravity
g = 9.80 m/s2 (approximately!) on the Earth’s
surface. g varies with location
g in terms of G
m
• Consider an object on Earth’s surface:
mE = mass of the Earth (say, known)
rE = radius of the Earth (known)
m = mass of the object (known)
• Assume that
the Earth is a uniform, perfect sphere.
The weight of m is FG = mg
• The Gravitational force on m is
FG = G[(mmE)/(rE)2]
Setting these equal gives:
All quantities on the right are measured!
mE
g = 9.8 m/s2
Using the same process, we can
“Weigh” the Earth!
m
(Determine it’s mass).
On Earth’s surface, equate the usual
weight of mass m to the
Newton’s Gravitation Law
mE
form for the gravitational force:
Knowing g = 9.8 m/s2 & the radius of the Earth rE, the
mass of the Earth can be calculated:
All quantities on the
right are measured!
Effective Acceleration Due to Gravity
• The acceleration due to gravity at
a distance r from Earth’s center.
• Write gravitational force as:
FG = G[(mME)/r2]  mg
(effective weight)
g  effective acceleration
due to gravity.
SO : g = G (ME)/r2
ME
Altitude Dependence of g
• If an object is some distance h
above the Earth’s surface, r
becomes RE + h. Again, set the
gravitational force equal to mg:
G[(mME)/r2]  mg
This gives:
g
ME
GME
 RE  h 
2
• This shows that g decreases with increasing altitude
• As r , the weight of the object approaches zero
• Example 5-13, g on Mt. Everest
g
Altitude Dependence of g
GME
 RE  h 
2
Lubbock, TX:
Altitude: h  3300 ft  1100 m
 g  9.798 m/s2
Mt. Everest:
Altitude: h  8.8 km
 g  9.77 m/s2
Example: Effect of Earth’s Rotation on g
Assuming Earth is perfect sphere, determine
how Earth’s rotation affects the value of g at
equator compared to its value at poles.
Newton’s 2nd Law: ∑F = ma = W – mg
W = mg – ma
At the pole, no acceleration,
a = 0, W = mg
At the equator, centripetal acceleration:
aR = [(v2)/(rE)] = W = mg - m[(v2)/(rE)] = mg
g = g - [(v2)/(rE)] = 0.037 m/s2
(v = (2πrE)/T = 4.64  102 m/s,
T = 1 day = 8.64  104 s)
“Weighing” the Sun!
• We’ve “weighed” the Earth, now lets “Weigh” the Sun!!
(Determine it’s mass). Assume: Earth & Sun are perfect uniform
spheres & Earth orbit is a perfect circle (actually its an ellipse).
• Note: For Earth, Mass ME = 5.99  1024kg
The orbit period is T = 1 yr  3 107 s
The orbit radius r = 1.5  1011 m
So, the orbit velocity is v = (2πr/T), v  3 104 m/s
• Gravitational Force between Earth & Sun: FG = G[(MSME)/r2]
Circular orbit is circular  Centripetal acceleration
Newton’s 2nd Law gives: ∑F = FG = MEa = MEac = ME(v2)/r
OR: G[(MSME)/r2] = ME(v2)/r. If the Sun mass is unknown,
solve for it: MS = (v2r)/G  2  1030 kg  3.3  105 ME