Download computing the perturbation effects on orbital elements of the moon

University of Baghdad
College of Science
Department of Astronomy and Space Science
COMPUTING THE PERTURBATION EFFECTS
ON ORBITAL ELEMENTS OF THE MOON
A Thesis
Submitted to the Department of Astronomy and Space Science
College of Science
University of Baghdad
In partial fulfillment for the requirements of the
Degree of Master in Astronomy and Space Science
By
Hayder Ridha Ali Al-Ali
B.Sc. 2004
Supervised by:
Assist professor Dr. Abdul-Rahman H.S. Al-Mohammedi
2011 A.D.
1432 H.D.
Supervisor Certification
I certify that this thesis was prepared by Hayder Ridha Ali
under my supervision at the Department of Astronomy and Space, College
of Science, University of Baghdad as a partial fulfillment of the
requirements needed to award the degree of Master of Science in
Astronomy and Space.
Signature
Name
Title
Address
:
:
:
:
Date
:
Dr. Abdul – Rahman H. S.
Assist. Professor
Department of Astronomy and Space, College of Science,
University of Baghdad
/ / 2011
Certification of the Head of the Department
In view of the available recommendation, I forward this thesis for debate
by the examination committee.
Signature
Name
Title
Address
:
:
:
:
Date
:
Dr. Kamal M. A.
Assist Professor
Head of Astronomy and Space Department,
College of Science, University of Baghdad
/ / 2011
Examination Committee
We, members of the Examining Committee, certify that after
reading this thesis and examining the student (Hayder Ridha Ali) in its
contents and, in our opinion that it is adequate for the award of the degree
of Master of Science in Astronomy and Space.
Signature:
Signature:
Name: Dr. Layth Mahmood Karim Name: Dr. Mohamed Jaafar Al-Bermani
Title: Professor
Title: Assist Professor
Date:
Date:
/
/2011
/
/2011
(Member)
(Chairman)
Signature:
Signature:
Name: Dr. Salman Zaidan Khalaf
Name: Dr. Abdul-Rahman Al-Mohammedi
Title: Assist Professor
Title: Assist Professor
Date:
Date:
/
/2011
(Member)
/
/2011
(Supervisor)
Approved by the University Committee of Graduate studies
Signature:
Name: Professor Dr. Saleh Mahdi Ali
Dean of College of Science
Address: University of Baghdad, College of Science
Date:
/
/2011
‫ﺃﻟَﻢ‪ ‬ﺗَﺮﹶﻭ‪‬ﺍ ﻛَﻴ‪‬ﻒﹶ ﺧﹶﻠَﻖﹶ ﺍﻟﻠﱠﻪ‪ ‬ﺳﹶﺒ‪‬ﻊﹶ ﺳﹶﻤﹶﻮﹶﺍﺕ‪ ‬ﻃﹺﺒﹶﺎﻗًﺎ ‪ ١٥‬ﻭﹶﺟﹶﻌﹶﻞَ ﺍﻟْﻘَﻤﹶﺮﹶ‬
‫ﻓﹺﻴﻬِﻦ‪ُ� ‬ﻮﺭ‪‬ﺍ ﻭﹶﺟﹶﻌﹶﻞَ ﺍﻟﺸ‪‬ﻤ‪‬ﺲﹶ ﺳﹺﺮﹶﺍﺟ‪‬ﺎ ‪١٦‬‬
‫ﺳﻮرة ﻧﻮح‬
‫ﺖ ﹺﺑﻬ‪‬ﺎ‬
‫ﺲ ﺿ‪‬ﻴﺎﺀً‪ ،‬ﻭ ‪‬ﺧﹶﻠ ﹾﻘ ‪‬‬
‫ﺸ ‪‬ﻤ ‪‬‬
‫ﺖ ﺍﻟ ‪‬‬
‫ﺲ ‪‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫ﺸ ‪‬ﻤ ‪‬‬
‫ﺖ ﹺﺑﻬ‪‬ﺎ ﺍﻟ ‪‬‬
‫» ‪‬ﻭ ‪‬ﺧﹶﻠ ﹾﻘ ‪‬‬
‫ﺐ ‪‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠﺘ‪‬ﻬﺎ‬
‫ﺖ ﹺﺑﻬ‪‬ﺎ ﺍﹾﻟﻜﹶﻮﺍ ‪‬ﻛ ‪‬‬
‫ﺖ ﺍﹾﻟ ﹶﻘ ‪‬ﻤ ‪‬ﺮ ﻧ‪‬ﻮﺭﺍﹰ‪ ،‬ﻭ ‪‬ﺧﹶﻠ ﹾﻘ ‪‬‬
‫ﺍﹾﻟ ﹶﻘ ‪‬ﻤ ‪‬ﺮ ‪‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫ﻕ‬
‫ﺖ ﻟﹶﻬﺎ ﻣ‪‬ﺸﺎ ﹺﺭ ‪‬‬
‫ﻧ‪‬ﺠ‪‬ﻮﻣﹰﺎ ‪‬ﻭﺑ‪‬ﺮ‪‬ﻭﺟﹰﺎ ‪‬ﻭﻣ‪‬ﺼﺎﺑﻴ ‪‬ﺢ ﻭ‪‬ﺯﻳ‪‬ﻨ ﹰﺔ ‪‬ﻭ ‪‬ﺭﺟ‪‬ﻮﻣﺎﹰ‪ ،‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫ﺖ ﻟﹶﻬﺎ ﹶﻓﻠﹶﻜﹰﺎ‬
‫ﻱ‪ ،‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫ﺖ ﻟﹶﻬﺎ ﻣ‪‬ﻄﺎ‪‬ﻟ ‪‬ﻊ ‪‬ﻭﻣ‪‬ﺠﺎ ﹺﺭ ‪‬‬
‫ﺏ ‪‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫‪‬ﻭﻣ‪‬ﻐﺎ ﹺﺭ ‪‬‬
‫ﺖ ‪‬ﺗﻘﹾﺪﻳﺮ‪‬ﻫﺎ‪،‬‬
‫ﺴ‪‬ﻨ ‪‬‬
‫‪‬ﻭﻣ‪‬ﺴﺎﺑﹺـ ‪‬ﺢ ‪‬ﻭﹶﻗ ‪‬ﺪ ‪‬ﺭﺗ‪‬ﻬﺎ ﰲ ﺍﻟﺴ‪‬ﻤﺎ ِﺀ ﻣ‪‬ﻨﺎ ﹺﺯ ﹶﻝ ﹶﻓﺄ ‪‬ﺣ ‪‬‬
‫ﻚ ﹺﺇﺣ‪‬ﺼﺎ ًﺀ‬
‫ﺼ‪‬ﻴﺘ‪‬ﻬﺎ ﹺﺑﹶﺄﺳ‪‬ﻤﺎ‪‬ﺋ ‪‬‬
‫ﺖ ‪‬ﺗﺼ‪‬ﻮﻳﺮ‪‬ﻫﺎ ‪‬ﻭﹶﺃ ‪‬ﺣ ‪‬‬
‫ﺴ‪‬ﻨ ‪‬‬
‫ﺻ ‪‬ﻮ ‪‬ﺭﺗ‪‬ﻬﺎ ﹶﻓﹶﺄ ‪‬ﺣ ‪‬‬
‫‪‬ﻭ ‪‬‬
‫ﺨ ‪‬ﺮﺗ‪‬ﻬﺎ ﹺﺑﺴ‪‬ﻠﹾﻄﺎ ‪‬ﻥ‬
‫ﺖ ‪‬ﺗﺪ‪‬ﺑﲑ‪‬ﻫﺎ ‪‬ﻭ ‪‬ﺳ ‪‬‬
‫ﺴ‪‬ﻨ ‪‬‬
‫ﻚ ‪‬ﺗﺪ‪‬ﺑﲑﹰﺍ ﻓﺄ ‪‬ﺣ ‪‬‬
‫ﺤ ﹾﻜ ‪‬ﻤ‪‬ﺘ ‪‬‬
‫‪‬ﻭ ‪‬ﺩ‪‬ﺑ ‪‬ﺮﺗ‪‬ﻬﺎ ﹺﺑ ‪‬‬
‫ﲔ ﻭ‪‬ﺍﹾﻟﺤ‪‬ﺴﺎﺏﹺ‪،‬‬
‫ﺕ ‪‬ﻭ ‪‬ﻋ ‪‬ﺪ ‪‬ﺩ ﺍﻟﺴ‪‬ﻨ ‪‬‬
‫ﺍﻟﻠﱠ‪‬ﻴ ﹺﻞ ‪‬ﻭ ‪‬ﺳ ﹾﻠﻄﺎ ‪‬ﻥ ﺍﻟﻨ‪‬ﻬﺎ ﹺﺭ ﻭ‪‬ﺍﻟﺴ‪‬ﺎﻋﺎ ‪‬‬
‫ﺉ ﻭﺍﺣ‪‬ﺪﹰﺍ «‪.‬‬
‫ﺱ ‪‬ﻣ ‪‬ﺮ ‪‬‬
‫ﺖ ﺭ‪ ‬ﺅ‪‬ﻳﺘ‪‬ﻬﺎ ‪‬ﻟﺠ‪‬ﻤﻴ ﹺﻊ ﺍﻟﻨ‪‬ﺎ ﹺ‬
‫‪‬ﻭ ‪‬ﺟ ‪‬ﻌ ﹾﻠ ‪‬‬
‫‪ l^ÛŠÖ]ð^Â‬‬
Dedication
To
My
Mother
Acknowledgment
I am indebted to God for helping me to finish what I started, and for
helping me to present this work.
I would like to express my thanks to my supervisor Assist. Professor
Dr. Abdul-Rahman Hussein for his guidance, encouragement, and valuable
advice throughout the period of preparation of this thesis.
My deep thanks to the head of the Department of Astronomy and
Space, academic staff, colleagues at the College of Science, University of
Baghdad for their encouragement, and friends who encouraged me with a
piece of advice, invocation of God, or a smile.
I would like to express my deep gratitude to my family, specially my
wife for their support and patience throughout the tough times.
I would like to thank the dean of the College of Science. Finally
thanks are due to everyone who contributed in my successful journey
throughout my life.
Hayder
Abstract
In this research a study of the equation of Keplerian motion to
understand the solution of the two-body problem with and without
perturbation for the Moon's orbit as a sample of elliptical orbits using two
techniques:
The first technique depends on actual formula for the Moon
coordinates distance and its variation with time in a month then calculate
the components of the position and velocity to calculate momentum
component to find the orbital elements, which consider the motion with
perturbation.
The second technique depends on the solution of Kepler's
equation of motion by the eccentric anomaly to calculate the Moon
geocentric coordinates and its variation with time then calculate the
components of the position and velocity to calculate momentum component
after convert them to the Earth plane by inverse Gauss matrix to find the
orbital elements, which consider the motion without perturbation.
The perturbation was found in each element by comparing the
results which calculated from two method above. And its variation with the
time for four different months in the year 2010. It can be noted that in all
elements varies with time by perturbation.
In addition that, this research gave an explanation and discussion
for the common forces that perturb an objects orbit such as, the atmosphere
drag, non-spherical earth, solar radiation pressure and third body attraction,
where the last one is the main effect of the Moon orbital elements.
Also, the time of conjunct between the Sun and the Moon was
calculated for all months of the year 2010 to determine the start conjunct
astronomical month, which can be used to determine the start of Hegree
months.
CONTENTS
Acknowledgment
Abstract
Contents
List Of Figures
List Of Tables
List Of Symbols
Page
No.
I
III
IV
Chapter One
1.1.
1.2.
1.3.
1.4.
1.5.
"INTRODUCTION"
Introduction
The Moon’s Orbit
Moon's Month
Literature Survey
The Aim Of The Present Work
2
3
7
9
16
Chapter Two
"COORDINATE SYSTEMS AND MOON COORDINATE"
2.1.
Coordinate Systems
2.1.1. The Horizontal (alt– azimuth) System
2.1.2. The Equatorial System
2.1.3. The Ecliptic System
2.2.
Transformation Of One Coordinate System Into
Another
2.3.
Date And Julian Date
2.3.1. Computation Of Julian Date (JD) From
Calendar Date
2.3.2. Compute Of The Calendar Date From JD
2.4.
Calculating The Julian Day For The Crescent
Moon
2.5.
Moon Elliptical Coordinate
2.6.
2.7.
2.8.
Calculating The Moon Distance
Moon Coordinate Conversion
Calculating The Moon Velocity Component
18
18
21
23
25
26
26
27
29
30
31
31
32
Chapter Three
"TWO BODY PROBLEM WITHOUT PERTURBATION"
3.1.
Introduction
3.2.
Equations Of Motion
3.3.
The Solution Of The Two-Body Problem
3.4.
The Energy Integral
3.5.
The Velocity Of a Planet In Its Orbit
3.6.
The Orbital Element
3.7.
The Period Of Revolution Of a Planet In Its
Orbit
3.8.
The Orientation Of The Orbital Plane
3.9.
Calculating The Orbital Elements
3.10.
Solution Of Kepler's Equation
34
37
40
40
42
43
46
50
50
52
Chapter Four
4.1.
4.2.
4.2.1.
4.2.2.
4.2.3.
4.2.4.
4.3.
"PERTURBATIONS"
Introduction
Orbital Perturbations
Atmospheric Drag
Non-Spherical Gravitational Field Of The Earth
Solar Radiation Pressure (SRP)
Third Body Attractions
Other Perturbation Forces
56
57
59
61
62
64
66
Chapter Five
"RESULTS, DISCUSSION, CONCLUSIONS AND FUTURE WORK"
5.1.
Introduction
5.2.
Results and Discussion
5.3.
Conclusions
5.4.
Future Work
References
Appendix A
Appendix B "flowchart"
68
69
85
86
88
List Of Figures Figures No. Descriptions Page No. 1.1.
1.2.
The Moon's orbit around the Earth orbit.
The Moon’s phases result from the relative
orientation of the Moon and the Sun, as seen from
the Earth.
4
6
2.1.
2.2.
2.3.
2.4.
Horizon coordinate system.
The observer’s celestial sphere.
The equatorial system.
Ecliptic coordinates.
19
20
21
24
3.1.
3.2.
An orbital ellipse.
The two-body problem presented in a rectangular
coordinate frame.
The velocity of a planet in an elliptical orbit.
The orbital elements.
The shape of the orbit for different values of the
eccentricity.
35
38
3.6.
The geometry of an elliptical orbit.
47
4.1.
Secular and periodic variations of an orbital
element.
Vector definitions for third body attraction.
58
3.3.
3.4.
3.5.
4.2.
5.1.
The Moon distance (Rm) variation with date for
four different months of the year 2010.
The Moon's velocity (V) variation with date for four
different months of the year 2010.
The semi major axis (a) of the Moon in km with
date for four different months of the year 2010.
The eccentricity (e) of the Moon as a function of
time for four different months of the year 2010.
The effect of alignment of the major axis of the
Moon's orbit with the Earth - Sun line.
The effective eccentricity of the lunar trajectory as
a function of time of the year 1980.
The instantaneous eccentricity of the lunar orbit,
1996 to 1998.
5.2.
5.3.
5.4.
5.5.
5.6.
5.7.
42
44
45
64
71
72
73
75
75
76
76
I
5.8.
5.9.
5.10
5.11
5.12
The inclination angle (i) in degree for the Moon
with the date using two techniques for four different
months in the year 2010.
The longitude of ascending node (Ω) of the Moon
as a function of the date for four months using two
techniques.
The eccentric anomaly (E) in degree of the Moon
against the time using two techniques for four
different months in the year 2010.
78
The mean anomaly (M) in degrees of the Moon
against the time using two techniques for four
different months in the year 2010.
The argument of perigee (ω) of the Moon against
time for four different months in the year 2010
using two techniques.
81
79
80
83
II
List Of Tables Table No. Description (1.1) (3.1) (5.1) (5.2) (5.3) (5.4) (5.5) (5.6)
(5.7)
(5.8)
Page No. Developed critical condition for crescent visibility.
Classical orbital elements
The maximum, minimum and average the Moon
distance by two techniques for four different
months in the year 2010 and the difference
between two methods for each month.
The maximum, minimum and average of the semi
major axis (a) of the Moon by two techniques for
four different months and the difference between
them.
The maximum, minimum and average values of
actual eccentricity (e) of the Moon orbit for four
different months using first technique (perturbed)
and the difference each month.
The maximum, minimum and average values of
inclination (i) of the Moon's orbit by first method
and inclination (i) by second method for four
different months of the year 2010 and the
difference between them for each month.
The maximum, minimum and average values of
longitude of ascending node for the Moon orbit for
four difference months using two techniques.
The maximum, minimum and average values of
argument of perigee of the Moon for four different
months in the year 2010 using two techniques and
the difference between them for each month.
10
46
70
The period of the conjunct months of the Moon in
the year 2010 A.D.
The date and time of the new Moon.
84
73
74
77
79
82
84
III
List Of Symbols Symbol A a
Aa ad
aJ2
al As
asolar
b
Batm
C
c
CD
Dd
e
E
F
f
FD
Fm
Fθ
G
H
h
,
, i
J2
JD
JDm
l
l'
M
Definition
unite The azimuth angle
The semi-major axis
The effective surface area of body
The perturb acceleration due to the
gravitational attraction of a third body
The perturb acceleration due to J2
The altitude angle
The cross-sectional area of body
The perturb acceleration due to solar
radiation pressure
The minor major axis
The barometric coefficient
The energy constant
The speed of light
The drag coefficient
The difference between the mean
longitudes of the Sun and the Moon
The eccentricity
The eccentric anomaly
The force of attraction
The true anomaly
The magnitude of the drag force
The Moon's argument of latitude
The solar energy flux
The gravitation constant
The hour angle
The angular momentum of the orbit
The function of the altitude
The component of angular momentum
The inclination angle of orbit
The zonal coefficient of the Earth
gravitational field
The Julian Date
The Julian Day for the crescent moon
The Moon's mean anomaly of the year
2000 A.D
The Sun's mean anomaly
The mean anomaly
degree
Km
m2
m / S2
m / S2
degree
m2
m / S2
Km
without unite
without unite
Km / S
without unite
degree
without unite
degree
Newton
degree
Newton
degree
W / m2
m3 / Kg.S2
hr mn ss
m2 / S2
without unite
m2 / S2
degree
without unite
day
day
degree
degree
degree
IV
Mm
The Moon's mean anomaly
degree
The Sun's mean anomaly at time JD of
degree
year 1900 A.D
The mean motion
rad / S
The momentum flux from the Sun
W S / m3
Ms
N
PS
R-1
Re Rm
rp, ra
Rx, Ry, Rz
T
tp
u
V, VP, VA
Vx, Vy, Vz
xw ,yw
α β βm
δ ε θ
λm
µ
π
Ω
ω
ωv
, o The elements of Gaussian matrix
without unite
The inverse of Gauss matrix
The Earth radius
The Moon's distance from the center of
the Earth
Perihelion, aphelion geocentric radial
distance
The components distance of the Moon
The number of Julian centuries
Time of the perigee passage
The argument of the latitude angle
The velocity, velocity at perihelion and
velocity at aphelion
The velocity component of the Moon
The cartesian coordinate of the Moon
in its orbit
The right ascension angle
The ecliptic latitude
The Moon's elliptical latitude
The declination angle
The obliquity angle
The angular distance
The Moon's elliptical longitude
The Gravitational parameter
The constant ratio
The longitude of the ascending node
angle
The argument of the perigee angle
The angular velocity
The ecliptic longitude
The atmospheric density, the initial
density at perigee point
The observer latitude
without unite
Km
Km
Km
Km
without unite
hour
degree
Km / S
Km / S
Km
degree
degree
degree
degree
degree
rad
degree
Km3 / S2
without unite
degree
degree
rad / S2
degree
Kg / m3
degree
V
Chapter One
INTRODUCTION
Chapter one Introduction 1.1. Introduction
The Moon's Earth is a natural satellite. Sometimes it is called
“Luna” but that name conjures up visions of madness and worship and is
not used by astronomers [1]. It is the first astronomical object to see in
anyone's eye at night sky, therefore the observations are begin as long as
3000 years ago [2] because it is the brightest object in the night sky and
second important sky body, where many events on the Earth depend on the
Moon position phase, such as the night shining, the solar and lunar eclipse,
and affect activities such as deep-sea fishing and navigation [3]. Also for
some people the Moon birth used to determine the dates as (Hegree date for
Islamic countries).
It is moves eastward by about one diameter per hour or 13o per
day [4] or at an average speed of slightly more than 30' per hour [2] and the
apparent Sun moves to the east about 1o per day, this means that the Moon
rise and Moon set events are both grow later between (36 min - 52 min)
every day [5]. It is apparent diameter is about half a degree. And an actual
diameter of 3476 km [6], or 3480 km, it is about 27.2 percent that of Earth's
diameter [1]. Its density is 3.34 g/cm3, and mass is 7.3483×1022 Kg [6]
which means it has 1/81.30 of the Earth’s mass and 0.0203 of its volume [7,8].
The Earth and the Moon revolve about their common centre of
gravity, a point called the barycentre. If the Earth and the Moon were equal
in all respects, then the barycentre would be positioned in space exactly
between the Earth and the Moon. But the Moon’s mass is about 2% that of
the Earth, which offsets the barycentre considerably in the Earth’s
direction, so much so that the common centre of gravity is actually located
within the Earth’s mantle [9], around 4671 km [8] or 4700 km from the
centre of the Earth [9]. It is so bright, (the full Moon has apparent visual
magnitude of -12.7), although its surface rocks are dark, and the Moon’s
albedo is only 0.07 [5,7].
2
Chapter one Introduction The rotation time of the Moon is equal to the sidereal month
(the same as its axial rotation period), so the observer on the Earth always
sees the same side of the Moon always faces the Earth. Such synchronous
rotation is common among the satellites of the solar system [10,11].
The visible side is called the nearside, and the side invisible from the Earth
is the farside. In fact, the face of the Moon presents to us does vary slightly
because of a number of effects known collectively as libration [7].
Owing to the libration, a total of 59% of the surface area can be seen from
the Earth. The libration or "rocking motion" [8] is quite easy to see if one
follows some detail at the edge of the lunar limb [10]. And it occurs
because of the variation of orbital speed of Moon according to Kepler's
second law, and because the Moon’s mass is not uniformly distributed
within the globe, and Earth’s gravity has managed, over millions of
centuries, to tug the Moon’s rotation rate into near-perfect lock step with its
revolution [1].
1.2. The Moon’s Orbit
Planets move around the Sun in elliptical orbits, and their
satellites follow elliptical orbits around them. An ellipse is a closed curve
with two focal points lying on its main axis; the Earth lies at one focal point
of the Moon’s orbital ellipse. The Moon’s orbit around the Earth appears
almost circular, with the Earth positioned very close to the centre of the
circle. Careful measurement will reveal that the figure is really an ellipse
with a mean eccentricity of 0.055 [9] or for more accuracy is 0.054900489
[8,12] which is defined as the ratio of the difference between the major and
minor axes to the major axis, with the Earth lying slightly to one side of the
centre, positioned over a focus of that ellipse [9].
3
Chapter one Introduction A celestial observer viewing the Solar System from a great
distance would not see the Moon making loops in space about the Earth.
It is seen in orbit around the Sun, as is the Earth, and that the effect of the
Earth's influence is to make the Moon's orbit wiggle a little as the relative
positions of Earth and Moon change (Figure 1.1). This is because the Sun's
gravitational force on the Moon is much greater than that of the Earth, even
though the latter is nearer. It is hardly surprising that the orbit of the Moon
is so difficult to calculate since it is regulated by two bodies, not one, and
the two bodies are themselves tied in orbit about each other [13].
Sun Moon's orbit about the Sun
Earth's orbit about the Sun
Figure (1.1): The Moon's orbit around the Earth orbit [13].
The Moon's sidereal path crosses the ecliptic twice at each month
with mean angle 5o9' and the crossing point ascending and descending
nodes move westward covering about 20o over a year [14]. Orbiting at an
average distance from the Earth of 381000 km [1], 384000 km [10],
384400 km [8,12], 384401 km [9], the Moon lies about 30 times the
Earth’s diameter away [1,9]. Light (electromagnetic radiation) takes an
average of 1.3 seconds to cross the space between the Moon and the Earth.
Radar signals bounced off the Moon enable its distance to be determined to
an accuracy of less than half a kilometer.
4
Chapter one Introduction The Moon’s surface does not reflect radio waves as strongly as it
would were it covered by large expanses of solid rock, and it was known to
be covered by a thick layer of soil long before the first soft-landing probes
touched down on its surface. The most accurate means of measuring the
distance of the Moon is to aim short pulses of laser light at a reflecting
point at a known location on the lunar surface and accurately time the
returning light signals. Measurements made by aiming lasers at the passive
laser reflectors left at the Apollo landing sites give a Moon distance
accurate to within a few meters, and observations over the years have
demonstrated that the Moon’s mean distance from the Earth is slowly
increasing [9].
The new moon is that instant when the Moon is in conjunction
with the Sun. Almanacs define the phases of the Moon in terms of ecliptic
longitudes; the longitudes of the new moon and the Sun are equal. Usually
the new moon is slightly north or south of the Sun because the lunar orbit is
tilted 5o with respect to the ecliptic. About 2 days after the new moon, the
waxing crescent moon can be seen in the western evening sky. About 1
week after the new moon, the first quarter follows, when the longitudes of
the Moon and the Sun differ by about 90◦. The right half of the Moon is
seen lit (left half when seen from the Southern hemisphere). The full moon
appears a fortnight after the new moon, and 1 week after this the last
quarter. Finally the waning crescent moon disappears in the glory of the
morning sky [10] as shown in figure (1.2).
5
Chapter on
ne Inttroduction F
Figure
(1.2): The Moonn’s phases reesult from the
t relative orientation of
the Moon and
a the Sun,, as seen froom Earth [1].
The Mooon's orbitt is variab
ble in shappe and sizze becausee of otherr
body attrraction suuch as the Sun and some
s
plannets these problems are moree
distance and thee
complicaate becauuse the variation
v
of the Earth-Sun
E
planetaryy positionn. The orbbital elem
ments havee some vaariations with
w time..
The minimum disttance of thhe Moon from the centre of the Earth (perigee))
the closeest approaach to the Earth’s su
urface is 356400
3
km
m, or is 34
48294 km
m
[4]. Andd the maxximum disstance (ap
pogee) thee furthest distance from thee
Earth’s surface iss 406700 km, or is
i 3985811 km [4]. This rep
presents a
differencce of 13.55 percent of
o the Mo
oon’s meaan distancee [1]. Thiss range iss
larger thaan the onee calculateed from th
he semi-m
major axis aand the ecccentricityy
[10]. Thherefore thhe angulaar diameteer of the Moon as seen from
m Earth'ss
surface varies
v
betw
ween 33′299″ and 29′′23″ [9], 33'.5
3
and 229'.4 [10] at
a averagee
it is 31′005″. Havinng an apparent diam
meter abouut 12% laarger at peerigee, thee
apparent area of thhe perigee Moon is 29%
2
largerr than at appogee [9].
6
Chapter one Introduction The line that joins the points of apogee and perigee – effectively
the major axis of the Moon’s elliptical orbit – is called the “line of
apsides”. The line of apsides rotates (with respect to the stars) in a prograde
fashion every 8.85 years. The plane of the Moon’s orbit around the Earth is
inclined to the plane of the Earth’s orbit around the Sun (the plane of the
ecliptic) by 5°8′43″. The two points at which these planes intersect are
called the ascending and descending nodes. The ascending node is the point
on the ecliptic where the Moon moves to the north of the ecliptic;
the descending node marks the point where the Moon moves to the south of
the ecliptic. The line of nodes rotates (with respect to the stars) in a
retrograde fashion every 18.61 years [9,10]. In an astronomical sense,
the recession of the line of nodes is important, since solar and lunar
eclipses are dependent on the nodes’ position in relation to the Sun and the
Earth [9] i.e. the solar eclipse happens at the nearest angle between the Sun
and the Moon and lunar eclipse happens at about 180o between them [13].
1.3. Moon's Month
There are different types of months for the Moon depending on
the start point to measure the period that Moon takes it to return to the same
point which start from it. These are:
1) Draconic month (nodical month): Time taken for the Moon to
complete a single revolution around the Earth, measured relative to its
ascending node; it is equivalent to 27.21222 days of mean solar time
[2,7,8,10] or 27d5h5m34.1s [15].
2) Tropical month: Time taken for the Moon to complete a single
revolution around the Earth, measured relative to the first point of Aries;
it is equivalent to 27.32158 days of mean solar time [2,7] or 27d7h34m4.74s [15].
7
Chapter one Introduction 3) Sidereal month: Time taken for the Moon to complete a single
revolution around the Earth, measured relative to a fixed star;
it is equivalent to 27.32166 days of mean solar time [6,7,8,10,13].
Which equals to 27d7h43m11.5s [9,15].
4) Anomalistic month: Time taken for the Moon to complete a single
orbit around the Earth, measured from perigee to perigee. An anomalistic
month is shorter than the more commonly used synodic month,
being equivalent to 27.55455 days of mean solar time [2,7,10,16]
or 27d13h18m37.4s [15].
5) Synodic month (lunar month): Period between successive new or
full moons. This is the same duration as one lunation and is equivalent to
29.53059 days of mean solar time [2,7,10,13,16] or 29d12h44m2.9s [15].
The difference between the sidereal and synodic months in
period because during this time the Earth moves on along its own orbit so
that the Sun's position changes with respect to the stars. Hence the Moon
has some extra distance to make up to regain its position relative to the
Sun. The interval defined by the time taken for the Moon to return to the
same position relative to the Sun.
Although in any revolution of the Moon in its orbit these months
may differ by a few hours from the mean values given above, the mean
values remain steady over many centuries to within one second.
8
Chapter one Introduction 1.4. Literature Survey
For the ancient Babylonian, Greek and Egyptian astronomers the
major interest was to predict the positions of the Sun, the Moon and the
planets on the celestial sphere, because the main tasks for them were to
provide an exact calendar and the precise determination of the date of the
eclipses in advance. This was accomplished with long and difficult
observations to detect the different periods of the motion of the celestial
bodies in the sky [17].
Many Arab and Muslim old astronomers studied the Moon orbit
and developed the lunar visibility such as: Yaqupe bin Tariq, Habash,
Al-Khwarzmi, Al-Tabari, Al-Farghani, Thabet bin Qurrah, Al-Battani,
Ibn Maimon, Al-Biaruni, Abdul Rahmman Alsufi, Ibn Sina, Al-Tusi and
Al-Kashani [18,19].
The Moon visibility criteria are important and developed from
the biging of Islamic date as in table (1).
From the nineteenth century, the lunar visibility crescent
developed by many astronomer such as: Fotheringham 1910, Maunder
1911, Carl Schoch, Bruin 1977, B.E. Schaefer 1988, 1991, 1994, 1996
Shaukat, M. Ilyas 1979, 1981, 1982, 1983, 1984, 1988 and 1993, Bernard
Yallop 1997 [18,20], Muhammad Shahid Qureshi [21]. Also the Arab
astronomer such as: Z. Sardar 1982, Al-Abadee 1991 [22], Odeh M. [23],
N. Guessoum and K. Meziane [24], A. H. Sultan [25].
Furthermore some observatories were involved such as: Royal
Greenwich Observatory (RGO), South African Astronomical Observatory
(SAAO) [20].
In Iraq, Astronomers work on the lunar visibility, these are:
H. M. Alneamy et al 1987, 1989, 1995, 1994, M. M. Jarad, Abdul AlRahmman H. S. 1997, F. M. Abdulla 2001, and D. M. Al-Fead 2002
[11,18].
9
Chapter one Introduction The Moon visibility criteria developed in the past time are illustrated
in table (1.1).
Table (1.1): Developed critical condition for crescent visibility.
Date
B.C
Astronomer
Babylonians
Chinese and Japanese
B.C
500 A.D
Hindus
767‐778 Yaqub bin Tariq
A.D
740‐840 Habash
A.D
836 A.D
Al‐Khwarizmi
731‐861 Mousa bin A.D Maimon
850‐929 Al‐Battani
A.D 826‐901 Thabet bin A.D Qurra Abdul‐Rahman 986 A.D Al‐Sufi
973‐
Al‐Biaruni
1048 A.D 1258‐
Nasir Al‐Deen 1274 A.D Al‐Tusi
15th century Ghiyath Al‐Din Al‐Kashani Fotheringham and Maunder 1977 A.D Bruin 1910 A.D Islamic conference in Istanbul 1978 A.D 1981‐84 A.D Ilyas Critical condition
Comment
o
a>= 12
Based on observation
Depend on Babylonians observation
Depend accurate o
a>= 12
observation and evolved liner relation
Put crescents calculate table
Calculated suit modified
a>9.5o
9o<=a<=24o
a < 12o
In general it was suitable in spring and autumn
Calculate suit modified
11o<=a<=25o
a >= 12o
Depend on Babylon rules
Depend on Hapash and Al‐Battani rules
o
a>= 12
a(∆Z) >= f(Z,A) a(∆Z) >= f(Z,W)
a>8o l>5o a(∆Z) >= f(a,Z) Depend on Babylon system 24 minute a er Sun set
Or a>=11o‐12o where ∆A=0 from observa on Theoretical (a) is angular distance for Moon from Sun. (l) is height of Moon from horizontal Compare between two critical independent case 10
Chapter one Introduction 1983 A.D Ilyas Age>=f(lat, season, year) Simpler approximate for critical case 1984‐88 A.D Ilyas a>=f(lat, season) More accurate Hameed + Sameer 1985 A.D a>7o l>4o Hameed + Abdul Age>=10h & a>5o
1993 A.D Rahman & l>3o Age>7h+a>=5o + 1997 A.D Abdul Rahman I>3o+Makth>10min
2001 A.D Fuad Mahmud 2002 A.D Dhaha Al‐Faidh P= 2.075Age +
2.471Makth + 2.484Alt +0.659l Depended on modern astronomical calculate with observation All condition should be verify The effect of geographic sit on the coefficient critical Foundation the equation of probability for lunar crescent visibility The motion of Moon can be considered as a two-body problem
but in fact it is a system with many body problems.
Johannes Kepler (1571–1630) who found that the motion of Mars
is an ellipse, with the Sun in its focus, did computations using an empirical
mathematical
equation
depending
on
Tycho
Brahe
(1546–1601)
observations [17]. He published his famous first and second law in 1609
and third law in 1619. He proved to that the orbits of planets including the
Earth are ellipses instead of circles with the Sun at one focus. Although
requiring a single extra parameter for each orbit (eccentricity), Kepler's law
agreed with observations perfectly without the need for epicycles [26]
therefore he was the first to solve two-body gravitation problem and he put
the mathematical roles to solve ellipse equation [27]. These three laws are
considered as the basis of all future work in celestial mechanics.
To understand the motion of the planets, Sun and Moon the universal law
of gravitation should be used, which was discovered by Isaac Newton
(1642–1727) in 1687 [17], Newton's contribution was a huge triumph for
11
Chapter one Introduction astronomy, physics and mathematics. His universal law of gravity is still
used today to guide spacecraft flying to the outer Solar System and to
model the motion of the planets and the Moon to exquisite accuracy [26].
The knowledge of the two-body motion is of such importance
because [17]:
1. The motion of a single planet around the Sun (the two-body problem) is
the only astrodynamical problem where we have a complete and general
solution (although it is not as simple as it looks like) besides very special
cases of the three-body problem not exactly realized in nature.
2. For many problems in the dynamics of celestial bodies it is a very good
first approximation.
3. It is the starting point of analytical theories from which the astronomers
work to develop the solution to higher orders with respect to small
parameters involved like the eccentricity, the inclination of the orbit and
the small masses of the other planets, which perturb the elliptic motion
of a planet around the Sun.
The Restricted Three Body-Problem (R3BP) dates back to
Leonhard Euler (1707–1783), who worked on a lunar theory. His main
contribution to the R3BP was the introduction of a synodic coordinate
system, where the two massive bodies have fixed positions. He also solved
a special case of the R3BP that is called two fixed centre problem, where
two fixed centre of force act on a third one [17]. In 1750 he recognized that
these equations of motion are valid for any mass element and thus define a
“new” mechanical principle [28]. The most complete study on the R3BP
was published by Szebehely [17,29]. George William Hill (1838–1914)
developed his lunar theory by studying the actual motion relative to a
periodic solution of the 3BP Earth-Moon-Sun [29]. He wanted to prove the
stability of the restricted problem by representing an actual orbit as
12
Chapter one Introduction infinitesimally close to a suitable periodic solution, found that for some of
the resonant motions the opposite was true. It often happens that a problem,
which is simplified in the attempt to find simple approximations, is no
longer strongly related to the original problem [28]. Between the 1890s and
the 1930s, George Darwin (1897–1911), George Hill (1898), Henry
Plummer (1903), Forest Moulton (1920), Elis Strömgren (1935), and their
colleagues contributed to the discovery of the first known periodic orbits in
the circular restricted three-body problem [29].
Joseph Louis Lagrange (1736–1813) besides his foundational work
in classical mechanics and his creation of the variation calculus, found the
Lagrange points while attempting to solve the three-body problem, worked
out a method to determine a comet's orbit with only three observations, and
did additional important work on orbital precession and stability.
Pierre-Simon Laplace (1749–1827), through a series of memoirs
to the Academy of Science in Paris, addressed the stability of the Solar
System by showing that the changes of the orbital mean motions of Jupiter
and Saturn were periodic and due to their near-resonance orbits. He also
spent a significant amount of time in the study of lunar motion perturbed by
a non-spherical Earth, and of the oceanic tides induced by the Sun and the
Moon. His most significant contribution was the compilation of the five
volume Celestial Dynamics (1799–1825), which "offer a complete solution
of the great mechanical problem presented by the Solar System, and bring
theory to coincide so closely with observation that empirical equations
should no longer find a place in astronomical tables." Laplace included
most of his work on planetary orbits and perturbations, as well as problems
solved by earlier astronomers [26]. Research on celestial dynamics
achieved a real predictive triumph when the British astronomer John Cough
Adams (1819–1892) and the French astronomer Le Verrier (1846)
independently discovered Neptune by analytical calculation of its
13
Chapter one Introduction perturbation on the orbit of Uranus. Galle (1846) later found the planet only
1o off Le Verrier's prediction [26,28]. In the 1890s, Poincaré contributed
substantial advancement to the understanding of the three-body problem,
most notably by describing the existence of chaos in the dynamical system.
The existence of chaos helped to explain why a solution to the general
three-body problem was so evasive [29].
Many new studies on different kinds of perturbations to the motion of
planets and satellites were conducted. Most of the analytical works focused
on three-body problems (e.g., expansion of the disturbing function by
Boquet, 1889), or low-order approximations for systems with a few more
objects and additional perturbations (e.g., secular frequencies in the Solar
System by Brouwer et al., 1950). Darwin (1879, 1880) also began to
pioneer the analysis of the lower-order effects of tides and tidal friction.
The use of computers for numerical integration opened a new window on
the subject in the 1960s, and made it possible to handle more complicated
systems for a long period of time and to study the formation and evolution
of the whole Solar System. One key numerical integration of the outer
Solar System for 120,000 years was undertaken by Cohen and Hubbard
(1965) [26].
The studies of the influence of a perturbing third body are: Kaula
(1962) expressed the disturbing function in osculating Keplerian elements
in a fashion similar to the work he did for the terrestrial gravitational field
[30,31]. From the mid-1960s to the early 1970s, good progress was made
in the application of computer techniques to the manipulation of analytical
expressions. The basic principles of computerized manipulation of series
expansion were developed by Danby, Deprit, and Rom (1965), Broucke
and Garthwaite (1969), Keesey (1971), Ananda (1973), and Chao (1976)
applied the computerized series-expansion system designed by Broucke for
obtaining solutions of mutual perturbations among planets, perturbations
14
Chapter one Introduction resulting from Oblateness, and the motion of the Galilean satellites of
Jupiter for obtaining solutions of, respectively, mutual perturbations among
planets [31]. Giacaglia (1977) developed the geopotential, the third body
and the solar pressure disturbing functions in nonsingular variables. Some
recent works include Prado (2003) and Broucke (2003). Both used a double
averaging of the third-body potential. But Prado used this potential to
analyze the evolution of orbits around major natural moons of the Solar
System, while Broucke’s motivation was to study the long-term third-body
effects on the stability of an Earth satellite. Solórzano and Prado (2004)
published a paper in which they studied the long term evolution of the
orbital elements using a single average model [30]. Ke Zhang (2007)
studied satellite orbits, to understand how orbits evolve over the time of the
Solar System depending on their timescale, he classified orbital interactions
as either short-term (orbital resonances) or long-term (secular evolution)
[26]. Nadege Pie (2008) used a simplified model of the third-body problem.
The main body with mass (M) is at the origin of the system. The orbit of
the perturbing body of mass (m) is assumed to be unperturbed Keplerian
and elliptical [30] .
15
Chapter one Introduction 1.5. The Aim Of The Present Work
1- To study the two-body problem with and without perturbation.
2- To calculate the Moon geocentric coordinates (λ, β, Rm) and its
variation with time by using two methods:
The first technique using empirical formula with perturbation which
agrees with the observations.
The second technique solving Kepler's equation for the Moon elliptic
orbit (without perturbation).
3- To calculate the value of orbital elements (M, a, e, Ω, ω, i) as well
as the position, velocity, and eccentric anomaly (r, v, E) and its
variation with time through some months of the year from the
above two methods.
4- To calculate the perturbation in the orbital elements by comparing
these elements from the two above method.
5- To discuss the perturbation with orbital elements and how can be
used to determine the exactly Moon orbit which can be used with
practical formula to determine the lunar crescent visibility criteria.
16
Chapter Two
COORDINATE
SYSTEMS AND
MOON
COORDINATE
Chapter two Coordinate Systems and The Moon Coordinate 2.1. Coordinate Systems
Observing or calculating the position and velocity of any celestial
object requires a coordinate system and the first requirement for describing
an orbit is a suitable inertial reference frame [8]. In the 4000 years ago
during which astronomy was developed, various coordinate systems have
been introduced because of the wide variety of problems to be solved. It
has particular reference to great circles by which the direction of any
celestial body can be defined uniquely at a given time. The choice of origin
of the system also depends on the particular problem. It may be the position
of observer on Earth's surface (a topocentric system) or from the centre of
the Earth (a geocentric system) or from the centre of the Sun (a heliocentric
system) or centre of the Moon (a selenocentric system) or in the case of
satellite problems, the centre of a planet (a planetocentric system) [14] or
even the galactic centre in stellar dynamics [12].
Some celestial coordinate systems can be classified as the
following:
2.1.1. The Horizontal (alt– azimuth) System
The most primitive system, most immediately related to the
observer’s impression of being on a flat plane and at the centre of a vast
hemisphere across which the heavenly bodies move [14]. The horizon is
defined as the dividing line between the Earth and the sky, as seen by an
observer on the ground [32].
18
Chapter two Coordinate Systems and The Moon Coordinate As shown in the drawing below figure (2.1), the origin of this
coordinate system is the observer (O), The fundamental plane of the system
contains the observer and the horizon, The horizon is that line on the
celestial sphere which is everywhere 90° from the zenith [33], (Z) which is
the point straight overhead, perpendicular to the horizon plane, and nadir is
the point directly under the observer. A vertical circle through an object in
the sky and the zenith is the object circle. The coordinates of the object are
given by the azimuth (A), which is the horizontal angle from north (N)
clockwise to the object circle from (0o – 360 o), and the altitude or elevation
angle (al), which is measured upward from the horizon to the object, which
is change between (0o – 90 o). The great circle through the north and south
points out the horizon and the zenith is called the meridian [32].
Z
al
S
N
O
A
E
Figure (2.1): Horizon coordinate system [32].
19
Chapter tw
wo Coordinate Systems and The Moon C
Coordinate The observer’s ceelestial sph
here is shoown in figgure (2.2) where
w
(Z))
is the zeenith, (O) the obserrver, (P) is
i the nortth celestiaal pole an
nd OX thee
instantanneous direection of a star. Thee great cirrcle througgh (Z) and
d (P) cutss
the horizzon NESA
AW at thee north (N
N) and souuth (S) pooints. Another greatt
circle WZE
W
at righht angles to
t the great circle NPZS
N
cutss the horizzon in thee
west (W
W) and eaast (E) pooints. Thee arcs ZN
N, ZW, Z
ZA, etc, are
a calledd
verticals. The poinnts N, E, S and W are
a the caardinal poiints [12,14
4]. It is too
be notedd that west is alwayys on the left hand of an obsserver faciing north..
The vertticals throough east and west are called prime vverticals; ZE is thee
prime veertical eastt, ZW is thhe prime vertical
v
weest [14].
The twoo angle thaat specify the positiion of (X)) in this system aree
the azim
muth, (A) ,aand the alltitude, (al). An alterrnative cooordinate to
t altitudee
is the zennith distannce, (Z), of
o (X), indiicated by ZX
Z in figuure (2.2.) [12,14].
al = 90o – Z
al Figgure (2.2): The
T observerr’s celestiall sphere [12,14].
20
2
Chapter two Coordinate Systems and The Moon Coordinate The main disadvantage of the horizontal system of coordinates is
that it is purely local. Two observers at different points on the Earth’s
surface will measure different altitudes and azimuths for the same object at
the same time. Also an observer will find the object’s coordinates changing
with time as the celestial sphere appears to rotate [12,14].
2.1.2. The Equatorial System
If the plane of the Earth’s equator is extended it will cut the
celestial sphere in a great circle called the celestial equator. It intersects the
horizon circle in two points (W) and (E) (figure 2.3). The (W) and (E) are
the west and east points [12,14]. Since the angle between equator and
zenith is the observer’s latitude it is seen that the altitude of the north
celestial pole (P) is the latitude (
of the observer [12]. Points (P) and (Z)
are the poles of the celestial equator and the horizon respectively. But (W)
lies on both these great circles so that (W) is 90° from the points (P) and
(Z). Hence, (W) is a pole on the great circle ZPN and, therefore, be 90°
from all points on it in particular from (N) and (S). Hence, it is the west
point. By a similar argument (E) is the east point. Any great semicircle
through (P) and (Q) is called a meridian. The meridian through the celestial
object (X) is the great semicircle PXBQ cutting the celestial equator in (B)
(see figure 2.3). The meridian PZTSQ is the observer’s meridian [14].
Figure (2.3): The equatorial system [12,14].
21
Chapter two Coordinate Systems and The Moon Coordinate An observer viewing the sky will note that all natural objects rise
in the east, climbing in altitude until they transit across the observer’s
meridian then decrease in altitude until they set in the west. A star will
follow a small circle parallel to the celestial equator in the arrow’s
direction. Such a circle (UXV in the diagram) is called a parallel of
declination and provides us with one of the two coordinates in the
equatorial system [12,14].
The declination, (δ), of the star is the angular distance in degrees
of the star from the equator along the meridian through the star. It is
measured north and south of the equator from 0° to 90°, being taken to be
positive when north [12,14]. The declination of the celestial object is thus
analogous to the latitude of a place on the Earth’s surface, and the latitude
of any point on the surface of the Earth when a star is in its zenith is equal
to the star’s declination.
A quantity called the north polar angle of the object, is the arc
PX. Obviously, [14]
north polar angle = 90° − declination angle
The second coordinate is the angle ZPX is called the hour angle, H,
of the star and is measured from the observer’s meridian westwards
(for both north and south hemisphere observers) to the meridian through
the star from 0h to 24h or from 0° to 360°. Consequently, the hour angle
increases by 24h each sidereal day for a star [12,14].
If a point ( ), fixed with respect to the stellar background, is
chosen on the equator, its angular distance from the intersection of the
meridian through (X) and the equator will not change in contrast to the
changing hour angle of (X). In general, all objects may then have their
positions on the celestial background specified by their declinations and by
the angles between their meridians and the meridian through ( ).
22
Chapter two Coordinate Systems and The Moon Coordinate The point chosen is the vernal equinox, also referred to as the First Point of
Aries, and the angle between it and the intersection of the meridian through
a celestial object and the equator is called the right ascension (α) or RA of
the object. Right ascension is measured from 0h to 24h or from 0° to 360°
along the equator from ( ) eastwards; that is, in the direction opposite to
that in which hour angle is measured. This definition again holds for
observers in both northern and southern hemispheres [12,14].
Astronomers use the right ascension declination system to
catalog star positions accurately. Because of the enormous distances to the
stars, their coordinates remain essentially unchanged even when viewed
from opposite sides of the earth' s orbit around the Sun. Only few stars are
close enough to show a measurable parallax between observations made 6
months apart [8].
2.1.3. The Ecliptic System
This system is especially convenient in studying the movements
of the planets, asteroids and in describing the Solar System. The orbits of
the planets in the Solar System, except of Pluto, lie within 7° of ecliptic
plane.
When the Sun is observed over a long period of time, it is found
to possess a second motion in addition to its apparent diurnal movement
about the Earth. It moves eastwards among the stars at about 1°/day,
returning to its original position in one year. Its path is a great circle called
the ecliptic which lies in the plane of the Earth’s orbit about the Sun. This
great circle is the fundamental reference plane in the ecliptic system of
coordinates. It intersects the celestial equator in the vernal and autumnal
equinoxes (First Point of Aries
and Libra ♎ ) [12].
23
Chapter two Coordinate Systems and The Moon Coordinate The two quantities specifying the position of an object on the
celestial sphere in this system are ecliptic longitude and ecliptic latitude. In
figure (2.4) a great circle arc through the pole of the ecliptic (K) and the
celestial object (X) meets the ecliptic in the point (D). Then the ecliptic
longitude, (λ), is the angle between ( ) and (D), measured from 0° to 360°
along the ecliptic in the eastwards direction, which is in the direction in
which right ascension increases. The ecliptic latitude, (β), is measured from
(D) to (X) along the great circle arc DX, being measured from 0° to 90°
north or south of the ecliptic. It should be noted that the north pole of the
ecliptic, (K), lies in the hemisphere containing the north celestial pole [12,14].
The point of intersection the celestial equator and the ecliptic
plane is often referred to as the ascending node, since an object travelling
in the plane of the ecliptic with the direction of increasing right ascension
(eastwards) passes through Aries ( ) from southern to northern declinations.
By similar reasoning, Libra (♎) is called the descending node [14].
The origins most often used with this system of coordinates are
the Earth’s centre and the Sun’s centre since most of the planets move in
planes inclined only a few degrees to the ecliptic. This system is
particularly useful in considering interplanetary missions [12].
Figure (2.4): Ecliptic coordinates [14].
24
Chapter two Coordinate Systems and The Moon Coordinate 2.2. Transformation Of One Coordinate System Into Another
It is often required to convert from the system to another. This
may be achieved by using the equation below:
1- For the transformation from equatorial into ecliptical coordinates
(β, λ), the following formulae can be use.
sin β = sin δ cos ε – cos δ sin ε sin α
(2.1)
and
sin
sin λ
cos sin
sin cos
2.2
If substitute equation (2.1) in (2.2), we can find formula
independent on (β)
tan
where (
sin cos
tan sin
cos
2.3
is the obliquity angle
2- For transformation from ecliptical into equatorial coordinates (α, δ),
the following formulae was used.
tan α = (sin
cos ε – tan β sin ε ) / cos
(2.4)
and
sin δ = sin β cos ε + cos β sin ε sin
(2.5)
3- Calculation the local horizontal coordinates (A, al) of any sky body
from its equatorial coordinate is made using the following formula:
tan A = sin H / (cos H sin
sin al = sin
where (
sin δ + cos
– tan δ cos )
cos δ cos H
(2.6)
(2.7)
is the observer latitude.
25
Chapter two Coordinate Systems and The Moon Coordinate 2.3. Date And Julian Date
2.3.1. Computation Of Julian Date (JD) From Calendar Date
The irregularities in the present calendar (unequal months, days
of the week having different dates from year to year) and the changes from
the Julian to the Gregorian calendar make it difficult to compare lengths of
time between observations made many years apart. In the observations of
variable stars, it is useful to be able to say that the moment of observation
occurred so many days and fractions of a day after a definite epoch. The
system of Julian Day Numbers was introduced to reduce computational
labour in such problems and avoid ambiguity [12,14].
January 1st of the year 4713 BC was chosen as the starting date,
time being measured from that epoch (mean noon on January 1st, 4713 BC)
by the number of days that have elapsed since then [12,14,19]. The Julian
Date is given for every day of the year in The Astronomical Almanac.
Tables also exist for finding the Julian Date for any day in any year. Time
may also be measured in Julian centuries, each containing exactly 36525
days.
Orbital data for artificial Earth satellites are often referred to
epochs expressed in Modified Julian Day Numbers in which the zero point
in this system is 17·0 November, 1858. Hence [12,14]
Modified Julian date = Julian date – 2400000·5 days.
The program must then start with a procedure separating the
numbers YYYY, MM and DD.dd = day + U.T / 24 and U.T in hours.
In what follows, we will suppose that this separation has been
performed.
26
Chapter two Coordinate Systems and The Moon Coordinate If MM is greater than 2, take
y = YYYY
and m = MM
If MM = 1 or 2, take (to solve February month problem)
y = YYYY – 1
and m = MM + 12.
If the number YYYY MM DD is equal or larger than 1582 10 15
(that is, in the Gregorian calendar), calculate
AJ = INT ( y / 100 )
BJ = 2 – AJ + INT (AJ / 4)
If YYYY.MMDDdd < 1582.1015, it is not necessary to calculate
AJ and BJ.
The required Julian Day is then [18,19,34,35]
JD =INT(365.25 y)+INT(30.6001 (m + 1))+DD.dd+1720994.5+BJ
(2.8)
We denote by T the number of Julian centuries elapsed since
midday of beginning of 1st January 1900 [34,35]:
JD
2415020 /36525
2.9
And after year 2000 the following formula can be used [36]
JD
2451545 /36525
2.10
2.3.2. Compute Of The Calendar Date From JD
The following method is valid for positive as well as for negative
years, but not for negative Julian Day numbers [18,19,34,37].
Add 0.5 to the JD, and let (Z) be the integer part, and (CC) the
fractional (decimal) part of the result.
Z = INT (JD + 0.5)
CC = (JD + 0.5) – Z
If Z < 2299161, take EC = Z
27
Chapter two Coordinate Systems and The Moon Coordinate If Z is equal to or larger than 2299161, then calculate
FC = INT ((Z – 1867216. 25 ) / 36524.25 )
EC = Z + 1 + FC – INT (FC / 4 )
Then calculate
GC = EC + 1524
INT
I
G
122.1
365.25
JC = INT (365.25 IC)
INT
K
G –J
30.6001
The day of the month (with decimals) is then
LC = GC – JC – INT (30.6001 KC) + CC
The month number (MC) is KC – 1
KC – 13
if KC < 13.5
if KC > 13.5
The year (YC) is IC – 4716
if MC > 2.5
IC – 4715
if MC < 2.5
The day in month is DC = INT (LC)
The hours in the day is HC = INT ((LC – DC) 24)
The day of the week corresponding to a given date can be obtained as
follows.
Compute the JD for that date at 0h, add 1.5 and divide the result
by 7. The remainder of this division will indicate the weekday, as follows:
if the remainder is 0, it is a Sunday, 1 a Monday, 2 a Tuesday, 3 a
Wednesday, 4 a Thursday, 5 a Friday and 6 a Saturday.
28
Chapter two Coordinate Systems and The Moon Coordinate 2.4. Calculating The Julian Day For The Crescent Moon
We can find the JD for crescent moon using the equation:
[18,19,34]
JDm = 2415020.75933 + 29.53058868K + 0.0001178T'2 – 0.000000155T'3
+ 0.00033 sin (166°.56 + 132°.87T' – 0°.009173T'2
(2.11)
These instants are expressed in Ephemeris Time (Julian
Ephemeris Days). In the formula above, an integer value of k gives a New
Moon, an integer value increased by:
0.25 gives a First Quarter,
0.50 gives a Full Moon,
0.75 gives a Last Quarter
An approximate value of K is given by
K = (year – 1900) × 12.3685
Where the "year" should be taken with decimals and T' is the
time in Julian centuries from 1900 January 0.5, which calculated with a
sufficient accuracy from
T' = K / 1236.85
To obtain the time of the true phase, the following corrections
should be added to the time of the mean phase given by (2.11).
The following coefficients are given in decimals of a day, and smaller
quantities have been neglected [19,34].
For New and Full Moon :
+ (0.1734 – 0.000393 T') sin Ms + 0.0021 sin 2Ms – 0.4068 sin Mm
+ 0.0161 sin 2Mm – 0.0004 sin 3Mm + 0.0104 sin 2Fm – 0.0051 sin (Ms + Mm)
– 0.0074 sin (Ms – Mm) + 0.0004 sin (2Fm + Ms) – 0.0004 sin (2Fm – Ms)
– 0.0006 sin (2Fm + Mm) + 0.0010 sin (2Fm – Mm) + 0.0005 sin (Ms + 2Mm)
29
Chapter two Coordinate Systems and The Moon Coordinate For First and Last Quarter :
+ (0.1721 – 0.0004 T') sin Ms + 0.0021 sin 2Ms – 0.6280 sin Mm
+ 0.0089 sin 2Mm – 0.0004 sin 3Mm + 0.0079 sin 2Fm – 0.0119 sin (Ms + Mm)
– 0.0047 sin (Ms – Mm) + 0.0003 sin (2Fm + Ms) – 0.0004 sin (2Fm – Ms)
– 0.0006 sin (2Fm + Mm) + 0.0021 sin (2Fm – Mm) + 0.0003 sin (Ms + 2Mm)
+ 0.0004 sin (Ms – 2Mm) – 0.0003 sin (2Ms + Mm)
And, in addition:
for First Quarter: + 0.0028 – 0.0004 cos Ms + 0.0003 cos Mm
for Last Quarter : – 0.0028 + 0.0004 cos Ms – 0.0003 cos Mm
Where:
Sun's and Moon's mean anomaly (Ms, Mm) at time JD for year
1900 A.D as a function (K,T') are calculated as [18,19,34]:
Ms = 359.2242 + 29.l0535608 K – 0.0000333 T'2 – 0.00000347 T'3
Mm = 306.0253 + 385.81691806 K + 0.0107306 T'2 + 0.00001236 T'3
Moon's argument of latitude as a function (K,T')
Fm = 21.2964 + 390.67050646 K – 0.0016528 T'2 – 0.00000239 T'3
Which are expressed in degrees and decimals and may be
reduced to the interval (0 – 360) degrees.
2.5. Moon Ecliptical Coordinate :
The ecliptical coordinate of the Moon which considered actual
coordinate can be computed by an empirical formula.
The Moon's longitude is given by [21]:
λm = 218.32 + 481267.883T + 6.29 sin (134.9 + 477198.85T)
– 1.27 sin (259.2 – 413335.38T) + 0.66 sin (235.7 + 890534.23T)
+ 0.21 sin (269.9 + 954397.7T) – 0.19 sin (357.5 + 35999.05T)
– 0.11 sin (186.6 + 966404.05T)
(2.12)
30
Chapter two Coordinate Systems and The Moon Coordinate The Moon's latitude is given by:
βm = 5.13 sin (93.3 + 483202.03T) + 0.28 sin (228.2 + 960400.87T)
– 0.28 sin (318.3 + 6003.18T) – 0.17 sin (217.6 – 407332.2T)
(2.13)
Where T is the number of centuries since J2000 which is calculated
from equation (2.10).
The Moon ecliptical coordinate also calculated using J. Meeus
method [34] and the results are in a good agreement with above method.
2.6. Calculating The Moon Distance
The Moon's distance from the centre of the Earth can be
calculated as the following [36]:
Rm= 385000 – 20905 cos l – 3699 cos (2Dd – l) – 2956 cos 2Dd
– 570 cos (2l) + 246 cos (2l – 2Dd) – 152 cos (l + l' – 2Dd) (km)
(2.14)
Where: the Moon's mean anomaly is (l), the Sun's mean anomaly is (l')
and the difference between the mean longitudes of the Sun and the Moon is
(Dd) , which are functions of Julian centuries (T2000) and calculated as [36]:
l = 134°.96292 + 477198°.86753 T
l' = 357°.52543 + 35999°.04944 T
Dd = 297°.85027 + 445267°.11135 T
2.7. Moon Coordinate Conversion
The Moon elliptical coordinates which are computed using the
equations (2.12) and (2.13), must be converted to equatorial coordinate
using equations (2.4) and (2.5). The equatorial coordinate can be converted
to the horizontal coordinate using equations (2.6) and (2.7) to know Moon's
position in sky in observer region on Earth surface and to compare with the
theoretical model with the observation of the Moon.
31
Chapter two Coordinate Systems and The Moon Coordinate The position components distance in cartesian coordinate can be
calculated using equatorial coordinate as the following [38]:
Rx = Rm cos δ cos α
Ry = Rm cos δ sin α
Rz = Rm sin δ
The distance of the Moon from the Earth centre can be found as [35]:
2.8. Calculating The Moon Velocity Component
The velocity component can be determined from the following
formula:
∆
∆
∆
Where ∆ =
which can be choose 1day or less, and the
total velocity is found as [35]:
32
Chapter Three
TWO BODY
PROBLEM
WITHOUT
PERTURBATION
Chapter three Two Body Problem Without Perturbation 3.1. Introduction
Galileo showed that the Ptolemaic theory failed as an adequate
description of planetary geocentric phenomena, by his telescope
observations. The Copernican System was able to accept the new
discoveries regarding the phases of Venus. At that time no one, was able as
yet to give any explanation of why the motion of the planets were as
observed or why the Moon revolved about the Earth. Half a century had to
pass before the explanation was given by Isaac Newton (1642–1727 AD).
His work was built on the foundations laid by Tycho Brahe (1546–1601 AD),
Johannes Kepler (1571–1630 AD) and Galileo Galilei (1564–1642 AD).
Kepler studied the mass of observational data on the planets
positions collected by Brahe, formulated the three laws of planetary motion
forever associated with his name. They are:
(1) The orbit of each planet is an ellipse with the Sun at one focus.
(2) For any planet the radius vector sweeps out equal areas in equal times.
(3) The cube of the semi-major axis of the planetary orbit is proportional
to the square of the planet period of revolution.
Kepler’s laws are still very close approximations to the truth.
They hold not only for the system of planets moving about the Sun but also
for the various systems of satellites moving about their primaries. Only
when the outermost retrograde satellites in the Solar System are considered,
or close satellites of a non-spherical planet.
The mathematical expression of Kepler’s second law can be written as
1
2
1
2
Where (r1, r2) are the distance between two body at different time and
(θ1, θ2) are the angular distance at time (t).
34
Chapter three Two Body Problem Without Perturbation But (θ/t) is the angular velocity (ωv) in the limit when (t) tends to zero.
Hence,
1
2
1
2
3.1
As shown in figure (3.1.), in order that this law is obeyed, the
planet has to move faster when its radius vector is shorter, at perihelion (rp),
and slower when it is at aphelion (ra):
Where
rp = a (1 – e)
and
ra = a (1 + e)
(3.2)
Where (a) is a semi-major axis of the orbit [14,39] and,
(e) is a eccentricity of the orbit which defined by the relation [14]
3.3
Also [39]
a
A'
b
C
S
A
rp
ra
Figure (3.1.): An orbital ellipse.
In the third law, Kepler obtained a relationship between the sizes
of planetary orbits and the periods of revolution. Now it happens that the
semi-major axis of a planetary orbit is the average size of the radius vector,
or the mean distance, so that an alternative form of the third law is to say
that the cube of the mean distance of a planet is proportional to the square
of its period of revolution.
35
Chapter three Two Body Problem Without Perturbation Hence, if (a) and (T) refer to the semi-major axis and sidereal
period of a planet (P) moving about the Sun, then
Or
3.4
2
Where (µ) is G(M + m) and (M, m) are the masses of the Sun and planet
respectively and (G) is the universal gravitational constant.
Let two planets revolve about the Sun in orbits of semi-major
axis (a1) and (a2), with periods of revolution (T1) and (T2). Let the masses
of the Sun and the two planets be (M, m1 and m2) respectively, then by
equation (3.4),
2
2
Where µ1 = G(M + m1)
And
µ2 = G(M + m2)
Hence,
Where the mass of the Sun M >> m1 or m2 then Kepler’s third
law would have been written as:
36
Chapter three Two Body Problem Without Perturbation Newton’s law of universal gravitation is the basis of celestial
mechanics - that branch of astronomy dealing with the orbits of planets and
satellites the branch of dynamics that deals with the orbits of space probes
and artificial satellites. The law is stated: Every particle of matter in the
universe attracts every other particle of matter with a force directly
proportional to the product of the masses and inversely proportional to the
square of the distance between them.
Hence, for two particles separated by a distance (r), is
3.5
Where (F) is the force of attraction, (m1 and m2) are the masses
and (G) is the constant of proportionality, often called the universal
constant of gravitation, which equal 6.67
6.672
10
⁄
.
10
.
⁄
[14] or
[17,39,40,41].
3.2. Equations Of Motion
The two-body problem, was first stated and solved by Newton.
Given at any time the positions and velocities of two massive particles
moving under their mutual gravitational force, the masses also being
known, provide a means of calculating their positions and velocities for any
other time.
At any moment, the velocity vector of one of the masses relative
to the other, and the line joining them, defines a plane. The gravitational
force between the bodies acts along the line joining them.
Let the two particles be (P1 and P2) of masses (m1 and m2), and
with coordinates (x1, y1) and (x2, y2) with respect to the axes (Ox' and Oy').
The distance (r) is:
37
Chapter three Two Body Problem Without Perturbation The magnitude of the force of gravity (F) is given by equation (3.5) as
Consider particle (P1). It is attracted towards (P2), experiencing
an acceleration which can be thought of as resolved into components
(d2x1/dt2) and (d2y1/dt2) along the (Ox' and Oy') axes respectively. The
force (F) can similarly be resolved into components along the (Ox' and Oy')
axes. In the case of particle (P1), the force acts from (P1 to P2) so that for
(P1), the components are:
Y'
Y
(x2,y2)
(x,y)
m2
P2
r
m1
X
P1(x1,y1)
O
X'
Figure (3.2): The two-body problem presented in a rectangular coordinate frame.
And
respectively, since for (P2) the force acts from P2 to P1.
By Newton’s laws first and second (
), the first particle (P1)
written as:
(3.6)
38
Chapter three Two Body Problem Without Perturbation It is called differential equations of motion of particle (P1).
For the second particle (P2), we have
(3.7)
By dividing both sides of equations (3.6) and (3.7) on (m1 and m2) one has:
(3.8)
Subtracting the first equation from the second, one obtains:
0
3.9
If we take a set of axes (P1x, P1y) through (P1) and the origin,
with (P1x and P1y) parallel to (Ox' and Oy') respectively, we see that the
coordinates (x) and (y) of (P2) with respect to these new axis are given by
x = x2 − x1
;
y = y2 − y1.
Letting µ = G(m1 + m2) then equation (3.8) may be written as:
0
3.10
By treating second part of equations (3.6) and (3.7) in a similar
fashion, we are led to the equation:
0
3.11
In general the equation of motion can be written for the center of
mass as [12,42,43]:
0
39
3.12
Chapter three Two Body Problem Without Perturbation 3.3. The Solution Of The Two-Body Problem
The solution of (3.12) may be written as (see appendix A)
⁄
3.13
1
Where (e) is the eccentricity of the orbit and (f) is the true anomaly and (h)
is a constant which is twice the rate of description of area by the radius
vector, the relation can write as [12,27,43,44,45]:
2
Where (a and b) is the semi major and semi minor axis.
Equation (3.13) is the polar equation of a conic section. By
obtaining this solution, Newton generalized Kepler’s first law, for a conic
section can not only be an ellipse but also a parabola or a hyperbola.
3.4. The Energy Integral
If we multiply equations (3.10) by (dx/dt) and (3.11) by (dy/dt) and
add, we obtain the relation.
0
3.14
Now
1
2
1
2
Also, r2 = x2 + y2 , so that
2
giving
40
2
Chapter three Two Body Problem Without Perturbation Hence, equation (3.14) may be written as a perfect differential, namely
1
2
1
2
0
Integrating, we obtain [12,14,46]
1
2
3.15
Where (C) is the called energy constant and (V) is the velocity of
one mass with respect to the other, and we can benefit from it to determine
the shape of the orbit as [27]:
C < 0 , the orbit is ellipse
C = 0 , the orbit is parabola
C > 0 , the orbit is hyperbola
The term,
, is the kinetic energy per unit mass, energy the
planet possesses in its orbit about the Sun by virtue of its speed. The term,
(−µ/r) ,is the potential energy, energy the planet possesses by virtue of its
distance from the Sun.
Equation (3.15) states are that the sum of these two energies is a
constant, a reasonable statement since the two-body is an isolated system,
no energy being injected or removed from system. In an elliptic orbit, the
distance (r) is changing and it shows that there is a continual trade-off
between the two energies: when one is increasing, the other is decreasing.
If we wish to obtain an expression giving the velocity (V) of the planet, we
must interpret the constant (C) [14].
41
Chapter three Two Body Problem Without Perturbation 3.5. The Velocity Of a Planet In Its Orbit
Let (P) be the position of a planet in its elliptical orbit about the
Sun (S) at a given time when its velocity is (V) and its radius vector (SP)
has distance (r) from focus to point present body (see figure 3.3).
Let (VP, VA) be the velocities at perihelion (A) and aphelion (A')
respectively. The points (A, A') are the only places in the orbit where the
velocity is instantaneously at right angles to the radius vector and where,
consequently, we may write
V = rωv
(3.16)
Where (ωv) is the angular velocity.
At every point Kepler’s second law holds, namely that
r2 ωv = h
(3.17)
Hence, at perihelion and aphelion only, we have V = h/r
For perihelion,
VP = h / a(1 – e)
For aphelion,
VA = h / a(1 + e)
So that
1
1
3.18
Now the energy equation (3.15) is:
1
2
P
V
A'
VP
r
f
Ce
S
A
VA
Figure (3.3.): The velocity of a planet in an elliptical orbit showing that at perihelion
A and aphelion A' the velocity vector is perpendicular to the radius vector.
42
Chapter three Two Body Problem Without Perturbation So that at perihelion, we have
1
2
1
1
2
1
3.19
While at aphelion,
3.20
Subtracting equation (3.20) from equation (3.19) and using
relation (3.17) to eliminate (VA),
We obtain
1
1
3.21
1
1
3.22
In similar fashion, we obtain
Again, equations (3.21) and (3.22) give
VAVP = µ/a
(3.23)
Subtracting equation (3.19) from equation (3.20) and using (3.21)
to eliminate (VP), we obtain, after a some reduction, the required relation [12].
3.24
3.6. The Orbital Element
In three-dimensional spaces, it takes three parameters each to
describe position and velocity. Therefore, any element set defining an
object's orbital motion requires at least six parameters to fully describe
dynamics of orbital motion. There are different types of element sets,
depending on the use. The Keplerian, or classical, element set is useful for
space operations and tells us four parameters about orbits, namely [41]:
43
Chapter three Two Body Problem Without Perturbation • Orbit size
• Orbit shape
• Orientation - orbit plane in space
• Orbit within plane
And the following six quantities are called the orbital elements:
(figure 3.4.) [10,47]
ƒ Semi-major axis (a): it is distance between the geometric center of the
orbital ellipse and the perigee passing through the focus of center
mass.
The value of (a) depend on the type of conic, where
a=∞
for parabola orbit
0<a<∞
for ellipse orbit
-∞ < a < 0
for hyperbola orbit
ƒ Inclination (i): the angle between the main plane and body's plane.
ƒ Longitude of the ascending node (Ω): the angle between the vernal
equinox vector (γ) and the line of ascending node therefore, it is called
right ascension of ascending node.
p
m
f
E
a
ω
Ω
Earth Equatorial plane
i
n
Moon orbital plane
Figure (3.4.): The orbital elements.
44
Chapter three Two Body Problem Without Perturbation ƒ Argument of the perigee (ω): the angle from the ascending node to
the line between the center and perigee.
ƒ Time of the perigee passage (tp): it is the time which the body passes
in the perigee.
ƒ Eccentricity (e): the parameter describes how flattened or the ellipse
is compared with a circle. Or how elongated the ellipse. It is defined
by the relation (3.3)
In any way the eccentricity gives the shape of orbit (see figure 3.5.)
e=0
for circler orbit
0<e<1
for ellipse orbit
e=1
for parabola orbit
1<e<∞
for hyperbola orbit
e<1
e=0
e=1
e>1
Figure (3.5.): The shape of the orbit for different values of the eccentricities.
Table (3.1) summarizes the Keplerian orbital element set, and
orbit geometry and its relationship to the Earth.
45
Chapter three Two Body Problem Without Perturbation Table (3.1) Classical orbital elements [41].
Elements Description
Definition
Remarks
Semi-major
Half of the long axis Orbital period and energy
Orbit size
axis
of the ellipse
depend on orbit size
Ratio of half the
Closed orbit 0 ≤ e < 1
Eccentricity Orbit shape focus separation (c) to
Open orbit 1 ≤ e
the semi-major axis
Angle between the
orbital plane and
Equatorial i = 0 or 180
Orbital
equatorial plane,
Prograde
0 ≤ i < 90
Inclination
planes tilt
measured
Polar
i = 90
counterclockwise at Retrograde 90 ≤ i < 180
the ascending node
Right
Orbital
Angle measured
0 ≤ Ω < 360
ascension of planes rotates eastward from the
Undefined when i = 0 or 180
ascending
about the vernal equinox to the
Equatorial orbit
node
earth
ascending node
Angle measured in
0 ≤ ω < 360
Orbit
the direction of object
Argument of
Undefined when i = 0 or 180
orientation in orientation from the
perigee
Or e = 0 circular orbit
orbital plane ascending node to
perigee
Angle measured in
0 ≤ f < 360
Object
True
the object motion,
Undefined when e = 0
location in its
anomaly
from perigee to object
Circular orbit
orbit
location
3.7. The Period Of Revolution Of a Planet In Its Orbit
Let us suppose the orbit to be circular so that (r = a). Then expression
(3.24) becomes
V2 = µ/a
(3.25)
But V = 2π / T
Where (T) is the time it takes the planet to describe its circular orbit,
which calculated as equation (3.4) [14].
In other way we can find the period of the rotation using mean
motion (n), where [45]
46
Chapter three Two Body Problem Without Perturbation 3.26
Hence
2
3.27
If we consider (tp) time of passing the object in perigee, the mean
anomaly in any time is:
(3.28)
And we can calculate the eccentric anomaly for the orbit as [43,46]:
(3.29)
yw
the auxiliary circle
a
r
o E
a
f
xw
ae
the orbit of body's motion
Figure (3.6.): The geometry of an elliptical orbit.
This equation is called Kepler equation, although its looks as
simple equation but its solved using numerical methods [27].
To find the cartesian coordinate (xw and yw) to the Moon in his
orbit, which is illustrated in figure (3.6.) as:
47
Chapter three Two Body Problem Without Perturbation cos
cos
sin
cos
sin
1
sin
and the displacement radius (r) will be [40,43,44,48]:
1
e cos
(3.30)
By direct differentiation for (xw and yw) one obtains:
cos
sin
√
sin
sin
sin
1
cos
1
cos
cos
sin
(3.31)
Or
V
√
sin
The conversion of position and velocity of the Moon from this
orbital plane to the Earth equatorial plane can be utilized by Gaussian
vector (conversion matrix), which content Eular angle [8,27,44,49].
Where R-1 is the inverse of Gauss matrix
48
Chapter three Two Body Problem Without Perturbation The elements are:
cos
cos Ω
sin
sin Ω cos
cos
sin Ω
sin
cos Ω cos
sin
sin
sin
cos Ω
cos
sin Ω cos
sin
sin Ω
cos
cos Ω cos
cos
sin
sin Ω sin
cos Ω sin
cos
Thus
Also
49
Chapter three Two Body Problem Without Perturbation 3.8. The Orientation Of The Orbital Plane
represents angular momentum of the orbit, and it
The vector
is vertical vector to the orbital plane which contains position vector
velocity vector
and
.
In cartesian coordinates
can be calculated as follows [35,36,39,44]:
Hence
And
3.9. Calculating The Orbital Elements
The elliptical orbital elements in general are (i, Ω, ω, a, e, M) can
be calculated from the component of position, velocity and angular
momentum as follows :
a-
The inclination (i) of the orbit from the equatorial plane is
given by [36,44,49]:
tan
3.32
Or as [12,28,35,50]:
cos
50
Chapter three b-
Two Body Problem Without Perturbation The longitude of ascending node (Ω) is calculated as
[28,36,44,49]:
tan
c-
3.33
The argument of perigee (ω) can be found as [2,36,51]:
(3.34)
Where ( ) is the true anomaly and ( ) is argument of the latitude [36]
tan
Or as [35]:
cos
d-
1
cos Ω
sin Ω
,
sin
The semi-major axis (a) of the orbit calculated as:
2
e-
1
sin
3.35
The eccentricity (e) of the orbit is calculated as [44,49]:
3.36
1
Or as:
1
f-
√
The eccentric anomaly (E) is calculated as [44,49]:
tan
1
3.37
51
Chapter three g-
Two Body Problem Without Perturbation The mean anomaly (M) is calculated as [44,49]:
3.38
√
h-
The true anomaly ( ) is calculated as [36,44,49,52]:
sin
√1
cos
tan
3.39
Or as:
tan
2
1
1
tan
2
3.10.Solution Of Kepler's Equation
The equation of Kepler (3.29) has incompletely solution
[17,34,53]
E = M + e sin E
Where (e) is the eccentricity of the orbit, (M) the mean anomaly
at a given instant, and (E) the eccentric anomaly. Generally, (e) and (M) are
given, and the equation must be solved for (E). The eccentric anomaly (E)
is an auxiliary quantity which is needed to find the true anomaly (f). The
above equation cannot be solved directly. There are some methods for
finding (E), and finally a formula which gives an approximate result.
a. First method
It uses the angles (M) and (E) in degrees, and multiply (e) by
(180/π) to convert from radians into degrees which is denoted by (e0).
Kepler's equation is then [12,28,35]
E = M + eo sin E
sin
52
(3.40)
Chapter three Two Body Problem Without Perturbation To solve equation (3.40), an approximate value to (E) should be
given. Then the formula will give a better approximation for (E). This is
repeated until the required accuracy is obtained. For the first
approximation, use E = M
We thus have
Eo= M
El = M + eo sin Eo
E2 = M + eo sin El
E3 = M + eo sin E2
etc.
Ei+1 = M + eo sin En
Where El , E2 , E3, etc. are successive and better approximations
for the eccentric anomaly (E). This method is simple, and it is accurate
when (e) is small.
b. Second method
When (e) is larger than 0.4 or 0.5, the convergence may be so
slow that a better iteration formula should be used a better value (El for E)
is [12,28,35].
1
or
1
Where (Eo) is the last obtained value for (E). In this formula, all
quantities are expressed in degrees. It is important to note that the
numerator of the fraction contains the eccentricity (eo) defined before,
while the denominator contains the ordinary eccentricity (e).
Here, again, the process can be repeated as often as is necessary.
53
Chapter three Two Body Problem Without Perturbation c. Third method
The formula [34]
tan
sin
cos
Gives an approximate value for (E), and is valid only for small values of
the eccentricity.
d. Fourth method [44,52]
Find the root of equation (3.29)
sin
Find the derivative of equation (3.29) with respect to Ei
1
cos
Apply Newton-Raphson method base in approximately
∆
Determine a new (E) from
∆
Continue the repetition until |∆ |
where
is a small
constant appropriately chosen to correspond to the extent of precision
desired in the calculation.
54
Chapter Four
PERTURBATIONS
Chapter four Perturbations 4.1. Introduction
Perturbation theory is a very broad subject with applications in
many areas of the physical sciences. Indeed, it is almost more a philosophy
than a theory. The basic principle is to find a solution to a problem that is
similar to the one of interest and then to cast the solution to the target
problem in terms of parameters related to the known solution. Usually
these parameters are similar to those of the problem with the known
solution and differ from them by a small amount. The small amount is
known as a perturbation and hence the name perturbation theory [33].
The expression "perturbed motion" implies that there is an
unperturbed motion. In Celestial Mechanics the unperturbed motion is the
orbital motion of two spherically symmetric bodies represented by the
equation of motion (3.11) [28,41]. The constant (µ) is the product of the
constant of gravitation and the sum of the masses of the two bodies
considered. The numerical value and unite of (µ) thus depends on the
concrete problem and on the system of units chosen.
The perturbed motion of a celestial body is defined as the
solution of an initial value problem as [28,33,47,54,55]:
∆
The term
and ∆
4.1 in equation (4.1) is called "the two-body term",
the perturbation term which is the summation of other external
force. If the acceleration is a constant, then the solution to the equations of
motion will be the solution to the two-body problem. If the perturbation
term is considerably smaller than the two-body term [28,33], then. ∆
56
Chapter four Perturbations Then
the
differential
equation
system
(4.1)
is
called
"the perturbation equations". Every method for solving this problem is
called a "perturbation solution method".
In Celestial Mechanics one usually makes the distinction between
• General Perturbation Methods, seeking the solution in terms of series
of elementary integrable functions.
• Special Perturbation Methods, seeking at some stage the solution by
the methods of numerical integration.
For general perturbation methods, it is mandatory not to use the
original equations of motion (4.1) in rectangular coordinates, but to derive
differential equations for the osculating orbital elements or for functions
thereof. This procedure promises to make the best possible use of the
(analytically known) solution of the two-body problem (3.11), because the
osculating elements are so-called first integrals of the two-body motion.
Special perturbation methods may be applied directly to the initial value
problem or to the transformed equations for the osculating elements. Both,
general and special perturbation methods provide approximate solutions of
the equations of motion [28,41].
4.2. Orbit Perturbations
There are two categories of motion under the influence of
perturbative forces: special perturbations and general perturbations. The
methods of general perturbations are used to calculate the effect of
perturbative forces on the orbital parameters. Analytical integration of
series expansions of the perturbative accelerations are carried out to
calculate these changes over long periods of time. The methods of special
perturbations entail the step-by-step numerical integration of the equations
of motion and provide the desired short term solutions for the in orbit
position [56].
57
Chapter four Perturbations These perturbing forces can be classified, based on their effect on
an object's Keplerian orbital elements vs time as be illustrated in figure
(4.1.). Secular variation represents a linear change with extremely long
effect time relative to the period. Short-period variations are periodic with a
period of less than or equal to the orbit period. Long-period variations are
also periodic, but have a period greater than the orbit period [47,50].
Figure (4.1.): Secular and periodic variations of an orbital element [47,50].
The common forces, which perturb an object's orbit, are listed
below and will be discussed in the following sections:
ƒ Atmospheric drag
ƒ Non-spherical Earth (Oblateness)
ƒ Solar Radiation Pressure (SRP)
ƒ Third body attractions (such as the Sun)
ƒ Other perturbation forces
The above perturbing forces have different effects and intensities,
depending on the position of the object in space (its orbital elements
according to the appropriate reference frame) and also the position of the
object at a particular point in its orbit.
58
Chapter four Perturbations 4.2.1.
Atmospheric Drag
Although the atmosphere at hundreds kilometers altitude is
extremely thin, during the impact between the high speed satellite and the
atmosphere particles, momentum transfer happens, accumulates and affects
satellites motion greatly. This process generates atmospheric drag which is
nonconservative.
The derivation of a mathematical model of atmospheric drag is
based on the following assumptions [47]:
• The momentum of particles hitting at the surface is totally lost to
the surface.
• The mean thermal motion of the atmosphere is much smaller than
the speed of the object as relative to the local atmosphere.
• For spinning vehicles, the relative motion between surface elements
is much smaller than the speed of the mass center.
The magnitude of the drag force can be stated as [12,41,46,56]:
1
2
4.2
The negative sign indicates that the acceleration is in a direction
opposite to this unit vector. And (ρ is the atmospheric density, (CD) is the
drag coefficient, has a value between 1 and 2. It takes a value near 1 when
the mean free path of the atmospheric molecules is small compared with
the satellite size, and takes a value close to 2 when the mean free path is
large compared with the size of the satellite, (m) is the mass of the satellite,
(V) is the velocity of the satellite relative to the atmosphere and (Aa) is the
effective surface area which equal Aa = Ao cos ζ .
Where (Ao) is the local surface area and (ζ) is the angle between
surface normal direction and velocity direction.
59
Chapter four Perturbations Atmospheric drag is the most complex and the most difficult of
the important artificial satellite perturbations because the function from of
the force law is not known and the atmosphere is variable [41]. Elements
such as the atmospheric composition, temperature and density of the
atmosphere are strongly related to the solar cycle. The Sun, having an
eleven-year Sunspot activity cycle, causes the most uncontrolled re-entry of
spacecraft to occur at its peak. This occurs because as the Sunspot activity
peaks, it correlates with an increase in atmospheric density, which
amplifies the effect of atmospheric drag on a spacecraft.
An important factor that determines the intensity of drag
perturbation is the spacecraft's coefficient of drag, (CD). The (CD) describes
the molecular interaction between the atmosphere and the spacecraft's
surfaces. The smaller the coefficient, the more aerodynamic the vehicle and
the less intense the effect of atmospheric drag when compared with a
spacecraft of a large coefficient of drag. Other factors that describe the
level of intensity of drag on a spacecraft are the material and temperature of
the vehicle's surfaces, along with their orientation with respect to the
oncoming atmospheric particles [50].
Atmospheric drag is an important concern for satellites in the
Low Earth Orbit (LEO) region. At altitudes above LEO, drag due to the
atmosphere becomes less problematic as its influence decays significantly
with increasing altitude. The density of the upper atmosphere can be
modeled by a simple analytical equation if the following assumptions are
made [50]:
• The Earth is spherically symmetric.
• The scale height is constant over the altitudes of interest.
• There is no time variation in the density.
60
Chapter four Perturbations A simplified useful approximation for the atmospheric density is
given by the barometric formula [46,54]:
Where (ρo) is the density of the air at the surface of the Earth,
(Batm) is called the barometric coefficient, and (
) a function of the
altitude which is in principle different for each layer of the Earth’s
atmosphere.
4.2.2. Non-Spherical Gravitational Field Of The Earth
Like all planets with high rotational rates, the Earth has
developed an equatorial bulge and flattening around its poles. Like an
oblate pear with radius in a range from 6357 km to 6378 km. The mean
radius of the equator is about 21.4 km longer than that of the poles. The
distribution of the mass over the Earth is non-uniform. All these generate
extra disturbance force in the velocity and orbital normal direction on the
satellite [47]. Unlike a uniformly spherical object, in which the
gravitational field depends only on the distance from its center, the Earth's
nonuniformity causes gravitational perturbations on a spacecraft to depend
on the latitude and longitude of its orbit about the Earth. The variation with
latitude is called zonal variation and the dimensionless parameter with the
principal effect on spacecraft with an inclined orbit is known as (J2), the
second harmonic. The two major effects of (J2) is a regression in the line of
nodes and a precession of the line of apsides. The equatorial bulge
(Oblateness) of the Earth produces a torque, which rotates the angular
momentum vector, causing a regression in the line of nodes. Precession of
the line of apsides represents an overall rotation of the orbit within the orbit
plane [50].
61
Chapter four Perturbations In deriving the ideal elliptical Keplerian orbit, it is assumed that
the Earth can be modeled as a point mass with a spherical gravitational
field. For the purposes of accurate orbit determination, this assumption is
no longer valid. The mass of the Earth causes its gravitational field to
deviate from the ideal spherical model. A convenient way to account for
this variation is to model the Earth's gravitational potential by a spherical
harmonics expansion. In this expansion, the value of the J2 zonal
coefficient is three orders of magnitude larger than all the other coefficients
and thus dominates the gravitational perturbative influences of Earth. It
represents the equatorial bulge (Oblateness) of the Earth. If all but this term
is neglected and the gradient of the scalar potential function is taken, the
vector perturbative acceleration on satellite follows [56]:
3
2
3
3
4
4
2
Where (Re) is the radius of the Earth and (x, y, and z) are the
components of the satellite position (r).
4.2.3. Solar Radiation Pressure (SRP)
In the space environment, the body is also affected by the solar
radiation, which is an effect of electromagnetic radiation, SRP is a force on
the satellite due to the momentum flux from the Sun. For most satellites it
acts in a direction radially away from the Sun. The magnitude of the
resulting acceleration on the satellite is given by [56,57]:
a
62
Chapter four Perturbations Where (KS) is a dimensionless constant between 1 and 2 (KS=l:
surface perfectly absorbent; KS=2: surface reflects all light), (PS) is the
momentum flux from the Sun, (AS) is the cross-sectional area of the satellite
perpendicular to the Sun-line and (mS) is the mass of the satellite.
Some of the solar radiation is absorbed while the other is
reflected. There are two different principles for describing the radiation
reflection on a surface, namely specular reflection and diffusive reflection.
In specular reflection, the incoming particles have an elastic impact with
the surface regulated by the reflection law; in diffusive reflection,
atmospheric particles penetrate the satellite surface material, interact with
the surface molecules, and finally re-emitted at a number of random angles.
This energy transfer process generates the force on the objects [47].
The strongest effects from SRP are observed on spacecraft with
large incident surface areas (for example large solar array surfaces) and low
mass. The extent of perturbation is also directly linked to the orientation of
the orbit.
According to the equations below, it is difficult to quantify the
level of perturbation a spacecraft receives as a result of SRP because the
disturbing force depends on the spacecraft's distance from the Sun, rather
than its Earth orbiting altitude [50].
Where
is the solar energy flux at the spacecraft and (c) is
the speed of light.
63
Chapter four Perturbations 4.2.4.
Third Body Attractions
The term "third-body" refers to any other body in space besides
the Earth which could have a gravitational influence on the Moon. The
most significant influences come from the Sun. Planetary gravitational
influences are orders of magnitude in different degree depend on position
from the Earth or the Moon and its mass.
The perturbing acceleration due to the gravitational attraction of
a third body can be calculated as follows [56]:
Where (µd) is the gravitational parameter of the third body and
the definitions of the vectors are given in the following diagram:
Moon
rM
Earth
rdm
Third body
rd
Figure (4.2.): Vector definitions for third body attraction.
The functions (f) and (q) are:
.
2
.
3
1
3
1
⁄
64
Chapter four Perturbations Or other form can be expressed on acceleration due to third-body
forces as [57]:
The main body which has an effect on the Moon motion is the
Sun. Although gravitational force decreases as the square of the distance,
the Sun's gravity exceeds that of the Earth, because of its far greater mass.
We find that the Sun's gravitational attraction is about twice as great as that
of the Earth:
2
Where: (M) is Sun's mass
2×1030 kg and (R) is Sun–Moon distance
150 million Km, (m) is Earth's mass
distance
6×1024 kg and (r) is Earth–Moon
380 thousand Km
The difference between the forces exerted by the Sun on the
Moon and on the Earth is about (r / R) times the amount of the force itself,
and is thus about 200 times smaller than the force that the Earth exerts on
the Moon [16].
The most useful description of the Moon's orbit is therefore the
one expressed in a geocentric reference frame. In it, the Moon moves
around the Earth in a monthly Keplerian orbit, which is perturbed to a
greater or smaller degree by the Sun.
The Earth, Moon and Sun attract each other according to
Newton’s law of gravitation, all three bodies being taken to be pointmasses. Everything else, the finite sizes of Earth and Moon, tidal effects,
the attractions of the planets, etc., may be taken to be small. 65
Chapter four Perturbations 4.3. Other Perturbation Forces
There are other perturbation forces, but since they are all
significantly smaller than those mentioned then can be neglected during
calculation or simulations. The other perturbations include [56]:
• relativistic effect
• aerodynamic lift
•
induced Eddy currents in the satellite structure interacting
with the Earth's magnetic field
• Earth-reflected solar radiation pressure (Albedo)
• drag due to solar wind
• gravitational effects of Earth tides and ocean tides
• precession and nutation of the Earth's
• meteorites
For more information about satellite's perturbation see [6:3rd section]
66
Chapter Five
RESULTS,
DISCUSSION,
CONCLUSIONS
AND
FUTURE WORK
Chapter five Results, Discussion, Conclusions, and Future Work 5.1.
Introduction
The program was designed using Quick-Basic language to solve
the equations. Two techniques were used to calculate the orbital elements
for the Moon:
The first one depend on practical formula for the Moon distance
and ecliptic coordinate, as in equations (2.12), (2.13) and (2.14)
respectively, the Moon position and velocity components used to calculate
angular momentum components to find the orbital elements as in equations
(3.32) – (3.39). The calculation began from the date of perigee, where
determined by the Moon distance (Rm) scanning to find minimum distance,
see flowchart (3). The results obtained by this method are illustrated in the
following figures as a dished line.
The second technique is found using the Moon orbital elements
by solving Kepler's equation of motion equation (3.29) using NewtonRaphson method to calculate eccentric anomaly then calculate the position
and velocity components, equations (3.30) and (3.31) after that, the
position and velocity components are converted from the Moon orbital
plane to the geocentric equatorial plane by multiplying them with the
inverse of Gaussian matrix, after that using the same equation to calculate
the Moon orbital elements as equations (3.32) – (3.36), see flowchart (4).
The results obtained by this method are illustrated in the following figures
as a solid line.
Finally the results of both above methods are compared to find
the perturbation effect on the orbital elements (between the Keplerian
motion and practical motion) for the Moon's orbit and it's variation with
time, see flowchart (5).
The results which obtained are illustrated in the following figure
for each element for four different months of the year 2010.
68
Chapter five Results, Discussion, Conclusions, and Future Work 5.2.
Results and Discussion
1) The distance of the Moon (Rm) from the centre of the Earth
found using two techniques for four different months in the year 2010
which are illustrated in figure (5.1). As shown the curves are like sine
function and the Moon started from perigee which means the nearest point
in its rotation from the Earth and reach to farthest point after about 14 days
in apogee of its orbit.
In astronomy textbooks it is found that the mean distance from
the centre of the Earth to the Moon is 384400 km, and that the eccentricity
of the lunar orbit is e = 0.0549. From these values the minimum (perigee)
and the maximum (apogee) distances can be deduced between the centre of
the two bodies according to equation (3.2) and found as 363296 km and
405504 km, respectively [58]. This is right if we suppose that the orbit is
stable but the major axis of the lunar orbit changed direction toward the
Sun, see figure (5.5), near these epochs the eccentricity of the lunar orbit
reaches a maximum, and the perigee distance of the Moon is much smaller
than normal and the apogee distance is larger. When the major axis of the
lunar orbit is perpendicular to the direction of the Sun, the eccentricity
reaches a minimum; at these epochs, perigee and apogee distances are less
extreme.
Michelle Chapront - Touze and Jean Chapront, who calculated
the perigee and apogee distances of the Moon for the years 1960 to 2040,
81-year period, the perigee distances of the Moon, vary between 356445
km and 370354 km, which gives a spread of 13909 kilometers, during same
period the apogee distance varies from 404064 km to 406712 km, a
variation of only 2648 km [58].
69
Chapter five Results, Discussion, Conclusions, and Future Work As for the much longer period of AD 1500 to 2500, during these
ten centuries, distances were less than 356425 km, and they grow to larger
than 406710 km, during the time interval of ten centuries considered, the
extreme distances between the centre of the Earth and the Moon are
356371 km and 406720 km [58].
The distance has not been recorded smaller than the above value
in both methods, the smallest distances were 357473 km and 360863 km
with and without perturbation. In large distance the recorded value was
407545 km without perturbation in a second method but the large distance
was 406177 km with perturbation in a first method which mean it is less
than the extreme values. See table (5.1)
Table (5.1): The maximum, minimum and average the Moon distance by two techniques for
four different months in the year 2010 and the difference between two methods for each month.
a
b
c
d
Method
With out
With pert.
∆R
With out
With pert.
∆R
With out
With pert.
∆R
With out
With pert.
∆R
RmMax(km) RmMin(km)
404536
362457
404979
362044
443
413
406570
364279
405117
361883
1453
2396
402757
360863
406177
357473
3420
3390
407545
365153
404605
362910
2940
2243
RmAve(km)
383703
384429
726
385632
384808
824
382015
385397
3382
386557
384408
2149
In general the distance of the Moon calculated by the first
method is varying around it is value from the second method and some
time they are nearly the same value, that means the minimum effect of
perturbation.
70
Chapter five Results, Discussion, Conclusions, and Future Work R
4.0E+05
3.9E+05
3.8E+05
3.7E+05
3.9E+05
3.8E+05
3.7E+05
3.6E+05
b
R
4.1E+05
4.1E+05
RW
R
RW
4.0E+05
4.0E+05
The distance R (km)
The distance R (km)
2455392
2455388
2455384
2455380
2455376
2455372
2455368
2455364
2455360
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
The date
(day)
a
3.9E+05
3.8E+05
3.7E+05
3.6E+05
3.9E+05
3.8E+05
3.7E+05
3.6E+05
2455588
2455584
2455580
2455576
2455572
2455568
2455564
2455560
c
2455556
The date
(day)
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
The date
(day)
RW
4.0E+05
3.6E+05
The date (day)
R
4.1E+05
RW
The distance R (km)
The distance R (km)
4.1E+05
d
Figure (5.1): The Moon distance (Rm) variation with date for four different months
in the year 2010 using two techniques (with RW and without R).
2) The results of velocity of the Moon (V) is illustrated in figure
(5.2) from the two techniques used for the four different months as seen the
curves like half of cosine function and the velocity difference with the
distance with 180o which mean when the Moon near to the Earth, in
perigee, the velocity reach the maximum and vice versa according to
second Kepler law. The velocity is more similar when the Earth is near the
vernal and autumn equinoxes figure (5.2: a, c) and it was different when the
Earth is near the aphelion or perihelion in its orbit around the Sun figure
(5.2: b, d).
71
Chapter five Results, Discussion, Conclusions, and Future Work 1.1
1.08
1.06
1.04
1.02
1
0.98
0.96
0.94
VW
V
1.1
1.08
1.06
1.04
1.02
1
0.98
0.96
0.94
VW
The velocity V (km/s)
V
1.1
1.08
1.06
1.04
1.02
1
0.98
0.96
0.94
VW
d
Figure (5.2): The Moon's velocity (V) variation with date for four different months
of the year 2010 using two techniques (with VW and without V).
3) The semi major axis (a) is illustrated in table (5.2) and figure
(5.3) using two techniques for the four different months; the plots shows
the values of (a) (without perturbation) are constant through month but it
different from month to another. The difference between two techniques
when the Earth at the vernal and autumnal equinoxes figure (5.3: a, c) is
uniform and smaller than the difference when the Earth at the aphelion or
perihelion figure (5.3: b, d).
For some months the variation of actual semi major axis (a) is like a
wave around the fixed value (without perturbation) and for other months
the variation are not uniform waves.
72
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The date
(day)
V
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
c
2455392
2455388
2455384
2455380
The velocity V (km/s)
VW
b
1.1
1.08
1.06
1.04
1.02
1
0.98
0.96
0.94
The date
(day)
2455376
a
2455372
2455368
The date day)
2455364
2455360
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
The date
(day)
V
The velocity V (km/s)
The velocity V (km/s)
Chapter five Results, Discussion, Conclusions, and Future Work The table (5.2) shows the maximum and minimum values of (a)
through the year 2010 are 396531 km and 369713 km that means the
perturbation on the (a) element are 11091 km and 7947 km.
Table (5.2): The maximum, minimum and average of the semi major axis (a) of the
Moon by two techniques for four different months and the difference between them.
The semi major axis a (km)
a
b
c
d
aMax
387645
396531
390172
395075
SMA
4.0E+05
aMin
373782
369713
373878
372920
SMAW
3.9E+05
3.8E+05
aAve
381193
382224
381654
381588
aMax-a
4133
11091
8347
8710
a-aMin
9730
15727
7947
13445
4.1E+05
SMA
3.9E+05
3.8E+05
3.7E+05
SMA
SMAW
3.9E+05
3.8E+05
3.7E+05
SMAW
3.9E+05
3.8E+05
3.7E+05
d
Figure (5.3): The semi major axis (a) of the Moon in km with date for
four different months in the year 2010 using two techniques.
73
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2455580
2455576
2455572
2455568
2455564
2455560
2455556
The date
(day)
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
c
SMA
4.0E+05
The semi major axis a (km)
The semi major axis a (km)
b
4.0E+05
2455392
2455388
2455384
2455380
2455376
2455372
2455368
2455364
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
The date
(day)
a
The date
(day)
SMAW
4.0E+05
2455360
3.7E+05
The date
(day)
∆a
With perturbation
The semi major axis a (km)
Without
perturbation
a (km)
383512
385440
381825
386365
Chapter five Results, Discussion, Conclusions, and Future Work 4) Eccentricity (e), as illustrated in figure (5.4), was fixed in all
months at a value 0.0549 when the second technique is used and it was
varied as shown in table (5.3) when the first technique (with perturbation)
is used. The same behavior during all months can be seen. The actual
values of (e) are vibrate around the fixed value as nonuniform wave
because the effect of the near planets, as well as the Sun’s gravitational
pull, which are variable in distance with time period is 31.8 days [12]
which know as evection. The evection largest periodic perturbation of the
Moon’s longitude, caused by the Sun, displacing it from its mean position
by ±1o16'26".4 [7].
Table (5.3) shows the maximum and minimum values of (e)
through the year 2010 as 0.093369 and 0.023901 which means that the
perturbation value of (e) element are 0.038469 and 0.018285.
Table (5.3): The maximum, minimum and average value of actual eccentricity (e) of the
Moon orbit for four different months using first technique (perturbed) and the difference
each month.
a
b
c
d
eMax
0.07633
0.093369
0.089551
0.091675
eMin
0.025996
0.036615
0.023901
0.035645
eAve
0.059597
0.061992
0.06071
0.062119
eMax-e
0.02143
0.038469
0.034651
0.036775
e-eMin
0.028904
0.018285
0.030999
0.019255
Eccentricity is at maximum when the major axis of the lunar
orbit is directed toward the Sun, see figure (5.5), this occurs at mean
intervals of 205.9 days, and it is value can vary between the extremities
0.026 and 0.077 [58], see figure (5.7), or it varies from 0.044 to 0.067 [12]
or its varies between 0.0432 and 0.0666 [9]. Present result varied between
0.0239 and 0.0933, see table (5.3), that means extreme the minimum value
and exceed the maximum value in the year 2010.
74
Chapter five Results, Discussion, Conclusions, and Future Work ECCW
0.08
0.06
0.04
0.02
0
0.1
ECC
0.06
0.04
0.02
0
ECCW
0.08
0.06
0.04
0.02
0
0.1
ECC
ECCW
0.08
0.06
0.04
0.02
0
d
Figure (5.4): The eccentricity (e) of the Moon as a function of time for four
different months using two techniques for the year 2010.
Figure (5.5): When the major axis of the Moon's orbit is aligned with the Earth - Sun
line (A), the orbital eccentricity exceeds its mean value. About 103 days later, in B, the
two lines are at right angle and the eccentricity reaches a minimum. A new maximum
is reached again after another 103 days (C). Sizes and distances are not to scale! [58]
75
2455588
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2455580
2455576
2455572
2455568
2455564
2455560
2455556
The date
(day)
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
c
The eccentricity e (without units)
ECC
2455444
The eccentricity e (without units)
b
0.1
2455392
2455388
2455384
2455380
2455376
2455372
2455368
2455364
The date
(day)
a
The date
(day)
ECCW
0.08
2455360
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
The date
(day)
The eccentricity e (without units)
ECC
0.1
2455280
The eccentricity e (without units)
Chapter five Results, Discussion, Conclusions, and Future Work Figure (5.6): The effective eccentricity of the lunar trajectory as a function of time;
the abscissa gives the time in synodic months, starting with the year 1980 [2].
Figure (5.7): The instantaneous eccentricity of the lunar orbit, 1996 to 1998 [58].
76
Chapter five Results, Discussion, Conclusions, and Future Work 5) Inclination (i) as illustrated in figure (5.8) there is no change in
inclination through each month but it differs in value from month to
another when the second technique is used and its variation is clear when
the first technique is used. The average value of variation in each month is
very close to the value in same month as shown in table (5.4). In both cases
the value of inclination decreases with time.
As known, the mean inclination on Moon orbit is 5°9' with the
ecliptical Earth plane, (inclination oscillates between 4°58' and 5°19')
[8,12]. If the trend of the Moon orbit from the Earth equatorial plane is to
be calculated, that depend on direction of nodes line, the Moon's ascending
node coincides with the vernal equinox direction, the inclination of the
Moon's orbit to the equator is a maximum, and when the descending node
is at the vernal equinox, the inclination of the Moon's orbit to the equator is
a minimum. Thus, the inclination relative to the equator varies between
5o09' + 23o26' (obliquity angle near 2000 AD) [12] = 28o35' or 18o17' [8]
, which can be considered as the declination of the Moon. The variation of inclination with time and the difference is called
perturbation in the inclination element by the Sun and planet effect on the
Moon orbit as gravitational force caused nonuniform curve. From table
(5.4) the maximum and minimum of (i) in the year 2010 are found with
perturbation 25o.36414 and 24o.13273, and the perturbed terms are not
constant but vibrated between 0.07276 and 0.13926.
Table (5.4): The maximum, minimum and average values of inclination (i) of the
Moon's orbit by first method and inclination (i) by second method for four different
months of the year 2010 and the difference between them for each month.
a
b
c
d
Without
perturbation
i (deg)
25.24803
25.16704
24.7453
24.40839
∆i
With perturbation
iMax
25.36414
25.2398
24.84873
24.40839
iMin
25.10877
24.92401
24.35931
24.13273
iAve
25.29059
25.02852
24.64921
24.21669
iMax-i
0.11611
0.07276
0.10343
0
i-iMin
0.13926
0.24303
0.38599
0.27566
77
Chapter five Results, Discussion, Conclusions, and Future Work IN
25.4
INW
The inclination i (deg)
The inclination i (deg)
25.6
25.5
25.4
25.3
25.2
25.1
IN
25.3
25.2
25.1
25
24.9
24.8
b
24.9
IN
24.6
INW
The inclination i (deg)
The inclination i (deg)
2455392
2455388
2455384
2455380
a
2455376
2455372
2455368
The date
(day)
2455364
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
The date
(day)
2455360
25
24.8
24.7
24.6
24.5
24.4
IN
INW
24.5
24.4
24.3
24.2
24.1
24
24.3
d
Figure (5.8): The inclination angle (i) in degree for the Moon with the date
using two techniques for four different months in the year 2010.
6) Longitude of ascending node (Ω) are as shown in figure (5.9)
where there is no change in longitude of ascending node in each month but
it is different in value from month to another when the second technique
(without perturbation) was used and it was varied when the first technique
(with perturbation) was used which can be seen in the table (5.5)
The longitude of ascending node was retrograde with a period of
18.6 years for more accuracy is 6798.3 days [12]. That is the same period
of motion of the nodes. The line of nodes is almost stationary when it is
directed toward the Sun. This coincides with the maximum value of the
orbital inclination, and it is near these epochs that solar and lunar eclipses
taken place.
78
2455588
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2455580
2455576
2455572
2455568
2455564
2455560
2455556
c
The date
(day)
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
The date
(day)
INW
Chapter five Results, Discussion, Conclusions, and Future Work The mean values of (Ω) through the year 2010 with perturbation
are varied between (11.3 – 12.8) degrees and its fluctuation continued to
increase with date.
Table (5.5): The maximum, minimum and average value of longitude of ascending node
for the Moon orbit for four different months using two techniques in the year 2010.
Without
perturbation
Ω (deg)
11.24975
12.10544
11.83937
12.91436
ΩMin
11.14856
11.82897
11.7462
12.49302
LOAN
LOANW
12
11.8
11.6
11.4
11.2
11
ΩMax– Ω
0.55696
0.49826
0.6706
0.29073
12.7
12.3
12.1
11.9
11.7
b
LOAN
LOANW
12.4
12.2
12
11.8
11.6
LOANW
13.2
13
12.8
12.6
12.4
d
Figure (5.9): The longitude of ascending node (Ω) of the Moon as a
function of the date for four different months using two techniques.
79
2455588
2455584
2455580
2455576
2455572
2455568
2455564
2455560
2455556
The date
(day)
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
c
LOAN
13.4
The longitude of ascending node Ω (deg)
12.6
2455392
2455388
2455384
2455380
2455376
2455372
The date
(day)
2455368
The longitude of ascending node Ω (deg)
LOANW
12.5
a
The date
(day)
Ω – ΩMin
0.10119
0.27647
0.09317
0.42134
LOAN
2455364
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
The date
(day)
ΩAve
11.344863
12.278654
12.018258
12.879839
The longitude of ascending node Ω (deg)
ΩMax
11.80671
12.6037
12.50997
13.20509
∆Ω
2455360
The longitude of ascending node Ω (deg)
a
b
c
d
With perturbation
Chapter five Results, Discussion, Conclusions, and Future Work 7) Eccentric anomaly (E) as illustrated in figure (5.10) where it is
started from zero when the Moon in the perigee and reached to 360o at the
end of period when Kepler equation of motion was solved using iteration of
Newton–Raphson method.
When the first technique was used with the true orbit which have
small value of eccentricity it is shown that the eccentric anomaly varied up
and down the straight line drawn by second technique.
In general the variation was increasing when the eccentricity was
ECAN
ECANW
350
250
150
50
ECAN
250
150
50
150
50
ECAN
ECANW
350
250
150
50
d
Figure (5.10): The eccentric anomaly (E) in degree of the Moon against the time
(JD) using two techniques for four different months in the year 2010.
80
2455588
2455584
2455580
2455576
2455572
2455568
2455564
2455560
The date
(day)
2455556
-50
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
c
The eccentric anomaly E (deg)
ECANW
250
2455444
The eccentric anomaly E (deg)
ECAN
2455392
2455388
2455384
2455380
b
350
The date
(day)
2455376
2455372
2455368
2455364
-50
The date
(day)
a
-50
ECANW
350
2455360
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
The date
(day)
2455280
-50
The eccentric anomaly E (deg)
The eccentric anomaly E (deg)
increasing too.
Chapter five Results, Discussion, Conclusions, and Future Work 8)
Mean anomaly (M) is as illustrated in figure (5.11) and it is
started from zero when the Moon in the perigee and reach to 360o at the
end of period because it was depending on the eccentric anomaly in
calculation.
And when the first technique was used with the true orbit which
have small value of eccentricity is shown the mean anomaly (with
perturbation) varied up and down, the straight line drawn with second
technique (without perturbation). It is very similar with the eccentric
anomaly and the difference is very small because the eccentricity is very
MEAN
MEANW
350
250
150
50
MEAN
250
150
50
b
MEAN
The mean anomaly M (deg)
The mean anomaly M (deg)
2455392
2455388
2455384
2455380
2455376
2455372
2455368
The date
(day)
2455364
-50
a
350
250
150
50
MEAN
250
150
50
2455588
2455584
2455580
2455576
2455572
2455568
2455564
2455560
2455556
-50
The date
(day)
c
MEANW
350
2455552
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
2455444
-50
The date
(day)
MEANW
350
2455360
2455312
2455308
2455304
2455300
2455296
2455292
2455288
2455284
2455280
-50
The date
(day)
The mean anomaly M (deg)
The mean anomaly M (deg)
small (less than 0.1).
d
Figure (5.11): The mean anomaly (M) in degree of the Moon against the time
(JD) using two techniques for four different months in the year 2010.
81
Chapter five Results, Discussion, Conclusions, and Future Work 9)
Argument of perigee (ω) as was mentioned in the previous
chapter can be obtained from the difference between the argument of
latitude and true anomaly as in equation (3.34). This angle was fixed in
each month when the second technique without perturbation was used but it
was changed from month to another because the line of apsides (line
joining perigee and apogee) rotates in the direction of the Moon's orbital
motion causing change by 360° in about 8.9 years [8] or 3232.6 days (8.85
years) [12]. The (ω) with first technique vary with time where it was near
the sold line in the beginning of the month then it was decreasing near the
middle of month then it begun increasing to reach the sold line again at the
end of the month as illustrated in figure (5.12).
Table (5.6): The maximum, minimum and average values of argument of perigee of the
Moon for four different months in the year 2010 using two techniques and the
difference between them for each month.
a
b
c
d
Without
perturbation
ω (deg)
8.48867
-23.2014
24.36643
-6.31026
With perturbation
ωMax
8.48867
-15.1283
25.15403
4.74243
ωMin
-49.154
-73.1594
-35.1002
-52.4218
ωAve
-16.3165
-46.8597
-4.28069
-19.1418
∆ω
ωMax – ω
0
8.07317
0.7876
11.05269
ω – ωMin
57.64264
49.95796
59.46665
46.11154
82
Chapter five Results, Discussion, Conclusions, and Future Work -40
-50
-60
-70
-80
The date (day)
AOP
10
AOPW
Theargument of perigee ω (deg)
-30
-40
-50
-60
The date (day)
d
Figure (5.12): The argument of perigee (ω) of the Moon against time for
four different months in the year 2010 using two techniques.
The period of conjunct month (synodic month) calculated using
first technique was started in the year 2010 bigger than mean period and
went on decreaseing to less the mean period after the middel of the year
and went on increasing to end of the year which exceed the mean value
again, as shown in table (5.7).
83
2455588
2455584
2455580
2455576
c
2455572
The date (day)
2455568
-40
-20
2455564
-30
-10
2455560
2455480
2455476
2455472
2455468
2455464
2455460
2455456
2455452
2455448
-20
AOPW
0
2455556
0
AOP
2455552
10
2455444
Theargument of perigee ω (deg)
b
20
-10
2455392
-30
a
30
2455388
The date (day)
2455384
-60
AOPW
2455380
-50
2455376
-40
2455372
-30
2455368
2455312
2455308
2455304
2455300
2455296
2455292
2455288
-20
2455284
-10
-20
2455364
0
-10
AOP
2455360
10
2455280
The argument of perigee ω (deg)
0
AOPW
The argument of perigee ω (deg)
AOP
20
Chapter five Results, Discussion, Conclusions, and Future Work Table (5.7): The period of the conjunct months of the Moon in the year 2010 A.D.
No. of month The month length Day Hour Minute Second
1
29.8194
29
19
39
56
2
29.75714
29
18
10
17
3
29.64429
29
15
27
47
4
29.52413
29
12
34
44
5
29.4234
29
10
9
42
6
29.35112
29
8
25
37
7
29.31074
29
7
27
28
8
29.30668
29
7
21
37
9
29.34352
29
8
14
40
10
29.42189
29
10
7
31
11
29.53099
29
12
44
38
12
29.64412
29
15
27
32
Table (5.8): The date and time of the new Moon
The date
D M
Y
15 1 2010
14 2 2010
15 3 2010
14 4 2010
14 5 2010
12 6 2010
11 7 2010
10 8 2010
8
9 2010
7 10 2010
6 11 2010
5 12 2010
My program
N
S
H
11
44
7
51
40
2
1
56
21
43
12 29
4
28
1
9
11 14
46
19 39
7
14
3
51
10 28
31
18 43
51
2
4
39
17 35
[59]
H
N
7
12
2
52
21
2
12 30
1
5
11 15
19 41
3
9
10 30
18 45
4
52
17 36
[60]
H
N
7 14
2 54
21 4
12 32
1
7
11 17
19 42
3 10
10 31
18 46
4 54
17 38
[61]
H
7
2
21
12
1
11
19
3
10
18
4
17
N
11
51
01
29
4
15
40
8
30
44
52
36
D= day, M= month, Y= year, H= hour, N= minute, S= second Table (5.8) shows the date and time of the new Moon using present
program (first technique) which shows a good agreement with other
references. This means that the present written program for this research
was very accurate to calculate the Hegree date and the actual Moon orbital
elements (with perturbation).
84
Chapter five Results, Discussion, Conclusions, and Future Work 5.3.
Conclusions: 1) The perturbation term adds some effects on the all orbital elements. 2) The first technique was better than the second one from direction to
apply on actual motion.
3) The mean value of the semi-major axis (a) for the Moon was 381665 km
and it varied from year to other.
4) The eccentricity (e) of the Moon orbit varied between 0.024 and
0.093 and with mean value equal 0.06.
5) The inclination (i) of the Moon orbit was fluctuated between 24.13
and 25.36 and the inclination preturbation between 0.0737 and 0.385
deg.
6) The longitude of ascending node (Ω) for the Moon orbit was
between 11.14 and 13.2 which mean it was perturbed by 0.5 deg.
7) The mean anomaly (M) and eccentric anomaly (E) have small
perturbation at all 15 days.
8) The argument of perigee (ω) for the Moon was more influenced
than other elements by perturbation.
9) The distance from the Sun was mainly affected by the Moon from
other body in the Solar System therefore it was seen the Moon's
elements have approximately same shape or same behavior when
the Earth near the vernal and autumnal equinoxes or near the
aphelion and perihelion.
10) The synodic month is varied steeply between 29.3 and 29.8 day.
11) The present program was suitable to calculate the actual Moon
orbital elements and Hegree date with excellent accuracy.
12) The solar radiation pressure and the planets attraction have small
but not negligible effects on the Moon’s orbit, and the shape of
Earth and Moon themselves contribute to the perturbations.
85
Chapter five Results, Discussion, Conclusions, and Future Work 5.4. Future Work:
1) Studying the secular variation of Moon's orbital elements for long period.
2) Finding the periodic revolution for some elements through 19 year.
3) Improving the programs for the other planet's satellite or for the
planets themselves.
4) Using other body attraction technique to calculate the perturbation
on the Moon orbital elements.
5) Orbit elements during Lunar and Solar eclipses.
6) Using numerical methods of analysis.
86
REFERENCES
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،"‫ "اﻟﺘ ﺄﺛﻴﺮات ﻋﻠ ﻰ ﻣﺴ ﺎر اﻟﻘﻤ ﺮ وﻣﻌﺎدﻟ ﺔ رؤﻳ ﺔ اﻷهﻠ ﺔ‬،(٢٠٠١) ،‫[ ﻓ ﺆاد ﻣﺤﻤ ﻮد ﻋﺒ ﺪ اﷲ‬١١]
.‫ آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬،‫رﺳﺎﻟﺔ ﻣﺎﺟﺴﺘﻴﺮ‬
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‫ "أهﻠ ﺔ اﻟﺸ ﻬﻮر اﻟﻬﺠﺮﻳ ﺔ ﺑ ﻴﻦ اﻟﺮؤﻳ ﺔ اﻟﺸ ﺮﻋﻴﺔ واﻟﺤﺴ ﺎﺑﺎت‬،(٢٠٠٥) ،‫[ ﺣﻤﻴﺪ ﻣﺠﻮل اﻟﻨﻌﻴﻤ ﻲ‬١٥]
www.moonsighting.com/articles ،"‫اﻟﻔﻠﻜﻴﺔ‬
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،"‫ "إﻳﺠ ﺎد ﻣﻌﺎدﻟ ﺔ اﺣﺘﻤﺎﻟﻴ ﺔ رؤﻳ ﺔ اﻟﻬ ﻼل‬،(٢٠٠٢) ،‫[ ﺿ ﺤﻰ ﻣﺤﻤ ﻮد ﻣﻨﺼ ﻮر اﻟﻔﻴ ﺎض‬١٨]
.‫ آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬،‫رﺳﺎﻟﺔ ﻣﺎﺟﺴﺘﻴﺮ‬
‫ "ﺣﺮآ ﺎت اﻟﺸ ﻤﺲ واﻟﻘﻤ ﺮ اﻟﻔﻴﺰﻳﺎﺋﻴ ﺔ‬،(١٩٩٧) ،‫[ ﻋﺒ ﺪ اﻟ ﺮﺣﻤﻦ ﺣﺴ ﻴﻦ ﺻ ﺎﻟﺢ اﻟﻤﺤﻤ ﺪي‬١٩]
.‫ آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬،‫ أﻃﺮوﺣﺔ دآﺘﻮراﻩ‬،"‫وﺗﻄﺒﻴﻘﺎﺗﻬﺎ ﻟﻠﻤﻮاﻗﻴﺖ اﻹﺳﻼﻣﻴﺔ‬
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‫ "دورات ﻟﺤﻈ ﺔ وﻻدة‬،(١٩٩٤) ،‫[ ﺣﻤﻴ ﺪ ﻣﺠ ﻮل اﻟﻨﻌﻴﻤ ﻲ وﻋﺒ ﺪ اﻟ ﺮﺣﻤﻦ ﺣﺴ ﻴﻦ اﻟﻤﺤﻤ ﺪي‬٢٢]
٢‫ ﻋ ﺪد‬٣٥‫ م‬،‫ اﻟﻤﺠﻠ ﺔ اﻟﻌﺮاﻗﻴ ﺔ ﻟﻠﻌﻠ ﻮم‬،"‫اﻟﻬ ﻼل وﺷ ﺮوط ﺟﺪﻳ ﺪة ﻟﺮؤﻳﺘ ﻪ ﻋﻨ ﺪ ﻏ ﺮوب اﻟﺸ ﻤﺲ‬
.٥٨٠‫ص‬
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‫ "ﺗ ﺄﺛﻴﺮ اﺿ ﻄﺮاﺑﻲ آ ﺒﺢ اﻟﻐ ﻼف اﻟﺠ ﻮي‬،(٢٠٠٣) ،‫ﻟﻤﻴـ ـﺎء ﻣﺤﻤ ﺪ ﺣﺴ ـﻦ ﻋﻤ ﺎر ﺳﻤﻴﺴ ـﻢ‬
[٢٧]
،‫ رﺳ ﺎﻟﺔ ﻣﺎﺟﺴ ﺘﻴﺮ‬،"‫ ﻋﻠ ﻰ اﻟﻌﻨﺎﺻ ﺮ اﻟﻤﺪارﻳ ﺔ ﻟﻸﻗﻤ ﺎر اﻟﺼ ﻨﺎﻋﻴﺔ واﻃﺌ ﺔ اﻻرﺗﻔ ﺎع‬J2 ‫واﻟﻌﺎﻣ ﻞ‬
.‫آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬
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‫ "ﺗﺤﺪﻳﺪ ﻣﺪارات اﻷﻗﻤﺎر اﻟﺼ ﻨﺎﻋﻴﺔ واﻃﺌ ﺔ اﻻرﺗﻔ ﺎع‬،(٢٠٠٣) ،‫[ ﻓﺮﻳﺪ ﻣﺼﻌﺐ ﻣﻬﺪي اﻟﺪﻟﻴﻤﻲ‬٤٤]
.‫ آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬،‫ رﺳﺎﻟﺔ ﻣﺎﺟﺴﺘﻴﺮ‬،"‫ﺑﻄﺮﻳﻘﺔ اﻟﺮﺻﺪ اﻟﺒﺼﺮي‬
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‫ "اﻻﺿ ﻄﺮاﺑﺎت اﻟﻤ ﺆﺛﺮة ﻋﻠ ﻰ ﻣ ﺪارات اﻷﻗﻤ ﺎر‬،(٢٠٠٢) ،‫[ أﻧ ﺲ ﺳ ﻠﻤﺎن ﻃ ﻪ اﻟﻬﻴﺘ ﻲ‬٤٩]
.‫ آﻠﻴﺔ اﻟﻌﻠﻮم ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬،‫ رﺳﺎﻟﺔ ﻣﺎﺟﺴﺘﻴﺮ‬،"‫اﻻﺻﻄﻨﺎﻋﻴﺔ اﻟﻮاﻃﺌﺔ‬
[50] Zoe Parsons, (2006), "Lunar Perturbations Of a Supersynchronous
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[54] Christian
Hellström
and
Seppo
Mikkola,
(2010),
"Explicit
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‫ ﻣﻜﺘﺒ ﺔ اﻟ ﺪار اﻟﻌﺮﺑﻴ ﺔ‬،"‫ "ﻣﺒ ﺎدئ ﻋﻠ ﻢ اﻟﻔﻠ ﻚ اﻟﺤ ﺪﻳﺚ‬،(٢٠١٠) ،‫[ ﻋﺒ ﺪ اﻟﻌﺰﻳ ﺰ ﺑﻜ ﺮي اﺣﻤ ﺪ‬٥٩]
.‫ﻟﻠﻜﺘﺎب ﻓﻲ اﻟﻘﺎهﺮة‬
‫ ﻣﻜﺘ ﺐ ﺳ ﻤﺎﺣﺔ ﺁﻳ ﺔ اﷲ‬،"‫ اﻟﻔﻠ ﻚ اﻹﺳ ﻼﻣﻲ‬CD ‫ "ﻗ ﺮص‬،‫[ ﻣﺮآ ﺰ اﻟﺒﺤ ﻮث واﻟﺪراﺳ ﺎت اﻟﻔﻠﻜﻴ ﺔ‬٦٠]
.‫ ﻗﻢ اﻟﻤﻘﺪﺳﺔ‬،‫اﻟﻌﻈﻤﻰ اﻟﺴﻴﺪ ﻋﻠﻲ اﻟﺴﻴﺴﺘﺎﻧﻲ‬
‫ ﺑﺤ ﺚ ﻣﻘ ﺪم‬،"‫ "اﻟﻔﺮق ﺑﻴﻦ أﻃﻮار اﻟﻘﻤ ﺮ اﻟﻤﺮآﺰﻳ ﺔ واﻟﺴ ﻄﺤﻴﺔ‬،(٢٠٠٦) ،‫[ ﻣﺤﻤﺪ ﺷﻮآﺔ ﻋﻮدة‬٦١]
.‫ﻟﻤﺆﺗﻤﺮ اﻹﻣﺎرات اﻟﻔﻠﻜﻲ اﻷول‬
[62] Howard D. Curtis, (2005), "Orbital Mechanics For Engineering
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93
Appendix A We can rewrite the equation of motion (3.10) as [27,49,62]: µr
r
r
Or
µ
r
Where U
(A.1) By taking the cross product for relationship (A.1) with the specific angular momentum h µ
r
(A.2) Since (A.3) The rela onship (A.2) became µ
r
(A.4) By recall the vector identity known as the bac −cab rule: A × (B × C) = B (A ∙ C) − C (A ∙ B) Then equa on (A.4) became µ
r
r
.
.
By substitute U in above equation .
.
.
.
Then r
(A.5) Then taking the integral for the equation (A.5) r
(A.6) By taking dot product for (A.6) with , get .
Left side equal .
.
.
, the equation (A.7) became .
Since .
(A.7) and .
.
cos
(A.8) Where is the angular distance from perigee. Then put these result in (A.8), get cos
1
cos
Finally the relation of conic section orbital in polar coordinate is: 1
cos
1
cos
Or Where is the semi latus rectum and (e) is eccentricity. Appendix B Flowchart (1) finding the date and time for the crescent Moon. Start
INPUT the month M and the year Y M = M + 0.5
Calculate the J.D. for crescent Moon by equa on (2.11) Add correction to the J.D. of the crescent Moon Convert the J.D. to Year, Month, Day, Hour, minute and the name of day PRINT J.D, DATE, TIME
END
Flowchart (2) calcula ng the Julian date, distance and velocity for the Moon. Start
INPUT UT, D, M and Y for new Moon which calculated from flowchart (1) Calculate (J.D) for input data by equa on (2.8) J.D = J.D + 1 Calculate the Julian century (T) by equa on (2.10) Calculate the Earth ‐ Moon distance (Rm) by equa on (2.14)
FOR I = 1 TO 29
Calculate the ecliptical coordinate for the Moon λ , β by eq. (2.12) and (2.13)
Convert λ , β to equatorial coordinate δ , α by eq. (2.4) and (2.5) Convert δ , α to horizontal coordinate A , al by eq. (2.6) and (2.7) Calculate cartesian coordinate (Rx, Ry, Rz by δ , α and Rm
Next FOR I = 1 TO 28 Calculate the velocity components (Vx, Vy, Vz and Vm) PRINT the distance (Rm and Vm with J.D Next END
Flowchart (3) calcula ng orbital elements for the Moon using angular momentum which obtained from actual position and velocity according to the first technique. Start
FOR I = 1 TO 28
(Rx, Ry, Rz, Vx, Vy, Vz
Calculate the angular momentum (h) and components hx, hy and hz using the sec on 3.8 Calculate the inclination (i), longitude of ascending node (Ω), argument of perigee (ω), semi major axis (a), eccentricity (e), eccentric anomaly (E), mean anomaly (M) and true anomaly (f) using the sec on 3.9 PRINT a, e, i, Ω, ω, E, M, f
Next
END
Flowchart (4) calcula ng orbital elements for the Moon by solving Kepler equation according to the second technique. Start
Rm(max), Rm(min) from the first technique, e= 0.0549 Calculate mean mo on (n) by equa on (3.26) FOR I = 1 TO 28
Calculate mean anomaly (M) by equa on (3.28) Find the eccentric anomaly (E) by solution Kepler equation (3.29) using Newton-Raphson method
Calculate the Moon position (Rx, Ry, R) for Moon in its orbit and Moon velocity (Vx, Vy, V) by equa on (3.30) ‐ (3.31) Convert the components of position and velocity of the Moon from his orbital plane to Earth
equatorial plane using Gaussian vectors (conversion matrix), which content Eular angle.
Calculate the angular momentum h and components (hx, hy and hz) using the section 3.8
Calculate the inclination (i), longitude of ascending node (Ω), argument of perigee (ω), semi major axis (a), eccentricity (e), by the sec on 3.9 PRINT a, e, i, Ω, ω, E, M, f
Next
END
Flowchart (5) calcula ng perturba on on the Moon orbital elements. Start
FOR I = 1 TO 28 Orbital elements from flowchart (3)
Orbital elements from flowchart (4)
Find the perturbation in the position, velocity and orbital elements
∆R, ∆V, ∆e, ∆i, ∆a, ∆Ω, ∆ω, ∆E, ∆M, ∆f
PRINT ∆R, ∆V, ∆e, ∆i, ∆a, ∆Ω, ∆ω, ∆E, ∆M, ∆f Next
END
‫اﻟﺨﻼﺻﺔ‬
‫ﻓﻲ هﺬا اﻟﺒﺤﺚ ﺗﻤﺖ دراﺳﺔ ﻣﻌﺎدﻟﺔ اﻟﺤﺮآﺔ اﻟﻜﺒﻠﺮﻳﺔ ﻟﺤﻞ ﻣﺸﻜﻠﺔ اﻟﺠﺴﻤﻴﻦ ﺑﻮﺟ ﻮد وﺑﻌ ﺪم‬
‫وﺟﻮد اﻻﺿﻄﺮاﺑﺎت ﻋﻠﻰ ﻣﺪار اﻟﻘﻤﺮ ﺑﺼﻮرة ﺧﺎﺻﺔ آﻨﻤﻮذج ﻟﻤﺪارات اﻟﻘﻄﻊ اﻟﻨﺎﻗﺺ ﺑﻄﺮﻳﻘﺘﻴﻦ ‪:‬‬
‫اﻷوﻟﻰ‪ :‬اﻋﺘﻤﺎدا ﻋﻠﻰ ﻣﻮﻗﻊ اﻟﻘﻤﺮ اﻟﻤﺤﺪد ﻣﻦ اﻟﻤﻌﺎدﻟﺔ اﻟﺘﻄﺒﻴﻘﻴﺔ اﻟﻤﻮﺿﻮﻋﺔ ﻟﺤﺴ ﺎب ﺑﻌ ﺪ‬
‫اﻟﻘﻤﺮ ﻋﻦ اﻷرض ﺗﺠﺮﻳﺒﻴﺎ‪ .‬ﺛﻢ ﺣﺴﺎب ﻣﺮآﺒﺎت اﻟﻤﻮﻗﻊ واﻟﺴﺮﻋﺔ ﻻﺳ ﺘﺨﺮاج ﻣﺮآﺒ ﺎت اﻟ ﺰﺧﻢ وﻣ ﻦ ﺛ ﻢ‬
‫إﻳﺠﺎد اﻟﻌﻨﺎﺻﺮ اﻟﻤﺪارﻳﺔ ﻟﻠﻤﺪار‪ .‬واﻟﺘﻲ ﺗﻤﺜﻞ اﻟﺤﺮآﺔ ﺑﻮﺟﻮد اﻻﺿﻄﺮاب ‪.‬‬
‫اﻟﺜﺎﻧﻴﺔ‪ :‬اﻋﺘﻤﺎدا ﻋﻠﻰ ﺣﻞ ﻣﻌﺎدﻟﺔ آﺒﻠﺮ ﺑﺎﺳ ﺘﺨﺪام زاوﻳ ﺔ اﻻﻧﺤ ﺮاف اﻟﺤﻘﻴﻘ ﻲ وﺗﻐﻴﺮه ﺎ ﻣ ﻊ‬
‫اﻟﺰﻣﻦ واﺳﺘﺨﺪاﻣﻬﺎ ﻟﺤﺴﺎب ﻣﺮآﺒﺎت إﺣﺪاﺛﻴﺎت اﻟﻤﻮﻗﻊ واﻟﺴﺮﻋﺔ ﻟﻠﻘﻤﺮ ﻹﻳﺠ ﺎد ﺑﻘﻴ ﺔ اﻟﻌﻨﺎﺻ ﺮ اﻟﻤﺪارﻳ ﺔ‬
‫ﺑﻌﺪ ان ﺗﻢ ﺗﺤﻮﻳﻠﻬﺎ ﻟﻤﺴﺘﻮي ﻣﺪار اﻷرض ﺑﺎﺳﺘﺨﺪام ﻣﻌﻜﻮس ﻣﺼﻔﻮﻓﺔ آﺎوس‪ .‬وﻗ ﺪ ﺗ ﻢ اﻋﺘﺒ ﺎر اﻟﺤﺮآ ﺔ‬
‫ﺣﺮآﺔ آﺒﻠﺮﻳﺔ ﻧﻘﻴﺔ )ﻋﺪم وﺟﻮد اﺿﻄﺮاب(‪.‬‬
‫وﺑﺎﻟﻤﻘﺎرﻧﺔ ﺑﻴﻦ اﻟﻌﻨﺎﺻﺮ اﻟﻤﺤﺴﻮﺑﺔ ﻣﻦ اﻟﻄ ﺮﻳﻘﺘﻴﻦ أﻋ ﻼﻩ ﺗ ﻢ ﺣﺴ ﺎب ﻣﻘ ﺪار اﻻﺿ ﻄﺮاب‬
‫ﻟﻜ ﻞ ﻋﻨﺼ ﺮ ﻣ ﺪاري وﺗﻐﻴﺮه ﺎ ﻣ ﻊ اﻟ ﺰﻣﻦ ﻷرﺑﻌ ﺔ أﺷ ﻬﺮ ﻣﺨﺘﻠﻔ ﺔ ﻣ ﻦ ﺳ ﻨﺔ ‪ .٢٠١٠‬ﺣﻴ ﺚ ﻟ ﻮﺣﻆ ان‬
‫اﻻﺿﻄﺮاب ﻳﻮﺛﺮ ﻋﻠﻰ ﺟﻤﻴﻊ اﻟﻌﻨﺎﺻﺮ اﻟﻤﺪارﻳﺔ‪.‬‬
‫ﺑﺎﻹﺿ ﺎﻓﺔ إﻟ ﻰ ﻣﻨﺎﻗﺸ ﺔ ﻣﻮﺿ ﻮع اﻻﺿ ﻄﺮاﺑﺎت ﺑﺼ ﻮرة ﻋﺎﻣ ﺔ واﻟﻤ ﺆﺛﺮة ﻋﻠ ﻰ اﻷﺟﺴ ﺎم‬
‫اﻟﻤﺪارﻳ ﺔ آﻤﻘﺎوﻣ ﺔ اﻟﻐ ﻼف اﻟﺠ ﻮي وﻋ ﺪم اﻧﺘﻈ ﺎم آﺮوﻳ ﺔ اﻷرض وﺿ ﻐﻂ اﻹﺷ ﻌﺎع اﻟﺸﻤﺴ ﻲ وﺗ ﺄﺛﻴﺮ‬
‫ﺟﺎذﺑﻴﺔ اﻟﺠﺴﻢ اﻟﺜﺎﻟﺚ واﻟﺬي ﻳﻌﺘﺒﺮ اﻟﻤﺆﺛﺮ اﻟﺮﺋﻴﺴﻲ ﻋﻠﻰ اﻟﻌﻨﺎﺻﺮ اﻟﻤﺪارﻳﺔ ﻟﻠﻘﻤﺮ‪.‬‬
‫أﻳﻀ ﺎ ﺗ ﻢ ﺣﺴ ﺎب وﻗ ﺖ اﻻﻗﺘ ﺮان ﺑ ﻴﻦ اﻟﺸ ﻤﺲ واﻟﻘﻤ ﺮ ﻟﻜ ﻞ ﺷ ﻬﺮ ﻣ ﻦ ﺳ ﻨﺔ ‪٢٠١٠‬‬
‫ﻟﺘﺤﺪﻳﺪ ﺑﺪاﻳﺔ اﻟﺸﻬﺮ اﻻﻗﺘﺮاﻧﻲ اﻟﻔﻠﻜﻲ واﻟﺬي ﻳﺴﺘﻔﺎد ﻣﻨﻪ ﻟﺘﺤﺪﻳﺪ ﺑﺪاﻳﺎت اﻷﺷﻬﺮ اﻟﻬﺠﺮﻳﺔ ‪.‬‬
‫ﺟﺎﻣﻌﺔ ﺑﻐﺪاد‬
‫آﻠﻴﺔ اﻟﻌﻠﻮم‬
‫ﻗﺴﻢ ﻋﻠﻮم اﻟﻔﻠﻚ واﻟﻔﻀﺎء‬
‫ﺣﺴﺎب ﺗﺄﺛﻴﺮ اﻻﺿﻄﺮاﺑﺎت ﻋﻠﻰ اﻟﻌﻨﺎﺻﺮ اﻟﻤﺪارﻳﺔ ﻟﻠﻘﻤﺮ‬
‫رﺳﺎﻟﺔ ﻣﻘـﺪﻣـﺔ إﻟﻰ ﻗـﺴـﻢ ﻋﻠﻮم اﻟﻔـﻠـﻚ واﻟﻔﻀﺎء‬
‫آـﻠـﻴـﺔ اﻟـﻌـﻠـﻮم‬
‫ﺟـﺎﻣـﻌـﺔ ﺑـﻐـﺪاد‬
‫وهﻲ ﺟﺰء ﻣﻦ ﻣﺘﻄﻠﺒﺎت ﻧﻴﻞ‬
‫درﺟﺔ ﻣﺎﺟﺴﺘﻴﺮ ﻓﻲ ﻋﻠﻮم اﻟﻔﻠﻚ واﻟﻔﻀﺎء‬
‫ﻣﻦ ﻗﺒﻞ‬
‫ﺣﻴﺪر رﺿﺎ ﻋﻠﻲ اﻟﻌﻠﻲ‬
‫ﺑﻜﺎﻟﻮرﻳﻮس ‪٢٠٠٤‬م‬
‫ﺑﺈﺷﺮاف‬
‫أ‪.‬م‪.‬د‪ .‬ﻋـﺒﺪ اﻟـﺮﺣـﻤـﻦ ﺣﺴـﻴـﻦ ﺻﺎﻟﺢ اﻟﻤﺤﻤﺪي‬
‫‪ ١٤٣٢‬هـ‬
‫‪ ٢٠١١‬م‬