Celestial Air Navigation Text
Transcript of Celestial Air Navigation Text
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Celestial Air Navigation Text, Office of the Chief of the Air Corps, 1937, Randolph Field
Printing Office - March 1, 1937 3500
http://www.b26.com/page/celestial_air_navigation_text.htm
CELESTIAL AIR NAVIGAT10N TEXT
Prepared under the direction of the Chief of the Air Corps1937
TABLE OF CONTENTS
Chapter Page
I. Definitions and the fundamentals of celestial navigation . . . . . . . . . . .1
II. Position circles. The astronomical triangle and its reduction . . . . . . .11
III. Time and the nautical almanac . . . . . . . . . . . . . . . . . . . . . . . . . . . .21
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IV. The sextant and the errors of observation . . . . . . . . . . . . . . . . . . . 41
V. Position lines and their use . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 53
VI. Precomputed curves; simultaneous star altitude curves;
change in altitude tables; other reductions. . . . . . . . . . . . . . . . . . . . . . 59
VII. Star identification and the Rude Star Finder . . . . . . . . . . . . . . . . . 71
VIII. Latitude and azimuth by Polaris; compass swinging by celestial
azimuths . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 79
IX. Flight Preparation . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 83
FOREWORD
The following celestial navigation text is patterned after the course in this subject given by the19th Bombardment Group.
Since previous extensive training in the astronomy of navigation is seldom met with, liberties
have been taken in the matter of terminology when such have been thought desirable. It is
believed that the subject matter is so compiled as to eliminate the necessity of the usual index.
At the end of the first few chapters several usual questions are propounded and answered.
Sample observations using sun, moon star and planet, will be found after the last chapter.
Earlier will be found examples of the problems of computing sidereal time and of obtaining
latitude and azimuth from Polaris. All of these will be found useful references for the student
when difficulties are encountered in such problems.
The subject of time is most difficult for the beginning student in navigation. It is presented in
an entirely original manner in this text. Every effort has been made to remove many of the
usual obstacles. Let this not be interpreted to mean that the subject, as here presented, will be
mastered easily. Regardless of the method of presentation, the subject of time will be found
difficult.
Increasing demands for greater accuracy in aircraft sextant observations will doubtless result
in the development of satisfactory averaging devices for existing bubble and pendulum
sextants and the development of gyroscopic sextants, both of which will yield a sufficientlyaccurate single observation. This is the greatest need in celestial air navigation at present.
Several mechanical computers are on the market. It is argued that these will reduce the
number of arithmetical mistakes made in hurried reductions common to air navigation. Such
devices do not eliminate the necessity of using the almanac. However, the incorporation, in a
computer, of certain almanac data is certainly within the realm of possibility. On the other
hand, years of navigation practice have been responsible for the development of many
excellent tables and booklets that will be difficult of replacement by mechanical means.
Regardless of the path the navigator chooses to follow in his selection of equipment, tables,
computers, etc., nothing will be found to have the general utility and the value of a thorough
understanding of the fundamentals of navigational astronomy. Such a knowledge can comeonly from study and practice. The purpose of this text is to aid the beginner in the former.
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CHAPTER I
DEFINITIONS AND THE FUNDAMENTALS OF CELESTIAL NAVIGATION.
An understanding of several terms used, frequently in celestial navigation is necessary beforethe general principles upon which the art' is based may be studied. A knowledge of the terms
used in D. R. navigation is assumed, and only those needing special clarification or emphasis
will be touched upon in this chapter. The definitions - and usages of the necessary D. R. terms
are fully covered in Chapters I to IV, Hydrographic Office Publication #9 (The American
Practical Navigator, Bowditch), which publication should be a part of every navigator's
equipment.
THE EARTH. The earth is an oblate spheroid, being a nearly spherical body slightly flattened
at the poles; its equatorial axis measures about 7,927 statute miles and its polar axis, around
which it rotates, about 7,900 statute miles. For the purpose of navigation the earth is regarded
as a true sphere equal in area to the area of the surface of the earth. No material error resultsfrom this assumption and the "mean sphere" will be assumed in all future references to the
earth.
NAUTICAL MILE. The nautical mile is one minute of great circle arc on the earth's surface.
It measures 6,080 feet and subtends one minute of angle at the center of the earth. Since
latitude is measured along great circles on the earth's surface passing through the geographical
poles, one minute of latitude therefore equals one nautical mile. Unless otherwise stated the
term mile hereafter will imply the nautical mile.
CELESTIAL SPHERE. The celestial sphere is an imaginary spherical surface of infinite
radius which has as its center the observer's eye or the center of the earth, the two being
coincident because of the celestial sphere's magnitude. To an observer on the earth's surface
the heavenly bodies, interspersed in space at various distances from the earth, appear
projected upon the celestial sphere at points where the lines joining them with the observer's
eye intersect the sphere. An observer conceived to be at the earth's center and looking through
its solid. substance not only would see the heavenly bodies projected onto the celestial sphere
but in addition would see the imaginary points and circles on the earth's surface (the
geographical poles, meridians, equator, and parallels of latitude) projected onto it. The
imaginary terrestrial points and reference circles thus projected to the celestial sphere
constitute the celestial reference markings. The only purpose the celestial sphere serves is that
it enables a substitution of spherical triangles to be made for solid angles in the necessarytrigonometrical solutions.
HORIZON. The horizon generally used in aerial navigation is determined by a bubble, ball, or
pendulum in the observer's instrument. The horizon these devices determine is a plane passing
through the observer's eye, perpendicular to the vertical at his position. This horizon will be
assumed in future references unless otherwise qualified. The visible horizon is that line
appearing to an observer at sea to mark the intersection of earth and sky.
ALTITUDE. Altitude is the least angular elevation of a body above the horizon at any instant.
ZENITH. The zenith of an observer on the earth's surface is the point of the celestial spherevertically overhead.
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ZENITH DISTANCE. Zenith distance of a body is its angular distance from the observer's
zenith. It is the complement of the body's altitude.
AZIMUTH. The azimuth of a celestial body is its bearing measured from the true north or
south point. It is measured 180 degrees to the east or west.
GEOGRAPHICAL POSITION OF A BODY. The geographical position of a celestial body is
a point on earth's surface which is exactly under the given heavenly body at any one instant.
An observer at the geographical position would find the corresponding body exactly at his
zenith.
FIGURE I.
Let an observer on the earth be at the geographical position of a heavenly body, as at A, in
Figure 1. At this position the particular body and the observer's zenith are apparently one.
Since the celestial bodies (with one exception for the present) may be assumed to be at an
infinite distance from an observer on the earth, the particular body being considered will be
seen in the same direction in space when the observer has moved to position B, 1800 nautical
miles from A, measured along a great circle on the earth. At position A the altitude of the
body obviously is 90 degrees and its zenith distance 0. At position B, though the body appears
in the same direction in space, its altitude and zenith have changed, this being occasioned bythe shift in the positions of the observer's zenith and horizon resulting from his change of
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position.
From the definition of 'nautical mile, the Great Circle are joining A and B subtends an angle
of 1800 minutes, or 30 degrees at the earth's center. The change in the position of the
observer's zenith after moving from A to B obviously is 30 degrees since the radii OA and
OB, bounding the 30 degree angle at the earth's center, when prolonged, intersect the celestialsphere at the zenith of the two positions.
A study of Figure 1 shows that when the observer is at position B the body's zenith distance is
1800 minutes of angle (or 30 degrees); this equalling, exactly, the number of nautical miles
the observer is removed from the point vertically beneath that celestial body, that is, from its
geographical position.
An observer situated at the geographical position of a particular heavenly body could move
1800 miles away from that position along any one of an infinite number of great circles
radiating from that position. Consequently, there must be an infinite number of points on the
earth from which the body's zenith distance would measure 30 degrees (and its altitude, 60degrees) at the same instant. Test would soon indicate that all these points lay in a small circle
of exactly 1800 nautical miles radius, having the geographical position as its center; and apart
from such tests it is apparent that, if the earth be a sphere, this must be the case. Such a circle
is known as a position circle; an observer being at all times situated on one of the position
circles of every heavenly body visible from his position.
Altitude and zenith distance are two terms used very frequently in celestial navigation. It is
vitally necessary that their meanings be clearly committed to memory. Also, they must be
associated so completely that the mention of one term automatically calls the other to mind. It
is the altitude of a heavenly body that is always measured, and not its zenith distance. Yet it
will be seen from later subject matter and illustrations that it is the zenith distance which is a
part of the astronomical triangle that is solved in each problem. It must be automatically
realized that when the celestial triangle is solved for the computed zenith distance, the
corresponding computed altitude is available, or that when the altitude is found by
measurement with the sextant the corresponding "measured" zenith distance is available.
Though no visible star exactly marks the position of the north celestial pole (Polaris is roughly
one degree removed), let it be assumed for the present that one does. An observer who finds
the altitude of the star now marking the exact position of the celestial pole to be 90 degrees
would know himself to be situated at its geographical position, the north terrestrial pole. The
observer's latitude clearly is 90 degrees and the zenith distance of the celestial pole 0 degrees,thus:
Latitude Zenith Distance Altitude
90. . . . .0. . . . . . . . . . . .90
Now let the observer move 600 miles (nautical) away from the pole along a great circle.
Substituting the terrestrial pole for A in Figure 1 and redrawing the figure so that the
observer's new position is 600 miles or 10 degrees from the pole, it becomes apparent that the
following figures are correct for the coordinates under which they are written:
Latitude Zenith Distance Altitude80. . . . .10. . . . . . . . . . .80
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If the observer moves to the earth's equator in 600 miles, or 10 degree increments, the
following tabulated values are obviously correct for the three coordinates:
Latitude Zenith Distance Altitude
90. . . . .0. . . . . . . . . . . .9080. . . . .10. . . . . . . . . . .80
70. . . . .20. . . . . . . . . . .70
60. . . . .30. . . . . . . . . . .60
50. . . . .40. . . . . . . . . . .50
40. . . . .50. . . . . . . . . . .40
30. . . . .60. . . . . . . . . . .30
20. . . . .70. . . . . . . . . . .20
10. . . . .80. . . . . . . . . . .10
0. . . . . .90. . . . . . . . . . .0
If the reader is at all dubious as to the correctness of the above tabulated figures, he shouldconvince himself of their correctness by drawing several figures similar to Figure 1,
substituting the terrestrial pole for position A and altering the great circle are AB to
correspond to the observer's distance from the pole. When satisfied with the above figures, the
Zenith Distance column should be covered and the remaining columns compared comparison
of the Latitude and Altitude columns reveals an astronomical axiom that should be committed
lastingly to memory; namely, that the "Altitude of the Pole equals the Latitude of the
Observer". This axiom is rigorously true as a moment's consideration will make apparent.
Every mile the observer moves away from the pole; that is, each latitude change of one
minute occasions a change of one minute of angle, or arc, iii- the celestial pole's altitude and
zenith distance, the former decreasing and the latter increasing when the observer moves
away from the pole. If the observer moves toward the pole, the reverse is true. These facts can
be readily seen if Figure 1 is carefully studied. In the southern hemisphere the rule still holds,
the southern celestial pole, however, being considered instead of the north. The reader should
satisfy himself on this point.
The axiom "The Altitude of Vas Pole equals the Observer's Latitude" was used unconsciously
in sea navigation by many early peoples, - the Phoenicians, the Chinese, the Pacific Islanders
and others, though the earth was assumed by them to be flat and latitude, as we consider it,
unknown. However, the seafarers of these races were well aware of and acquainted with the
change in the appearance of the heavens with change in latitude. They were adept at
estimating the altitude of celestial bodies, by eye, to an astonishingly close figure. This abilityand aforementioned knowledge were combined to great advantage by these early seamen.
Steering well to the side of their destinations, these navigators would make good latitude,
north or south, until the pole appeared at the proper altitude, that of the destination. A course
toward the destination which would put, the pole abeam (an East or West course) would then
be steered, since experience and word of mouth had taught these people that when plying such
a course, the pole's altitude would not change. It was simple necessary to continue on such a
course until the destination was reached.
The Hawaiian Islanders made many remarkable trips to Tahiti and return in open outrigger
canoes (the distance between these ups is approximately 2,300 nautical miles) using their
unconscious knowledge of the latitude axiom as their principle navigation aid. Figure 2illustrates this.
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FIGURE 2.
It has been pointed out that a particular is small circle which connects all points on the earth
from which heavenly body is found to have the same altitude, or the same zenith distance. In
the special case in which the zenith distance is 90 and the altitude 0 degrees the position circle
is a great instead of a small circle. The geographical position of a heavenly body was said tobe the center of any position circle of that body; the zenith distance being its radius. From the
tabulated values used to point out the latitude axiom, it will be seen that at a latitude of 30degrees the pole's altitude is 30 degrees and its zenith distance 60 degrees. It is apparent that if
the altitude of the celestial pole is 30 degrees when measured from one point on the 30th
parallel of latitude it will be 30 degrees when measured from any point on that parallel. Since
the 30th parallel connects all such points, it is clearly one of the position circles of the north
celestial pole. If so, it must have the geographical position of the sky's pole, the terrestrial
pole, as its center. This obviously is the case. If a position circle, the 30th parallel must have
the zenith distance of the celestial pole as its radius. This, likewise, is apparent; the 30th
parallel being everywhere 60 degrees distant from the pole. Since the 30th parallel conforms
to all requirements; it must be a full-fledged position circle of the north celestial pole. Every
other parallel of latitude in the northern hemisphere conforms to the same requirements and is
a position circle of the north celestial pole; those of the southern hemisphere being position
circles of the south celestial pole. The equator alone, of these position circles, is a great circle.
Figure 2 shows, in terms of position circles, the method of navigation employed not only by
the Phoenicians, the Chinese, and Pacific Islanders, but by many sailing ships of
comparatively modern times. The pole was approached or left until its altitude was found to
equal the latitude of the destination. Thence an East or West course was sailed until the
desired landfall was made. In the sailing ship era instruments were, employed for altitude
measurements and the sun was usually used to determine, in a method later explained, theship's latitude. However, the landfall was frequently made by sailing along that parallel of
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latitude passing through the destination.
In the practice of navigation, though little limitation exists in the matter of selecting bodies to
observe, those at about 30 degrees altitude offer several advantages (to be pointed out later)
and are generally selected for observation when possible. It has been pointed out that the 30th
parallel of latitude is the position circle of a point in the sky (the celestial pole) whose altitudeis 30 degrees. Keeping in mind the fact that position 'circles of this size are most frequently
used a large scale conical map upon which this parallel appears should be consulted.
It should be noticed that the curvature of this parallel, and others near it, is very slight.
Consequently, a moment's consideration makes apparent the fact that a straight line may be
used to represent a portion of the position circle, a hundred mile length for example, with very
little error resulting from the substitution. A straight line thus used to represent a small portion
of a position circle is known as a "line of position" or "position line".
A position circle is generally a small circle. However, its radius is always a portion of a great
circle; whose length equals the zenith distance of the particular heavenly body or point. Theposition circles of the celestial poles, the parallel of latitude as has been seen, have as their
radii that portion of the terrestrial meridians included between the pole and the parallel. An
inspection of any globe shows that all meridians and parallels intersect at right angles and it is
quite evident from this that the radius of any position circle intersects that circle
perpendicularly. Further, it is evident that the radius that contains the observer's position
indicates the direction in which the observed body is seen from the observer's position. These
are not special conditions applying only to the family of position circles now being
considered. Imagine the meridians and parallels of either hemisphere, northern or southern, to
appear on a tight-fitting transparent hemispherical cap. It is obvious that the characteristic's of
the position circle family are not changed regardless of how the cap is slid over the surface of
the globe.
If the altitude of any visible heavenly body is observed and the geographical position of that
body located on the earth for the instant of observation, it should be apparent from the
foregoing that a position circle can be drawn on the globe, and that the observer is somewhere
on that circle. The zenith distance of the body, found from its altitude, is used as a radius and
the circle is swung from the geographical position of the body as a center. Figure 3 shows a
position circle drawn on the globe using the known geographical position of a heavenly body
and a zenith distance found from a measured altitude.
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FIGURE 3.
S is the body's geographical position and Z the position of the observer. Notice the angle A, at
the observer's position included between the observer's meridian and the radius of the position
circle. This is the azimuth of the observed body. The angle at the observer's position included
by the observer's meridian and the radius of the position circle is, when measured clockwise,
the bearing of the body measured from the north point on the observer's horizon. Thus the
angle A conforms to the definition of azimuth.
It is often thought, and erroneously so, that an observer can obtain his position on the earth
from an observation of one body, providing both the altitude and azimuth are measured.
Theoretically this is possible.
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Figure 4 shows a position circle drawn from a measured altitude and known geographical
position. The azimuth angles A and A', at two points on the circle, are indicated, and it should
be carefully noted that these angles differ in magnitude. From this it maybe seen that the
azimuth angle an observer measures changes as he travels around the position circle.
Consequently, having measured the azimuth, a point on the position circle could be found at
which the radius makes with the meridian at that point, angle equalling the measured azimuth.The intersection of the radius and position circle would then mark the observer's position.
Theoretically this is quite correct. It is not practical, however, for the simple reason that the
azimuth cannot be measured to the degree of accuracy required to permit such a procedure.
Since it is quite difficult for beginning students of navigation to grasp this fact, an explanation
of it will be valuable, and is warranted at this time.
Let the subject of terrestrial bearings in D. R. navigation be considered. From a theoretical
position, A, on a chart or map, as in Figure 5 let the bearing of a prominent object B be
determined. Suppose this bearing to be 60 degrees.
FIGURE 5
If a navigator actually measures the bearing of the point H as 60 degrees while flying, he is
obviously on the line AB, (prolonged if necessary). This line is plotted on the chart from point
B using the reciprocal of the bearing. Suppose the navigator in flight measures the bearing of
point B as 60 degrees but that his measurement is one degree in error; the actual bearing of
point B from his position being 59 degrees. The navigator plots line AB and believes himself
situated on the line. However, due to the erroneous bearing measurement, he is actually on the
dotted line. If the navigator's approximate distance from position B is 30 riles, then the
resulting error is 1/2 mile. (1 degree equals 1 mile in 60).
Much the Same situation exists in the case of celestial bearings, or azimuths, except that thenavigators position, instead of being only 30 miles distant from B (the geographical position)
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is several thousand miles removed. It is quite evident then that the error in position resulting
from an azimuth one degree in error is of considerable magnitude. Since even a greater error
must be expected in as azimuth measurement made in flight, an observation of a single body
will only tell the navigator that, he is on a certain position circle. However, if the altitudes of
two heavenly bodies are observed and their corresponding position circles are drawn, as in
Figure 6, the navigator plainly must be at their intersection. The intersections of any two suchcircles are so far apart that the D. R. will tell the navigator at which intersection he is situated.
FIGURE 6
If a globe of suitable scale could be carried, the practice of celestial navigation would consist
of measuring the altitudes of one or two bodies (two if available), of locating the geographical
positions for the instant of observation, and of drawing the one or more position circles.
Though only one position circle does not locate an observer on the earth, the information it
furnishes is quite useful and valuable as will be seen in later chapters. Intersecting position
circles, however, definitely locate the observer on the surface of the earth, since the D. R. can
always be relied upon to tell the observer at which of the two intersections he is situated.
When working with maps and charts of the scale commonly employed in navigation practice,
any such simple procedure as the above is out of the question. The navigator consequently is
forced to use a much more devious process.
QUESTIONS AND ANSWERS
Q... Why is the term "bearing" used in the definition of azimuth?
A... A bearing may be measured with a surveyor's transit or a horizontal graduated circle upon
which two vertical sights are mounted. It is readily realized that when using these iota the
elevation of the reference point, or the point whose bearing is being taken is of no concern;
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the magnitude of the bearing angle being independent of such consideration and only
dependent upon the angle through which the horizontal plate is rotated in sighting
successively on the reference and the point whose bearing is wanted. Thus, a bearing clearly
is an angle measured along the horizontal; along the observer's horizon, if the bubble or
pendulum horizon is considered rather than the profile of the observer's landscape. The term
bearing is used to impress the fact that azimuth is likewise independent of the elevation ofeither the reference or the point whose bearing is being taken; azimuth being the arc of the
horizon intercepted between vertical circles passing through the two points (the reference and
the body). The construction and use of a bearing plate, or surveyor's transit, implies "vertical
circles" without mentioning them.
Q:.. Which of the celestial bodies cannot be assumed to be at an infinite distance from the
earth?
A... The moon. The distance from the earth to the moon is but 239,000 statute miles. The neat
nearest celestial body, the sun, is 93,000,000 statute miles distant from the earth. The star
nearest the earth is 4 1/3 light years distant.
Q... Since the zenith distance of a body tells the observer's distance from the geographical
position of that body, why is it not measured instead of the altitude?
A... No definite point marks the position of an observer's zenith. The accelerations of both
surface and aircraft preclude positive indications of the horizontal or vertical by gravity
operated mechanisms (liquids, bubbles, balls, pendulums, etc.). The visible horizon (see
definition) is, on the other hand, quite positive and for this reason is always used when
possible, from both air and surface craft. Therefore, the early instrument builders quite
logically designed their instruments to measure altitude, since measurement was to be made
from the visible horizon. For uniformity of practice, artificial horizon instruments were built
to measure the same coordinate, though the gravity operated mechanisms of these instruments
indicate the vertical (or the observer's zenith) as well as the horizontal.
Q... Though the star Polar is does not mark the exact position of the north celestial pole, can
its altitude be used for latitude, as per the "latitude axiom"?
A... The altitude, of Polaris must be corrected before being taken as the latitude. The Nautical
Almanac provides very simple and handy tables for this purpose, the use of which will be
explained in a later chapter. The Rude Star Finder, also explained later, provides a quick
means of correcting the altitude of Polaris to permit its use for latitude.
Q... Was the celestial pole depended upon entirely by the early races for position and
direction?
A... No. The am and stars were used for direction and, in many areas; the constancy of the
prevailing, seasonal winds for the same purpose. The pole, however, was depended upon for
position; i.e., latitude.
In the atoll and island areas the natives were able to tell the direction of land by the visible
effect such land had upon the shaping of the ocean swells. Many travelers of the South Seas
have marvelled at the ability of the natives to unerringly point out the direction of land wellbeyond the range of vision after having been several days at sea; these natives having no
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knowledge of course or position.
Q... How is the geographical position of a heavenly body located?
A... The location of a geographical position of a heavenly body is a problem involving time
and the Nautical Almanac. These will be studied in a later chapter.
Q... Is the azimuth of a celestial body ever used?
A... Yes. The equivalent of a measured azimuth is frequently used to check a craft's compass
error. The accuracy needed in such work is not nearly that which would be necessary to locate
the observer's point on his position circle and, consequently, its use for compass work is
permissible and desirable. Also, the computed azimuth of a body is used to orientate the
position lines of that body; the position lines running at right angles to the azimuth. The
computed azimuth used for this purpose is exact (mathematically so) because it is calculated
for an exact, known location, which has been arbitrarily chosen. Qbviously, since such an
azimuth presupposes a known location, it cannot be used by the navigator to establish hislocation on his position circle. Such an azimuth would only locate the arbitrary point, if that
point were on a known position circle.
Q.. How much error is occasioned in locating a point on a position circle if the measured
azimuth to be used for this purpose is 1 degree in error?
A... While this is dependent upon several variables, an average figure is plus or minus 50
miles.