 Check out the bookstore at IRBS.com |
|
|
|
|||||
|
||||||
Subject: Re: Converting a Lunar Distance to GMT
From: Arthur Pearson (arthurpearson@XXX.XXX)
Date: Sun May 11 2003 - 18:07:28 EDT
For fans of Bruce's tables, I am providing links to these supplemental
explanations (this being the second) on the Nav-L section of
www.LunarDistance.com. As a user of the tables and an enthusiastic
follower of how they were developed and how they work, I hope Bruce will
continue this series of postings about his tables.
-----Original Message-----
From: Navigation Mailing List
[mailto:NAVIGATION-L@XXX.XXX] On Behalf Of Bruce Stark
Sent: Monday, May 05, 2003 10:39 PM
To: NAVIGATION-L@XXX.XXX
Subject: Converting a Lunar Distance to GMT
Dan Allen, George Huxtable and others pointed out some time ago that the
cookbook explanations provided with my Tables for Clearing didn't
satisfy
everyone. Some people like to know more than just WHAT to do. It's a
good
point, and I finally began, in an April 28th posting, to deal with it.
This
is a continuation of that posting.
The next step has to do with converting a cleared distance to GMT. That,
in
turn, will lead to a discussion of the whys and hows of the Tables for
Clearing the Lunar Distance.
Until about ninety years ago the Nautical Almanac gave pre-calculated
comparing distances every third hour. Suppose you'd measured and cleared
the
distance between the moon and Regulus. You'd find, in the Almanac, the
two
tabulated distances of Regulus from the moon that your observed distance
fit
between. Then, proportioning change in time to agree with change in
distance,
you'd find what your watch would have read, had it been keeping
Greenwich
time, at the moment you measured your distance.
The Almanac doesn't give distances now, but it does give the GHAs and
declinations of the bodies for every hour. With an electronic calculator
and
the law of cosines for spherical triangles you can work out comparing
distances yourself.
But if you don't like to depend on electronics you'll need a more
refined
formula than the law of cosines. The cosine-haversine is ideal. You can
use
it with a set of nautical tables, such as Norie's, or those in the WW II
era
Bowditch.
Or, if you like, you can do the job with my Tables for Clearing. They
include
a form for entering the Almanac data and the functions you'll need from
the
Tables. Then, after you've calculated comparing distances, you can use
tables
7 and 8 to proportion for GMT. There are advantages to using the Tables:
1) You don't have to know anything about logarithmic calculation.
2) You don't have to interpolate, or do any other mental arithmetic.
3) The reliable precision will be slightly better, since nothing is lost
in
interpolation or in the conversion of logarithms to natural values.
The formula I use to calculate comparing distances is simply the
cosine-haversine. Fred has pointed that out. But the formula that clears
the
distance, and that led to the development of the tables, is more
complicated.
I had combined the old time sight formula with the cosine-haversine, and
was
trying to work it into an all-haversine equation. Three quarters of the
way
through a sheet of notebook paper the term (cos M cos S)/(cos m cos s)
appeared in the equation. Everything else was in haversines, and that
ratio
of cosines obviously had a narrow range of values. Might its logarithm
fit
into a table? Later I realized it already was in a table, the
"logarithmic
difference" table used with Dunthorne's, Borda's, and similar methods of
clearing.
Here is the equation. Since I don't know how else to indicate it in this
e-mail program, the phrase "sq. root of" will have to stand in for the
radical sign.
hav D = sq. root of {hav [d - (m ~ s)] * hav [d + (m ~ s)]} * [(cos M *
cos S
)/(cos m * cos s)] + hav (M ~ S)
I've already pointed out that you don't have to understand logarithms to
use
the Tables for Clearing. You don't have to know you're using logs. In
case
anyone is interested, here's a brief explanation of why:
The log of a number greater than one is positive. The log of a number
less
than one is negative. Nautical tables were designed to handle
calculations
that included a mix of positive and negative logarithms. Some
calculations
called for summing from three to six logs at once. Not handy if some
were
positive and some negative. So +10 was applied to everything that went
into
the trig-log table. That way all the logs could be treated the same. But
the
navigator had to discard and borrow tens to suit his calculation.
In the equation above only the logarithmic difference (the log of that
ratio
of cosines) and log haversines are needed. Both are always negative. So
is
the log cosine used to calculate comparing distances from the Almanac.
All
three are left negative. The Gaussian log, used to get past the + sign
in
front of "hav (M ~ S)," is always positive, so is subtracted. This
simplifies
matters, and saves figures.
I'll try before long to post something about the individual tables in
the
set.
Bruce
|