Turning the Universe Inside-Out.
Ulysses Grant Morrow's Naples Experiment.
by Donald E. Simanek

The hollow earth.

Certain incidents in history of science, even recent ones, have been forgotten, swept under the rug of history. Historians of science focus on some of those that were crucial turning points of scientific advance, such as the Ptolemaic planetary system, phlogiston and caloric, and the luminiferous ether. Others are ignored even by historians. Flat earth and hollow earth theories have suffered that neglect. Information about these is fragmentary, frustratingly incomplete, and in danger of being lost through neglect and decay of original source materials.

We are dealing here with ideas well out of the mainstream of the scientific developments that led to today's science—the science of textbooks. But non-mainstream ideas also have continuity, evolution and development. Some of these have great appeal to a certain sort of mind. Few ever completely die, but reappear in modified form. We will look at one such idea, the Cellular Cosmogony of Cyrus Reed Teed, which arose in the late 19th century, and still has adherents today. It envisions a universe that is an inside-out version of conventional cosmology, a universe with the earth outside, and everything else inside. At first look this seems so incredibly original that it couldn't have arisen from earlier ideas. Even more incredible is the fact that Teed asked his associate Ulysses Morrow to find experimental proof of the earth's concavity. Morrow did the experiment and found the result they sought. How could this happen?

Hollow Earth

Never mind what they taught you in geology courses about the inner structure of the earth. Nobody has gone inside to see what's there, have they?

During the 17th century scientists were seriously investigating the problem of determining the true shape of the earth and understanding the global variations in magnetic dip angle. As often happens, imaginative speculations arose far sooner than did understanding of the data.

Edmund Halley (1656-1742) Halley's Hollow Earth
From his 1681 paper.
Halley at age 80.
He's holding a drawing
of his hollow earth.

In 1692 astronomer Edmund Halley (of Halley's comet fame) published a paper titled An account of the cause of the change of the variation of the magnetical needle with an hypothesis of the structure of the internal parts of the earth: as it was proposed to the Royal Society in one of their later meetings. (Philosophical Transactions of the Royal Society of London 17:563-578).

Halley postulated that the earth we walk on is a hollow shell about 500 miles thick, with two inner concentric shells and an innermost core, about the diameters of the planets Venus, Mars, and Mercury. These sheels are separated by atmospheres, and each has its own magnetic poles. The spheres rotate at different speeds, thus accounting for long-term magnetic field variations. Halley did wonder whether clay and chalk beds of the outer crust are sufficient to prevent the oceans from leaking inside, but he was sure that "the Wisdom of the Creator has provided" some way to prevent this.

Halley even suggested that each sphere "might support life," because the spheres were bathed in perpetual light from a luminous gaseous atmosphere that filled all of the inner spaces. He even entertained the possibility of "more ample creation" within the earth, which might include suns.

When the Royal Society asked Halley to explain the exceptional auroral display of 1692, Halley wrote that it was caused by light from inside the earth. Newon's demonstration of the oblateness of the earth led Halley to suppose the earth's outer shell was thinner at the poles, allowing inner light to diffuse out, then scatter from the atmosphere, causing auroral displays.

Leonhard Euler
(1707-1783)

Some books and websites say that Leonhard Euler proposed a simpler hollow earth model. Some give details, but few provide a reference. One that does cites: Euler, Leonhard; Letters of Euler on Natural Philosophy, Vol 2, Letter LVIII, pp 202-203, 1835. However, that references his comments on an interesting mathematical problem: "If you drilled a hole all the way through the earth, and dropped a stone in the hole, what would happen?" It's a "thought experiment" and someone may have misread Euler, supposing Euler really thought there was hole all the way through the earth. Then others picked it up without checking sources.

Scottish physicist and mathematician Sir John Leslie (1766-1832) elevated the glowing core to the status of a sun, even suggesting that it might be a binary system of two "little suns", which he named Pluto and Prosperina. (The planet Pluto hadn't been discovered yet.)

We see here the origins of several ideas: (1) An earth shell structure, with spaces between the shells. (2) Suns within the earth. (3) Civilizations living on these shells.

John Cleves Symmes
(1780-1829).
Symmes' hollow earth.

An American, John Cleves Symmes (1780-1829) absorbed such ideas and brought forth his own version. His hollow earth had holes at the North and South Poles. Symmes proposed an expedition to find the North Polar hole and enter it, fully expecting to find animals and people inside the earth, living on five internal shells.

Of course he was ridiculed by those less imaginative than he. People made cruel jokes about the "Symmes Hole" or the "Symmie Hole" at the pole, suggesting that the real hole was in Symmes' head.

Americus Symmes.
Ripley-King Features.

A profound misunderstanding of gravity is present in all of these models, for they allowed the inside dwellers to live on either the outer or inner surface of each shell. Symmes assumed that a person could walk on the inside of the shell, feet away from the center, head toward the center, with the inner sun always directly overhead. He supposed that a ship sailing to the North Polar hole would simply sail around the rim of the hole and end up sailing on the ocean on the inside of the same shell, with its masts pointing toward the center. Inflamed with the possibilities of sailing inside he petitioned the U. S. Congress (in 1822 and 1823) to appropriate money for a Polar expedition. He was turned down (in one of the few instances where Congress showed good judgment in spite of not understanding the issue). Late in his life he attempted to join a Russian Polar expedition, but could not raise the fare to the departure port of St. Petersburg. That's too bad. His theory was already popular in Russia.

John Symmes died in 1829. His grave was the closest he got to the inside of the earth. John's son, Americus Symmes, had a monument erected over the grave, with a hollow earth model at its top. Restored in 1991, this monument still stands in the center of fourth street park in Hamilton, Ohio, just South of the business district.

Readers today may be surprised to learn that in the 19th century a variety of views about the shape of the earth still existed and competed. Zetetic (flat-earth) societies, formed in the 18th century, were still flourishing in the 19th century. Flat Earth organizations actively argued their case and even supported experiments to prove their point. The famous Old Bedford Canal experiment of 1870 tested the "flatness" of the water over a four mile straight stretch of the Bedford Canal. [5] The flat earthers proudly proclaimed that the result confirmed their assertion of the flattness of still water surfaces (and the entire earth). Alexander Gleason, a civil engineer from Buffalo, NY, experimentally established the flatness of the surface of Lake Erie, at least to his own satisfaction. He published his results in Is the Bible from Heaven (1890) and Is the Earth a Globe? (1893).

In the last decades of the 19th century diverse models of the earth and heavens were actively promoted. Isaac Newton Vail proposed an annular theory to account for the formation of the earth and planets, but assumed a convex earth. The Gillespian theory put the earth and sun in fixed positions, allowing the earth to rotate. A "conic" theory modeled the shape of the earth as something like a cone, its base being the North polar region, and its apex at the South pole. There was even a small publication titled The Square World promoting an earth shaped as an inverted soup bowl, the Northern hemisphere being about as we know it, but with the Southern Hemisphere flaring out to a larger rim. It's a mystery why the author describes it as "square", but it has something to do with the Biblical reference to "the four corners of the earth".

Cyrus Reed Teed
(1839-1906)
The Koreshan Unity Foundation.

Not everyone accepted the results of the experiments intended to determine the shape of the surface of water. Some thought the earth's surface was convex (the view most folks accept today), and still others thought it concave (like the inside of a bowl).

Cyrus Reed Teed (1839-1908) was an alchemist from Utica NY, practicing "eclectic medicine" in the 1860s. His alchemy experiments convinced him that the universe was all of one substance. Shortly after, in 1869, he received a spiritual "illumination" from "The Divine Motherhood", who told him the nature of the universe and everything. This confirmed Teed's suspicion that the conventional view of the earth within the universe was wrong—that the earth was actually outside and all the rest was within. She told him to redeem the human race and carry on the work of Jesus as a "New Messiah." Part of his task was to unify science and religion.

Flat earth and hollow earth ideas are almost always associated with religious convictions, and their proponents have always been able to cite Biblical foundations for their ideas, whichever model they promote. On an emotional level, many people are uncomfortable with the vast and unimaginable size of the universe as described by conventional science. They prefer a smaller cosmos, with everything nearby. What possible use could the creator have for all that stuff so far away from us? How wasteful to create all that vastness just for us to admire on a starry night.

The flat-earthers earth was a round flat pancake with a sun only 2000 miles away and only 32 miles in diameter. To account for variation of the angle of incidence of sunlight on the earth's surface, they had to assume severe bending of the path of light rays.

Somehow many of these ideas converged into Teed's Cellular Cosmogony.

The Cellular Cosmogony.

Out of this came Teed's model of the universe—an inside-out universe. It was described in his 1898 book, The Cellular Cosmogony. [2, 3]

Cyrus Reed Teed's Cellular Cosmogony.


Teed's universe occupies a "Hollow cell" in solid rock, 8000 miles in diameter. We live and walk on the spherical inner surface of this cell, our heads pointing toward its center. The entire universe that we "see in the sky" lies within this cell, cradled "in the hands of God." Inside this earth-shell there are three atmosphere shells: air, hydrogen, and aboron.

The cause of day and night.


At the center is the sun, an invisible electro-magnetic battery in the form of a helix, rotating on a 24 hour cycle. It also has a precessional movement of 24,000 years, accounting for the precession of the equinoxes. (Teed certainly tries to make this a model capable of explaining everything.) With the sun at the center, it is one of the few cosmological models that is both heliocentric and geocentric! [The other is the Gillespian theory.]

Light travels in curved paths.

We do not see the sun directly; its rays bend by refraction and "focalize" twice. We see the second focalization at the top of our atmosphere.

In this universe, light rays take curved paths to reach the earth. Such paths are clearly required to agree with the observed apparent differences in position of the sun in the sky at different places on earth.

The sun is half dark, half light, and its rotation gives the illusion of sunrises and sunsets, night and day and seasonal variations in the apparent position of the sun. The back, or "dark" side, of the sun emits light from many points at which energy is generated. These focalize and are seen as the stars.

Due to turbulence and aberrations in the atmospheres the focalizations of light are sometimes imperfect or blurred. These appear as nebulae. Comets are reflections of the sun's rays through lenticular reflections and refractions from belts of tiny crystals around the central solar sphere. The sun is like a huge eye, with an iris. The iris is visible only when the atmosphere has refractive prismatic influences. Then we see the sun's iris as a rainbow.

Planets and moon are illusions.

Describing this model is made difficult because words such as "inner" and "outer", and "under" and "above" have meanings opposite to what we are used to. The planets are disks floating between the metallic layers of the earth's crust (in the rock shell that we walk upon). This part of the earth shell is only 100 miles thick and has 17 layers. The outermost (greatest radius) 7 shells are metallic, the gold layer having the greatest radius. The next 5 are mineral. The next five are geologic strata. Teed's background in alchemy certainly influenced this part of his model.

The moon, planets, and stars that we think we see in the sky are illusions within the hollow cell within the rock shell. We can't see to the other side of the hollow earth's surface, because of the intervening dense atmospheres. Gravic rays emanate outward from the sun, holding us onto the earth crust and accounting for effects heretofore attributed to gravity. (Take that, Newton!) Levic rays, something like X rays, are produced when Gravic rays reflect from the metallic mirror-like planet disks. Levic rays project toward the center, onto the hydrogen sphere, and unite with gravic rays to produce light. This light travels outward, focalizing several times, forming a final focalization at the top of our atmoshpere that is a virtual image, which we see as the planet. But it is only an illusion. Gravic and Levic rays apparently don't refract much, but light refracts a lot in Teed's cosmology.

The moon is also a focalization of this kind, but it is an image of the entire earth's crust. The features we see on the moon are something like an X-ray of all the geologic strata in the crust of the earth.

Quantum mechanics is much simpler to explain! Much of the detail of Teed's explanations of his model seems motivated by critics, who insisted he account for the daily, seasonal and long-term variations of the position of the sun. Much less attention was paid to other questions not asked. For example, if the stars are focalizations of sunlight formed in the gaseous atmosphers, then why are the star's apparent positions so stable with respect to each other? They are so stable that we can describe their pattens as constellations and make maps of them. Yet the sun's position with respect to the stars changes by large amounts throughout the year.

We see in Teed's Cosmogony a melding of many ideas of earlier origin. His universe had an earth shell with sun inside, and we live on the inside of this shell. This is much like Euler's hollow earth idea. The extreme curvature or refraction of light is much like that assumed by the flat-earthers, and served the same purpose: to make astronomical observations fit the model.

Such a model of the universe would seem to be so bizarre that it could only have arisen once. But apprently others claimed to have had similar revelations. Consider the 1882 pamphlet by G. L. Burnside, titled Extraordinary Revelations. Burnside (a spiritualist medium) had a revelation, during a seance in 1856, of the true geometry of the earth and the universe. It is a universe in which the earth has shells within, some possibly inhabited. The earth is surrounded by a hollow shell of rock, but the planets, sun and stars are all illusory images moving on this shell surface, like lantern-slide projections on a screen. Burnside mentions that J. Thomas of England promoted a similar model. This is rare. Proponents of such eccentric views seldom credited others.

And in 1871 a book appeared by Prof. Wm. F. Lyon titled The Hollow Globe; or The World's Agitator and Reconciler. It describes scientific information given to him over several months in 1868 from M. L. Sherman, who was in turn getting it from the spirit world in bits and pieces.

So who was first with this eccentric idea? Burnside says he got the idea in a seance in 1856, though his book appeared in 1882. He acknowledges that J. Thomas had similar ideas earlier. Lyon's indirect communication with the spirit world was in 1868. Teed says his "illumination" came from the female half of the Godhead, the "Divine Motherhood" in 1869. Who knows what earlier roots this idea had that we simply haven't sumbled upon yet?

We see in these models elements similar to those of Teed's model, but Teed's inside-out inversion of the earth and cosmos was probably the most fully developed (though nearly incomprehensible) version. Earlier hollow earth models of Halley and Symmes had the possibility of people walking inside the earth shell, with sources of light and heat also inside. Teed put us inside, along with the sun, moon, planets, and everything else in the universe.

Put it to experimental test.

Ulysses Grant Morrow
(1864-1950)
The Koreshan Unity Foundation.

Teed established the Koreshan Unity, a small communal society that taught the importance of celibacy, and of a correct understanding of the shape of the earth and universe—Teed's "Cellular Cosmogony". Teed adopted the name "Koresh", the Hebrew version of his given name "Cyrus", and the society was known as the Koreshan Unity. The Koreshans established a communal home in Chicago in 1886.

Ulysses Grant Morrow, a newspaper editor, writer, poet, inventor, and geodesist, held views of cosmogony similar to Teed's, and Morrow joined the Koreshan Unity in Chicago. Teed wanted "scientific proof" of the shape of the earth, preferably experimental proof. Morrow took on the task of supplying it.

On July 25, 1896 Morrow made observations on the Old Illinois Drainage Canal, sighting a target 18 inches above the water surface and 5 miles away, with a telescope elevated 12 inches above the water. According to accepted values of earth curvature, the target should have been over 9 feet below the line of vision, but it was clearly visible in the telescope. Morrow considered this "the most unmistakable evidence of the water's non-convexity."

Morrow made similar sightings on August 16, 1896 from the shore of Lake Michigan at the World's Fair Grounds. Sloop yachts were sighted at 12 miles from shore, from a pier 10 feet above the water. With low power opera glasses, the sails and masts were clearly visible, but the hulls were below the visible water surface. With a 50 power telescope the hulls were clearly visible. Sightings were also made with the telescope 30 inches above the water. According to conventionally accepted curvature of water, the hulls of the boats would have been 60 feet below the surface. Seven other sightings were made from Roby, Illinois on Aug 23, 1896, with similar results.

These experiments were easily dismissed by critics as simply due to atmospheric refraction. Morrow sought a more convincing method for measuring water surfaces, one that would not use light.

Teed's plans for a
"New Jerusalem".
The Koreshan Historic Site.
Illusions of light.

In 1894 the Koreshans moved to 300 acres of land in Southern Lee County, Florida to found their visionary "New Jerusalem" settlement. Morrow moved there with them. At this time Morrow and Teed were both engaged in trying to muster evidence for the Cellular Cosmogony, partly to convince critics. Thus was born the famous "Naples experiment".

Previous experiments had convinced Morrow and Teed that views of distant objects are partly due to an "illusion of perspective". They sought a method for measuring the earth's curvature that would not be subject to such "errors". Morrow conceived such a method—to establish a physical straight line to compare with a water surface. He imagined a number of perfect and rigid solid rectangles placed end to end to establish a perfectly straight row, and therefore constitute a perfectly straight reference line, independent of telescope or visual sighting methods.

The Koreshan Geodetic Survey of 1897.

Morrow refined the notion of solid rectangles with something more practical. He replaced each rectangle with a "rectilineator" of his own invention. It was a wooden structure 12 feet long, 4 feet wide, made of 19 year old seasoned mahogany. Steel bars provided cross-bracing between brass fittings at each corner. These brass parts were precisely made to allow each rectilineator section to be aligned precisely with its neighbors, then bolted together firmly. At least 4 sections were made, by the Pullman Railroad Car Company. Only section No. 2 survives.

Near Naples, Forida is a four mile north-south stretch of nearly straight beach—ideal for the experiment. At this time Florida was still a "frontier", sparsely settled with large areas of virtually untouched wilderness teeming with alligators, snakes and many biting insects. The summers were hot and humid. It is much the same today, except that it also has beach houses, condominiums, malls and tourists.

Morrow's drawing of the rectilineator. Morrow's rectilineator.
The only surviving section
at the Koreshan Historic Site.

The rectilineator sections were each supported by two "standards"—vertical beams resting on "footpads" anchored on the beach. The first rectilineator section was carefully leveled, using a 12 foot long mercury level designed by Morrow, a standard calibrated spirit level, and a 4 foot plumb bob that could be placed at each end of a rectilineator section. The next section was aligned approximately with the first, then precisely positioned until the facing brass surfaces would just allow insertion of a celluloid card at each corner. When all was perfect, the sections were bolted together, and the process repeated. After all of the available 12 foot sections were in place, the first one was carefully removed, inverted top/bottom and relocated at the other end of the line, to compensate (average out) errors due to any slight initial error in parallelism of the cross beams.

Data were recorded each 1/8 mile. But every 12 feet the vertical distance between a reference mark on the rectilineator and the mean water level was noted. [Very likely the spirit levels and the plumb line were checked also, each time a 12 foot rectilinear section was put into place.] If the earth were convex, this distance should increase as the land line progressed southward. If the earth were flat, the distance should remain constant. If the earth were concave the vertical distance should decrease with the horizantal distance southward. Moreover, for a convex earth, the vertical distance should change slowly at first, then more rapidly as the line progressed southward.

The measurements of mean water level would seem to be a weak point of the experiment. The rectilineator line was on the beach. The water level needed to be determined in the water. This was done with caissons in the water. These damped out fluctuations due to waves sufficiently that a very accurate determination of a steady water level could be made. These were of course corrected for the continual tidal variations during the day and over many days. The water level at the caisson was "transferred" to the land line by telescopic sightings over the relatively short distance from beach to caisson. Over these distances, error due to light ray curvature was considered negligible, and these sightings were perpendicular to the 4 mile N/S land line. Besides, any such curvature error should be the same for every measurement, and would not affect the results. One caisson remained in place at the starting point, and changes in the water level there were continually monitored.

Part of the land line assembled.  Survey team and spectators pose for the picture.
Morrow is the short fellow in the black creased hat near the center. Photo: The Koreshan Historic Site.

Morrow kept a notebook of data. Each measurement was checked by several persons and initialed by them. Morrow said he "directed and tested every Adjustment and Measurement of the entire Survey, and personally checked same in Record Books." These record books may have survived, and may reside in the un-catalogued archive materials at the Koreshan Unity Foundation Museum and Library, but have not been located at the time of this writing. We do have a very full account of procedures, and a table of data every 1/8 mile, in Part II of Teed's Cellular Cosmogony, written by Morrow. This includes data from the spirit level, the mercury level, horizon sighting, the plumb bob, and, of course, the elevation of the rectilinear line above mean water level.

A systematic error?

All of these suggest that the error is not in the water level measurements, nor in the actual shape of the water surface, nor in tidal variations (which were taken into account properly). If an error is present, it is in the actual rectilineator, or in the procedure of positioning and securing the rectilineator segments.

                                   Calculated
Date   Dist.   Height    Height    ratio of   Radius   Dev.
1897   (miles) above     below     curvature  (miles)   %  
               datum     2nd       (inches)
               (inches)  datum (in)
 
Mar 18   0.000   128.000     0.000 
    19   0.125   127.850     0.150     0.020  3300.0  -18.5 
    23   0.250   127.740     0.260    -0.352  7615.4   88.0 
    24   0.375   126.625     1.375     0.568  3240.0  -20.0 
    25   0.500   126.125     1.875     0.625  4224.0    4.3 
    27   0.625   124.125     3.875     2.650  3193.5  -21.2 
    30   0.750   123.675     4.325     3.048  4120.2    1.7 
    31   0.875   121.570     6.430     4.583  3772.2   -6.9 
Apr  1   1.000   119.980     8.020     6.172  3950.1   -2.5 
     2   1.125   117.875    10.125     8.355  3960.0   -2.2 
     8   1.250   116.440    11.560     9.468  4282.0    5.7 
     9   1.375   113.690    14.310    11.625  4185.5    3.3 
    13   1.500   111.070    16.930    13.680  4210.3    3.9 
    14   1.625   107.190    20.810    17.620  4019.9   -0.8 
    14   1.750   104.690    23.310    20.560  4162.2    2.8 
    15   1.875   101.690    26.310    22.655  4233.2    4.5 
    16   2.000    97.380    30.620    26.495  4138.5    2.2 
    24   2.125    93.440    34.560    28.530  4139.3    2.2 
    26   2.250    85.320    42.680    35.835  3757.7   -7.2 
    27   2.375    79.750    48.250    42.590  3703.5   -8.6 
May  8   2.500    74.000    54.000    48.125  3666.7   -9.5 
     8   2.625    68.000    60.000    54.500  3638.3  -10.2 
     8   2.750    63.000    65.000    95.000  3685.8   -9.0 
         . 
     8   3.000    53.000    75.000            3801.6   -6.1 
         ....
     8   4.125         0   128.000            4211.4    4.0

Average of the signed deviations: -3x10-14 %
Earth's radius, averaged from 1/8 mile curvatures: 4050.5 mile 
Average deviation of data values from the mean:    10.2 %
Average deviation of the mean:                      2.1 %
Modern value of earth's radius:                    3963.5
Discrepancy:                                        2.2 % 
Ulysses G. Morrow's Naples Survey Data.
The first four columns are from The Cellular Cosmogony (1898). The last three columns, and the summary results below,
have been added, newly computed from the Morrow data.

These five independent measures are consistent, within the expected measurement errors. They show the expected decrease of height, the expected shift of the plumb line southward, the expected movement of the spirit level bubble northward. These measures changed slowly during the first mile, and changed more rapidly the farther south the line extended. All these are consistent with the assumption of a convex earth.

Even more remarkable is the fact that the results were consistent with an earth circumference of 25,000 miles. Looking at the data with more modern techniques of data analysis than the Morrow team used, the data show that value to have an experimental uncertainty of a bit over 2%. It differs from the modern value by only about 2% also.

The fact that the average of the signed deviations is so small indicates that the individual values fluctuate about equally above and below the mean. This is an indication that the data is reasonably normal, and the distribution of random errors isn't skewed. While the individual values fluctuate about 10% from the mean, the average deviation of the mean is only about 2%, benefitting from the process of averaging 24 values. This "average deviation" measure is comparable, as a measure of "goodness of the result, to the standard deviation of the mean, a measure more commonly seen in research papers today.

So far, looking only at the data, this would seem to be a good experiment, with measurement uncertainties consistent with the instruments and methods used. But there's that nagging sign of the curvature: concave instead of convex. And that makes a huge difference. If the sign is negative, it effectively turns the whole universe inside-out.

Scientists, and especially students, know the frustration of trying to find the source of a "sign error" in a complicated mathematical derivation, or in the analysis of an experiment. This Naples experiment presents just such a challenge, complicated by the fact that now, over a century since it was carried out, it is a very "cold case".

The Koreshans fully expected the value of 25,000 miles, in agreement with that of conventional geodesy. Why? One conventional way to measure the curvature of a land surface is to use sighting instruments between points in a net of triangles. A large net of this sort can distinguish between a flat and a curved surface, and can measure the radius of a spherical surface. But it cannot determine the sign of curvature. The triangle net would have the same structure and angles on the outside surface of a sphere as it would on the inside surface of the same radius sphere. Thus Morrow could generally accept the results made by geodesists of many countries using these methods. But he simply disagreed on the sign of the curvature.

I see no evidence of fraud or "data cooking" here. So, if we think the result is in error, what caused that error? If the error isn't a result of cumulative "random" error, it must be due to a systematic (consistently repeated) error of measurement or procedure.

This motivates us to look again at the rectilineator itself. Morrow assumed that it was a rigid body that simulated a perfect rectangle, and when adjusted to that condition, it remained in that condition throughout the experiment. A casual look at it gives the impression that it was designed for maintaining its geometry. Those steel cross braces look as if they were intended to provide rigidity and preserve that geometry.

Morrow says that the steel rods were there to allow initial adjustment of parallelism of the 4 foot cross beams at the ends of the rectilineator. In fact, adjustment of the rods will alter that condition by small amounts and allow one to achieve a high degree of parallelism initially. The rod tension acts against the tension in the mahogany structure. The rectilineator sections were flipped top/bottom each time they were reused, which might be expected to average out any slight and unnoticed lack of parallelism over the whole span of 1045 sections. This seems to be good experimental procedure.

The rectilineator isn't as rigid as it looks.

But there's no such thing as a perfectly rigid body. Bodies flex and warp under load, even under the load of their own weight. A horizontal beam suspended or supported at its center will bend so that the ends droop downward. This can be minimized by suspending or supporting the beam at two points, carefully located. Even then the beam bends somewhat, but in a way that doesn't affect the parallelism at each end. Knowing the materials and the dimensions of the parts, these points can be calculated precisely. Was that done? Morrow doesn't say.

The rods don't attach firmly.
Photo from the Koreshan Historic Site.

The rectilineator sections were supported by standards at two points. Photographs and drawings show the standards in place, and they are consistently placed. And they are wrong. Calculation made from the photos, and from Morrow's drawings, shows that the points are both about 2.6 inches too close to the center of the rectilineator. This would allow the ends to sag downward.

The support points the Morrow team used would have been very close to the correct points if the four 45 degree wooden braces weren't present. Those braces make the ends heavier. One might wonder whether those braces were an afterthought, after the experimental design had been completed. But that can only be speculation without more information than we have in hand.

What about the initial carefully-established parallelism of the cross beams? Those steel cross rods do not connect to each other where they cross, and are secured to the wood center beam with 8 short wood screws no longer than 3/4 inch! Such a structure will be no more rigid than if the rods weren't there. In fact, if the main beam bends, the cross beams will move out of parallelism and the rods won't prevent that, because the rods will go slack.

Ends aligned. Cross rods go slack
as ends are misaligned.

These photos of a scale model rectilineator show that the cross rods do not contribute to rigidity. The end cross beams easily move out of alignment, and the more they depart from parallelism, the slacker the rods become.

Rigid beam. Ends aligned. Flexible beam bends under its own weight.
Ends are misaligned.

This model is a better simulation of the Morrow rectilineator. In the first photo the horizontal beam is made rigid with a steel strip bolted to it. In the second photo nothing is changed except the steel strip has been removed, and the thin plastic horizontal plate allowed to sag. The cross braces go slack again.

The effect of bending accumulates.
But all instruments agree.

Even if the rectilineator had been designed properly, and as rigid as good engineering design would allow, the structure would still not be perfectly rigid. The error in the support point locations would still result in the ends sagging downward. But the fact that the rectilineator design allows unnecessary non-rigidity suggests that Morrow and his team did not consider rigidity an issue. Nowhere in the available accounts is this mentioned as a possible source of error to be dealt with. Nor did critics of the experiment suggest that possiblilty.

Inverting the rectilineator section top/bottom doesn't help either, for the structure will still sag in the same sense, with ends drooping. Could this be the systematic error that accounts for the results? With the materials used in the rectilineator, the sag can't be very large. But a sag of only 0.000003 degree in each section, multiplied by the 1045 sections in a four mile length, gives a cumulative error of 0.003 degree. That would be about the latitude difference between the endpoints of the survey. Such a small error was far too small to be measured or detected in just one, or even a string of a few, rectilineator sections.

This is a subtle source of systematic error. The preliminary tests of the rectilineator were done with only a few of those sections they had (four). The systematic error for these would be far beneath detection level during those tests. An individual section's cross arms might deviate from parallelism in one of two directions, or might, by sheer accident be nearly parallel for one orientation of the rectilinator. If it deviated in one direction, then when the section was inverted, the deviation would flip in the other direction and still be such as to cause the ends to bend downward. Even if by pure accident the first few rectilineator sections were aligned exactly parallel, the procedure of "recycling" sections and inverting them would ensure a systematic error from that point onward of about the same amount over the entire length of the survey.

The procedure of inverting the sections guaranteed that initial systematic error would propagate to cause significant error in the results. If the cross arms had accidentally been initially perfectly parallel for all sections (a very unlikely situation) and the sections had not been inverted, then no systematic error due to bending would have been seen over the full length of the survey. If there were an initial systematic error, and the sections had not been inverted, the systematic error could have given results showing either positive or negative curvature of the earth, with equal likelihood, and of size that could have ranged from zero to the value reported, or even more. The seemingly sensible systematic procedure of inverting sections when they were reused doomed this experiment to success, at least success as the Morrow team saw it.

This systematic error would automatically result in excellent agreement between the measuring instruments. As the line progressed southward, the plumb bob on the end of the cross arm would deflect southward, the bubble on the spirit level would move northward, just as Morrow observed. All of these measures depend directly on the actual doward arc of the rectilineator land line. The horizon sightings would reflect this also. But all this time the experimenters thought the land line was straight, and the earth curving upward, when in fact the earth curved downward and the rectilineator land line curved downward even more.

Expectation bias?

The end of the line points
into the water.
Photo: Koreshan Historic Site.

But this seems too easy a solution. Surely it stretches credibility that the bending of the rectilineator would be just right to give a result of size within 2% of the expected value. By "expected" I mean the value of earth radius that the experimenters expected. And that may be the key word here. Expectation bias could have played an important role. [1]

Morrow notes that in the first 1/4 mile the changes in all data readings showed no clear evidence of curvature. This was no surprise, for the expected curvature was smaller than random instrumental errors. But by the end of the first mile the curvature was clearly shown, and it was in the expected direction. Morrow had previously calculated a table of numbers indicating what data should result for (1) a concave earth, and (2) a convex earth. When the numbers began showing curvature in the direction supporting the concave earth hypothesis, the entire team must have been encouraged and elated. Still, measured values weren't perfectly in agreement with expectations. Morrow wouldn't have been much concerned about that, attributing it to the expected random errors of individual measurements. This would work itself out as the rectilineator line became longer. Perhaps it did.

Now we can imagine the team continually checking heights above water level, plumb line and elevation, as the survey preceded southward. Each time a new 12 foot section of rectilineator was positioned, these were compared against the precalculated tables. Each measurement was made to the limits imposed by the instrument scales, and involved some judgment. Under these conditions there's a distinct possibility of unconscious bias to make each measurement agree more closely with expectations. It wouldn't take much "correction" each time. These measurements and adjustments were made every 12 feet for nearly 4 miles. That's nearly 1760 sets of measurements. In this way the experimenter's expectation bias can introduce a systematic error. Each measurement is biased just a bit in the direction of better, but not necessarily perfect, agreement with the precalculated values. [The published data tables show values only every 1/8 mile, over most of the 4 mile distance, a total of only 25 values.]

I have presented a plausible hypothesis explaining how a systematic error in the rectilineator design itself (allowing bending), a blunder in calculating the two support points, combined with a systematic error due to expectation bias, could easily account for the published results of the Naples Experiment. But because the case is so old, and the original sources we might like to examine are just not available, we may never be able to declare that all the "loose ends" of this experiment have been tied.

However, this analysis clearly establishes that the method of the experiment was flawed. Its assumption of perfectly rigid rectangles cannot be supported. It ignored the propagation of a very small determinate error, easily capable of accounting for the result the Morrow team observed.

Was this experiment doomed to failure?

But there's another interesting aspect to this. From what Teed has written, we see no indication that he ever worked out the full mathematics of the Cellular Cosmogony, but concentrated on qualitative descriptions. Morrow and Teed probably understood that the speed and direction of propagation of light in his universe both changed drastically with distance from its center. But there was little motivation to get mathematical about it. Morrow's writings don't indicate that he dealt with the mathematics of the entire model. Morrow's interest was focused only on the surface of the earth.

Even today we see small groups around the world who still advocate models evolved from Teed's Cellular Cosmogony. How does such a hollow earth idea survive today, in the era of space travel? The Koreshans didn't have to deal with explanations of anything from earth venturing far from the rock shell. They didn't have to sweat the details of variations of speed of light with distance from earth. The Koreshans could describe the moon as an illusion caused by focalization of light. Today we have walked on the moon, and the "illusion" idea doesn't survive, unless, like the modern flat-earthers, we assume that the entire space program is a giant conspiracy to deny the truth, faked on a Hollywood sound stage with clever special effects.

Today's hollow-earthers don't go that far. They make mathematical models of the universe based on a transformation of R to 1/R where R is the distance from the center of the earth (on the conventional view). In 1983 mathematician Mostafa Abdelkader published a paper in which he worked out the mathematics. He admits that there's no way to distinguish between this model and the conventional model—no way to tell if the universe is the way you learned it in school, or whether it is inside-out. He does conclude his paper by saying he favors the inside-out view. [6]

This is mathematically justified, and reminds us that mathematical models are our own invention to describe what we observe in nature, and sometimes several vastly different-appearing models can equally well do the job. But, accepting this, we must realize that this mathematical reconfiguring of the space metric works near the earth's surface also, so the Naples experiment would be doomed to failure even if everything had been done perfectly. Not just light paths are warped in this model, but so are angles. Physically "straight" rulers are warped also and we wouldn't know it. Even worse, you could have a 1/R2 remapping, or any other consistent mathematical transformation, and you still couldn't distinguish one model from another by any clever experiment you might devise. [7]

Several websites promote variations of this idea. Two distinct versions are seen:

Some of these folks seem to be motivated by religious beliefs, attempting to make the model consistent with their interpretations of their sacred literature. Some are motived by a distrust and dislike of science. Many feel that science has become just too difficult for people to grasp, so there must be a simpler way to understand it. A few have even majored in a science at the university for a while, but dropped out because they found it distasteful. All are sustained by a monumental confidence in the "rightness" of their world-view. They comfortably accept the notion that scientists are part of a vast conspiracy to suppresss the truth, in order to maintain their own positions of power and prestige.

Like pseudoscientists of all varieties, they carefully select those aspects of experience they wish to incorporate into their model, ignoring the vast amount of other scientific phenomena that conventional science has already successfully dealt with. They cite old, discredited, or poorly documented, observations, experiments and theories as supportive of their views. Often they wage a guerrila war against "conventional science", and characterize scientists as imperceptive or even stupid for not acknowledging their cleverness and the truth of their alternative models. They take pride in being a member of a select few, the elite, who can see things clearly.

Endnotes:

  1. I thought I'd invented the term "expectation bias" and that it's meaning was self-evident. But I'm informed it is used in medical research, mathematical statistics and other fields, and there seem to be several kinds of expecation bias, including:
    1. The experimenter's expectations bias the data taking procedure itself, causing recorded data to be biased toward the values expected.
    2. The experimenter's expectations affect the way data is interpreted. The data itself may be unbiased.
    3. The experimenter sees only experimental observations that support preconceived expectations, ignoring all other observations.
    4. The experimenter's judgment of observations is biased by the experimenter's prior knowledge and interpretation of other related facts. Example: a judgment made from a diagnostic tool, such as an X-ray, is biased by knowing the patient's medical history and symptoms. The procedure is not "blinded" as it should be for research purposes.
    It is the first meaning that I'm using in this document.

References:

  1. Halley, Edmond, An account of the cause of the change of the variation of the magnetical needle with an hypothesis of the structure of the internal parts of the earth: as it was proposed to the Royal Society in one of their later meetings. Philosophical Transactions of the Royal Society of London 17:563-578.
  2. Morrow, Ulysses G., ed. The Flaming Sword & The Salvator and the Scientist. Guiding Star Publishing House. (Volume 1, 1896 - Volume 11 (1987).
  3. Teed, Cyrus R. The Cellular Cosmogony or The Earth a Concave Sphere. The Guiding Star Publishing House, Chicago, 1898, 1905. Reprinted by Porcupine Press, 1975.
  4. Teed, Cyrus R. The Cellular Cosmogony or The Earth a Concave Sphere. The Koreshan Unity, Inc., copyright 1922, 1951, 1983.
  5. Teed, Cyrus R. (Koresh) Fundamentals of Koreshan Universology. The Guiding Star Publishing House, Estero - Florida, 1927.
  6. Schadewald, Robert. "He knew Earth is round, but his proof fell flat". Smithsonian, April 1978, pp. 101-113.
  7. Abdelkader, Mostafa A. "Mapping Outer Space Into a Hollow Earth". Speculations in Science and Technology, 6, 1983, pp. 81- 89.
  8. Gardner, Martin. "Occam's Razor and the Nutshell Earth". The Skeptical Inquirer, 12, Summer 1988, pp. 355-358.
  9. Kafton-Minkel, Walter. Subterranean Worlds: 100,000 years of dragons, dwarfs, the dead, lost races & UFOs from inside the earth. Loompanics Unlimited, 1989.
  10. Ohnemus, Catherine A. Anthony. Dr. Cyrus Teed and the Koreshan Unity Movement. View this as a Pdf document with pictures.
  11. Freitag, Ruth S. Hollow Earth Theories: a list of references.


A number of generous persons provided information, photographs and documents used in preparation of this document. They are not, however, responsible for any interpretations I have drawn from them.


This document ©2003 by Donald E. Simanek. Input and suggestions are welcome. Please use the URL to the right. When responding, please indicate the specific document of interest.

Return to Myths and Mysteries of Science.
Check out an alaternative theory, The Flat Earth.
Return to Donald Simanek's front page.