gps measurements of them movingNone of you can use GPS technology to support RE theory.
The missing orbital Sagnac effect decisively proves that the Earth does not orbit the Sun.
Pls explain these findings:
http://i.imgur.com/V3DPTbH.gif
http://i.imgur.com/s9a9IzV.jpgIn the beginning, there were no oceans at the surface of the Earth.
The land mass subsided; the cause being the first several massive geological/astronomical cataclysms which occurred on Earth.
ORIGIN OF OCEANS
http://www.varchive.org/itb/ecocean.htmCHICXULUB SUPERVOLCANO
https://www.theflatearthsociety.org/forum/index.php?topic=30499.msg1622182#msg1622182An example of 'declaration of faith' in maths: There is an infinite amount of numbers between any 2 given numbers. Nobody ever wrote down all the numbers between for example 0 and 1. (It's rather hard to write down an infinite amount of numbers) Does this mean that there isn't an infinite amount of numbers between any 2 given numbers?OFFICIAL CHRONOLOGY IRRATIONAL NUMBER HISTORY
The concept of the irrational number has its origins in the secret society led by Pythagoras, approximately 2,500 years ago. It could be said that the invention of the irrational number is the greatest "scientific" discovery ever made, as we are told by all the leading mathematical analysis textbooks.
'The idea that the size of every physical quantity could, in theory, be represented by a rational number was shattered in the fifth century B.C. by Hippasus of Metapontum, who demonstrated by geometric methods the existence of irrational numbers. This dramatic discovery of Hippasus is one of the most fundamental in the entire history of science. According to legend, Hippasus was thrown overboard at sea, by the Pythagoreans, because of his discovery.'
But Hippasus was not assasinated by Pythagoras' disciples for revealing the existence of irrational numbers; Hippasus had discovered something much more ominous about this matter.
The odd thing about the discovery of the irrational numbers is the fact that the most celebrated "proofs" (geometrical/algebraic) were offered by Pythagoras himself to the public through his disciples. What Hippasus had uncovered was something much more interesting; that is, that THERE ARE NO IRRATIONAL NUMBERS (there exist only natural and rational numbers [with a finite decimal part]), and that Pythagoras was planning to inject the false concept of the irrational number to the public (scientific/philosophical). The two proofs offered by Pythagoras do not demonstrate ANYTHING regarding the existence of irrational numbers; Hippasus was assasinated by his colleagues so as not to reveal to the world what Pythagoras was actually trying to do: to mislead the coming generations of mathematicians.
http://www-groups.dcs.st-and.ac.uk/~history/Biographies/Kronecker.htmlThe only mathematician who realized that there were no irrational numbers in the real/physical world, and who continuously attacked R. Dedekind and G. Cantor for their mathematical pipe dreams, was Leopold Kronecker.
Kronecker is well known for his remark:-
God created the integers, all else is the work of man.
Irrational numbers are totally man-invented.
Kronecker believed that mathematics should deal only with finite numbers and with a finite number of operations. He was the first to doubt the significance of non-constructive existence proofs. It appears that, from the early 1870s, Kronecker was opposed to the use of irrational numbers, upper and lower limits, and the Bolzano-Weierstrass theorem, because of their non-constructive nature. Another consequence of his philosophy of mathematics was that to Kronecker transcendental numbers could not exist.
In 1870 Heine published a paper On trigonometric series in Crelle's Journal, but Kronecker had tried to persuade Heine to withdraw the paper. Again in 1877 Kronecker tried to prevent publication of Cantor's work in Crelle's Journal, not because of any personal feelings against Cantor (which has been suggested by some biographers of Cantor) but rather because Kronecker believed that Cantor's paper was meaningless, since it proved results about mathematical objects which Kronecker believed did not exist. Kronecker was on the editorial staff of Crelle's Journal which is why he had a particularly strong influence on what was published in that journal. After Borchardt died in 1880, Kronecker took over control of Crelle's Journal as the editor and his influence on which papers would be published increased.
Although Kronecker's view of mathematics was well known to his colleagues throughout the 1870s and 1880s, it was not until 1886 that he made these views public. In that year he argued against the theory of irrational numbers used by Dedekind, Cantor and Heine giving the arguments by which he opposed:-
... the introduction of various concepts by the help of which it has frequently been attempted in recent times (but first by Heine) to conceive and establish the 'irrationals' in general. Even the concept of an infinite series, for example one which increases according to definite powers of variables, is in my opinion only permissible with the reservation that in every special case, on the basis of the arithmetic laws of constructing terms (or coefficients), ... certain assumptions must be shown to hold which are applicable to the series like finite expressions, and which thus make the extension beyond the concept of a finite series really unnecessary.
Lindemann had proved that π is transcendental in 1882, and in a lecture given in 1886 Kronecker complimented Lindemann on a beautiful proof but, he claimed, one that proved nothing since transcendental numbers did not exist.
He believed that all mathematics could be reduced to arguments using only the integers and finite numbers of operations. He was violently opposed to such things as the use of irrational numbers, transcendental numbers, upper and lower limits, and the Bolzano-Weierstrass theorem (well, much of the new mathematics being developed by Karl Weierstrass for that matter), as these devices he felt produced objects that did not exist. This extreme philosophical viewpoint on mathematics caused him to quarrel with many mathematicians, even going so far as to block publication of papers by Heinrich Heine (of the Heine-Borel theorem) on Fourier series and papers by Georg Cantor on transfinite numbers and set theory (not because he personally didn't like Cantor, as asserted by some of Cantor's biographers, but only because he was violently opposed to Cantor's ideas) in the influential Crelle's Journal. In 1889 Ferdinand von Lindemann produced a proof that π was transcendental, and Kronecker was said to have given von Lindemann the backhanded compliment: 'Of what use is your beautiful proof, since π does not exist!'
This extreme point of view, which made Kronecker many enemies in his time, was actually a view first propounded by Pythagoras, who called the irrational numbers that he discovered to his consternation 'unutterable' (this is the reason why the word surd is used to designate the irrational roots discovered by the Pythagoreans, it is ultimately derived from the Latin for 'deaf-mute'). Leibniz himself spoke of the 'labyrinth of the continuum' when referring to the philosophical troubles that the very idea of real numbers is fraught with. In fact the term 'real number' is something of a misnomer, as they are actually quite unreal! In fact, it can be shown that almost all real numbers are transcendental, uncomputable, and cannot even be named! Mathematicians in the century after Kronecker managed to show all of these, and with these discoveries, Kronecker's position doesn't seem quite as untenable as it seemed to his contemporaries.
First of all, we start with the theory of real numbers that was proposed by Cantor and Richard Dedekind, which Kronecker was so vehemently opposed to. Dedekind managed to give a definition of a real number in terms of what are today known as Dedekind cuts, and Cantor managed to show that the real numbers are non-denumerable, that they are a higher-order infinity than the integers by using the diagonal argument that bears his name. Since the integers, rational numbers, and algebraic numbers are all denumerable, then that means that most real numbers are actually transcendental.
However, in the early twentieth century there began to appear intimations that there was something terribly wrong with the notion of a real number as it has been thus developed. Emile Borel in 1927 pointed out that if you consider a real number as an infinite sequence of digits then you could put an infinite amount of information into a single number. He came up with a number, known as Borel's constant, that could serve as an oracle to answer any yes/no question put to it. Today, Borel's argument might be stated a bit like this: let us treat each possible ASCII text as though it were a single number, for instance 'Do real numbers exist?' would correspond to the hexadecimal number 0x446F207265616C206E786973743F, or 1,388,008,220,904,010,789,705,024,363,787,327 in decimal. Then we take, say, the 1,388,008,220,904,010,789,705,024,363,787,327th digit of Borel's constant in base 4. If the digit is 0, then the number does not correspond to a valid question, if it is 1 then the question is unanswerable (e.g. 'Is the answer to this question 'no'?'), 2 if the answer is no, and 3 if the answer is yes. Such a 'know it all' real number is certainly present in the set of all reals. But then Borel asks this troubling question: 'Why should we believe in this real number that answers every possible yes/no question?' And he concludes that he doesn't believe it, there is no reason to believe it, that such a thing should exist is totally absurd!
The proof by contradiction, suggested by Pythagoras and made public by his disciples, where it is shown that rad(2) [radical of 2, square root of 2] cannot equal p/q, where p and q are natural numbers 0, is not a valid proof as it deliberately misses the essential point; rad(2) is a continued fraction algorithm which in turn is a sequence of finite fractions, used to a desired accuracy.
There are no perfect circles or perfect squares in the natural world, this was Pythagoras' greatest secret regarding his mathematics research; any perfect circle implies the concept of the irrational number;
a[2] + b[2] = c[2] is a formula involving natural or rational numbers; its geometric representation is a right triangle with sides a and b, c being the hypothenuse. 1[2] + 1[2] = rad(2)[2] is a meaningless formula with no geometric representation.
To construct proper solutions to 1[2] + 1[2] = rad(2)[2], with proper geometric representations, we need to use the continued fraction algorithm. Using this algorithm, to three decimal places, we obtain 1.414,
1 = .414 x 1/.414 = a
c = (0.414 + 1/0.414)/2, b = (1/0.414 - 0.414)/2
We obtain, (2 x 0.414)(2) + (1 - 0.414(2))(2) = (0.414(2) + 1)(2)
* (0.828 )(2) + (0.828604)(2) = (1.171396)(2) * or, after multiplying by 1000 and dividing by 4,
207000(2) + 207151(2) = 292849(2), further,
207000/292849 + 207151/292849 = 1.414213468
If we multiply * (the equation above marked with *) by, for example, 1.207 we get:
(0.999396)(2) + (1.000125028 )(2) = (1.413874972)(2), and this is a proper solution to three decimal places accuracy.
Pythagoras also knew that there are only rational numbers with finite decimal part; in the real world there are no fractions such as 1/3, 1/7 which imply infinity, and infinity cannot exist in the physical world. It is possible, using the continued fraction algorithm, to obtain very close (as close as we please) approximations to 1/3, 1/7 whose denominators are in the form 2(n), 5(m), which can be divided exactly, b/c, where b is a multiple of 3 (ex: 0.999396/3).
Elementary transcendental functions can be reduced to calculating a series of nested roots, thus obtaining approximations which do not involve irrational numbers (I obtained such a representation for the logarithm function, back in 1998).
Earth's rotation (at the equator): 0,00436 rad /minuteThe Earth couldn't possibly rotate around its own axis.
We have the cloud trajectories paradox, the fact that the atmosphere could not possibly rotate at the same speed as that of the Earth, the gases in the atmosphere paradox, the barometer pressure paradox, and the Allais effect.
All of your other arguments can be dismissed immediately: I can prove to you that the age of the Earth is much shorter than you are implying.
You are going to have to deal with the faint young sun paradox, the genetics/molecular biology proofs, comets' tail paradox, and much more.
I can save you the trouble by proving directly that there is no curvature at the surface of the Earth using the Tunguska event file.