Most scientists, lacking the proper knowledge on the subject, do not understand that Newton based his centripetal pulling gravity ON AN ETHER MODEL.
What did Newton mean by attractive gravity?
If two bodies ARE PUSHED FROM OUTSIDE BY SOME FORCE, then they will be "attracted" to each other.
In a 1675 letter to Henry Oldenburg, and later to Robert Boyle, Newton wrote the following:
[Gravity is the result of]
“a condensation causing a flow of ether with a corresponding thinning of the ether density associated with the increased velocity of flow.”I. Newton, letters quoted in detail in The Metaphysical Foundations of Modern Physical Science by Edwin Arthur Burtt
http://www.mountainman.com.au/process_physics/Forty two years later, in 1717-1718, at the age of 75, Newton inserted what are called the "middle Queries" into the Opticks treatise.
Newton, Opticks, Query 21 (after discussing the aetherial medium for the propagation of light, he described his thoughts on the mechanism for gravity):
Is not this Medium much rarer within the dense Bodies of the Sun, Stars, Planets and Comets, than in the empty celestial Spaces between them? And in passing from them to great distances, does it not grow denser and denser perpetually,
and thereby cause the gravity of those great bodies towards one another, and of their parts towards the Bodies; every Body endeavouring to go from the denser parts of the Medium towards the rarer?In the official chronology of history, the middle queries were added in the last edition of Opticks, when Newton was 75 years old.
But wait, it gets even better.
Newton, Opticks, Query 19:
Doth not the Refraction of Light proceed from the different density of this athereal Medium in different places, the Light receding always from the denser parts of the Medium? And is not the density thereof greater in free and open Spaces void of Air and other grosser Bodies, than within the Pores of Water, Glass, Crystal, Gems, and other compact Bodies?
As I said, there is no better advocate than Newton for the ether pressure theory.
A second gravity-ether hypothesis was proposed by Newton to Robert Boyle in February 1679:
The gradient extended to Earth's centre:
'from ye top of ye air to ye surface of ye earth and again from ye surface of ye earth to ye centre thereof the aether is insensibly finer and finer.'
Any body suspended in this aether-gradient would ‘endeavour' to move downwards.
'Gravity is a force in a body impelling it to descend. Here, however, by descent is not only meant a motion towards the centre of the Earth but also towards any part or region... in this way if the conatus of the aether whirling about the Sun to recede from its centre be taken for gravity, the aether in receding from the Sun could be said to descend.'
In other words, the larger the surface of body, the greater the force of gravity acting upon it. After condensing, this gravity ether descends into the bowels of the earth to be refreshed, and then arises until it ‘vanishes again into the aetherial spaces'.
"THIS GRAVITY ETHER DESCENDS"
"Gravity is a force in a body impelling it to descend."
His belief at that time was that, to quote Westfall, ‘gravity (heaviness) is caused by the descent of a subtle invisible matter which strikes all bodies and carries them down'.
Recently it was discovered that Newton COPIED HIS LAWS OF MOTION from indian sutras.
https://archive.org/stream/thevaiasesikasut00kanauoft#page/n7/mode/2upThe force on a body is the resultant of gravity and the work done against it. V.S 5.1.13
In the absence of all other forces gravity exists. V.S 5.1.7
Action is opposed by an equivalent opposite reaction - V.S 5.1.16-18
Newton's laws of motion copied from the Naya Vaiseshika Sutra.
Jesuit missionaries brought back the Naya Vaiseshika Sutra decades before Newton's time.
Suppose that the mass of an object is 'm' and in time interval 't', the velocity of the object changes from 'u' to 'v' due to the force acting on it. Then,
Initial momentum = mu
Final momentum = mv
Change in momentum = m(v-u)
Therefore, the rate of change of momentum = m(v-u)/t = ma (from Kanada's first law)
From Kandas second law,
force is proportional to the rate of change of momentum.
Or, p k ma
Or, p = kma (where k is a constant)
If m=1 and a=1, then
1 = k*1*1 or k = 1
Or, p = ma
Therefore, unit force is the one that produces unit acceleration in an object of unit mass.
Prashastpada
But Newton did not stop there.
He and Leibniz COPIED ALL OF THEIR RESULTS IN CALCULUS FROM INDIAN SUTRAS.
http://www.theflatearthsociety.org/forum/index.php?topic=30499.msg1574605#msg1574605Origin of Calculus: How Mathematical Analysis Was Imported to India, Italy, France and England
http://www.hinduwisdom.info/Yuktibhasa.pdfA relevant epistemological question is this: did Newton at all understand the result he is alleged to have invented? Did Newton have the wherewithal, the necessary mathematical resources, to understand infinite series? As is well known, Cavalieri in 1635 stated the above formula (the infinite series expansion for the sine function) as what was later termed a conjecture. Wallis, too, simply stated the above result, without any proof. Fermat tried to derive the key result above from a result on figurate numbers, while Pascal used the famous “Pascal’s” triangle long known in India and China. Though Newton followed Wallis, he had no proof either, and neither did Leibniz who followed Pascal. Neither Newton nor any other mathematician in Europe had the mathematical wherewithal to understand the calculus for another two centuries, until the development of the real number system by Dedekind.
The next question naturally is this: if Newton and Leibniz did not quite understand the calculus, how did they invent it? In the amplified version of the usual narrative, how did Galileo, Cavalieri, Fermat, Pascal, and Roberval etc. all contribute to the invention of a mathematical procedure they couldn’t quite have understood? The frontiers of a discipline are usually foggy, but here we are talking of a gap which is typically 250 years.
Here is another step by step demonstration:
Other pieces of circumstantial evidence include:
James Gregory, who first stated the infinite series expansion of the arctangent (the Madhava-Gregory series) in Europe, never gave any derivation of his result, or any indication as to how he derived it, suggesting that this series was imported into Europe.
http://www.muslimheritage.com/article/kerala-mathematics-and-its-possible-transmission-europeThis is RE science at its best: Kepler fudged his entire work, Nova Astronomia, and Newton copied his "laws" of motion from Indian sutras.
Newton copied his laws of motion from indian sutras.
Steve Lamoreaux's experiment defies and dismisses the concept of attractive gravity.
The double forces of attractive gravitation paradox shows the biggest, inherent flaw in the newtonian approach.
Poincare discovered the fact that Newton's differential equations of motion lead to total nonsense from a mathematical point of view.
There isn't a single concept published by Newton that works.
None whatsoever.
That is why he was forced to admit:
“That gravity should be innate, inherent, and essential to matter, so that one body can act upon another at a distance through a vacuum without the mediation of anything else, by and through which their action and force may be conveyed from one to another,
is to me so great an absurdity that I believe no man, who has in philosophical matters a competent faculty of thinking, can ever fall into it.”