Now,people are blinded by falsehood of Newton as father of calculus.Infact he stole it from Indian,who practiced calculus in a school of Astronomy in Malabar,Kerla 2000 years before Jesus came. It is same port where Vasco De Gama landed in 1498 for christian conversion of Hindus. Stupid King at that time let Vasco de Gama come but did not realize that it will be like East India Company which came to dupe Indians and Hindus like what Germans did ,stole Swastika and turned this pious sign to wrong end. Now with internet, people are understanding and started researching.

Astronomy school of Kerla and also Ujjain in Madhya Pradesh produced a student,namedAryabhatta who calculated value of Pi of 3.1416 and the solar year of 365.358 days . He is the one who produced heliocentric universe 4200 years before Copernicus, with elliptically orbiting planets and a spherical earth spinning on its axis explaining the motion of the heavens. Aryabhatta is father of Trigonometry and Algebra,when Europe was in the dark ages.. Westerners, both Germans and British stole his theory and propogated as their, but truth get revealed slowly but sure. Germans are destroyed ,so west heading that way because of stolen sanctity of pios ancient Indian scriptures and misusing it in wrong way.

Aryabhatta was the first to determine the circumference of the earth, with an error of 64 miles 4000 yrs ago. .Aryabhatta gave square, cube, triangle, trapezium, circle and sphere in geometry.

He was called Arjehir by the Arabs.

Remember that Galileo was killed by church when he told world what he learned from Indian Scriptures that ,that it is earth that circles the sun .(Aryabhatta explained this 4 millenuims years before)

Calculus was developed and many books were written ,some of them are here-

Parameshwara’s book of Calculus , including Drigganita was available even to the Arabs. The East India company was based in Calicut. Several Europeans like Fillippo Sasetti who came to Kerala to study Sanskrit in the end of the 15th century. It was this Italian who revealed the vicious and secret Portuguese Inquisition ordered by St Francis Xavier , in Goa, to the Western world. Finally it was the British who stopped this dutch Francis Xavior to stop but they took over from Dutch and ended of controlling India for 300 years. Time is ripe to pay it back now.

In 1580 Matteo Ricci borrowed Calculus Malayalam texts from Calicut kings in 1580, never to return it.

They took Calculus to Europe , from where the likes of Gottfried Wilhelm Von Liebniz , Isaac Newton and Robert Hooke raced with each other to translate , re-invent and market it in their own names, in a acrimonious manner.

Newton copied laws of gravity from “Surya Sidhanta” the great Sanskrit astronomical work written in the Vedic age . Reproduced in another written text by Bhaskara , 1200 years before Newton it clearly explains gravity without an apple. However Vedic gravity was a push ( after observing the solar eclipse ) and NOT a pull.

*Before thete, it was a Greeck-Pythagoras*” who copied Bhaskara’s theorem from the great Sanskrit mathematics text Baudhayana Sulba Sutra, published thousands of years earlier.

Thanks to **John Wallis , while he was the keeper of Oxford Univeristy archives who first started pondering over translated Mathematics stolen from India.**

**John Wallis patented Vedic Math infinity and infinitesimal ( Vishnu reclining in horizontal 8 position ) in his own name. Rest he could NOT understand and passed it to Newton.**

**You all know late ***Shakuntala Devi ,who has beaten all supercomputers in mathmatical calculation.*

*Also India produced great mathmatician-Ramanujan,but during British regime, he was not terated properly and was not given Noble Prize.*

Newtons laws of motion were lifted from the Sanskrit texts of 4000 BC and Aryabhatta’s written work in 2700 BC in Sanskrit.

Newtons gravity laws of explaining gravity as pull or attraction is all wrong.In fact It is explained in GURUTVAKARSHAN that gravity is a property of matter and akasha warp. If Magnet is reason for gravity, how come SUN HAS IMMENSE GRAVITY WITHOUT MAGNET ,IRON PER SE AND MOON WITH MASS .

Newton’s third law-about every action has an equal and opposite reaction is infact law of KARMA of Gita, explained that you get what you do.

Calculus was written in Malayalam atleast 200 years before Newton was born, by the Kerala school of Calculus. Calculus in Sanskrit was written 4800 years ago.

*“When Vedic ideas are proved correct, it is just dreaming , come right. When Western work ( lifted from ancient Vedanta ) is proved right, it is scientific knowledge ” — Nikola Tesla .*

Aryabhatta’s (2700 BC), formula giving the ** tat-kalika-gati** (instantaneous motion) is given by the following –

u’- v’ = v’ – v ± e (sin w’ – sin w) (i) where u, v, w are the true longitude, mean longitude, mean anomaly respectively at any particular time and u’, v’, w’ the values of the respective quantities at a subsequent instant; and e is the eccentricity or the sine of the greatest equation of the orbit.

“True motion in minutes is equal to the cosine (of the mean anomaly) multiplied by the difference (of the mean anomalies) and divided by the ** cheda**, added or subtracted contrarily (to the mean motion).” δu = δv ± e cos θ δ θ.

*Proof of the Differential Formula*

Let a point P (See Fig. 1) move on a circle. Let its position at two successive intervals be denoted by P and Q. Now, if P and Q are taken very near each other, the direction of motion in the interval PQ is the same as that of the tangent at P.

Let PT be measured along the tangent at P equal to the arc PQ. Then PT would be the motion of the point P if its velocity at P had not changed direction. “The difference between the longitudes of a planet found at any time on a certain day and at the same time on the following day is called its (** sphuta**)

The ** tatkalika-gati** (instantaneous motion) of a planet is the motion which it would have, had its velocity during any given interval of time remained uniform.”

In the figure given above, let the arc PQ = A. Then R (sin BOQ – sin BOP) = QN – PM = Qn which is the *Bhogya Khanda*

Now from the similar triangles PTr and PMO

R : PT : : R cos w : Tr ……………. (iii) Tr = PT cos w. But Tr = R(sin w’ – sin w) and PT = R(w’ – w) (sin w’ – sin w) = (w’ – w) cos w.

Thus the ** Tat-kalika Bhogya Khanda** (the instantaneous sine difference) in modern notation is δ (sin θ) = cos θ δ θ.

This formula has been used by Bhaskara to calculate the ayana-valana (“angle of position”).

the epithet ** Tat-kalika** (instantaneous)

Theory of proportion (similar triangles) –

(1) The sine-difference sin (θ + δ θ) – sin θ varies as the cosine and decreases as θ increases. (2) The cosine-difference cos (θ + δ θ) – cos θ varies as the sine negatively and numerically increases as θ increases.

(1) The difference of the sine-difference varys as the sine negatively and increases (numerically) with the angle. (2) The difference of the cosine-difference varys as the cosine negatively and decreases (numerically) with the angle.

For Δ_{2} (sin θ),

the differential of an inverse sine function. This result–

if T_{n} denotes the nth ** jya** (or Rsine), C

the summation being taken so as to include all the Rsines in a quadrant of the circle. Since there are ordinarily 24 Rsines in a Hindu trigonometrical table, we have

Hence approximately S = 21600 x 2 x 3437 Area of the surface = circumference x diameter.

If l_{n} denotes the length of the nth transverse arc, we have

Therefore,

the summation being taken so as to include all the Rsines.

Hence the area of a lune is numerically equal to the diameter of the sphere. As the number of limes is equal to the number of parts of the circumference of the sphere, we get

Area of the surface = circumference x diameter.

It pays to remember that 4600 years back, half this planet was doing grunt grunt for language and wearing animal skins!

Rothschild , who owned British East India company gave a lot of stolen Vedic Maths and Astronomy papers in Sanskrit to their bloodline represented by German Jew Sir Frederick William Herschel ( 1738-1822 ) from Hanover. But this man was NOT smart enough. So Rothschild made a observatory for him, so that he could atleast patent the vedic Astronomical data in his name. The British made a big hue and cry when William “discovered ” Uranus on March 13th 1781– hi hi the stupid Indians never knew all this. . They were jubilant as Indian Vedic astrology does NOT use Uranus ( Shweta ) Neptune ( Shyama ) Pluto ( Teevra ), just because *they are too far away to affect your DNA and they stay in one single rashi for too long.* Vedic rishi astrologists did NOT need a telescope, they read off from Aakashik records.

Ptolemy came to India in 155 AD, and he stole from the astronomical data from Surya Siddhanta (12.85-90) , the most significant being the diameters of Mercury, Venus, Mars, Jupiter and Saturn . You must understand that these diameters were calculated accurately more than 6 millenniums ago when even the atmospheric refraction of earth was different. Much before in 500 BC Pythagoras came to India and stole his theorem.

William passed over the stolen ( translated to English by Kashmiri Pandits ) papers to his son, Sir John Frederick Hershel, ( 1792-1871 ) an English citizen. He made full use of the Chemical and Botanical Vedic papers too. He also dabbled with Kerala Calculus.* This man is buried next to Isaac Newton and Charles Darwin, in Westminister Abbey– next to the English Kings*–probably to ironically reveal, that these men were NOT scientists , but thieving politicians.

John send his son Sir William James Herschel ( 1833 -1917 ) to steal more, which he did –and how! He patented the ancient Indian finger printing method . The Indian Panchatantra stories, which were written 5000 years ago, have episodes of written contracts , signed by a indelible Indian ink thumb print. James was Rothschilds represenative in India, overseeing the change over after the First war of Independence ( Sepoy’s mutiny ) in 1857–merrily taking finger prints all all and sundry–this man really got a kick out of all this.

*Gravity thief Isaac Newton stole everything from GURUTWAKARSHANA the pioneering work in Sankrit of astronomer Mihira Muni ( sage Varahamihira ) in 2660 BC. Mihira Muni was the disciple of Mathematician Aryabhatta. Mihira Muni’s observatory was at Sultan Bathery , Western Ghat mountains , Kerala –where today you can see a 3800 year old Jain temple –converted by Muslim Invader Tipu Sultan as his fort. He stayed at Kapletta at a lake by the name of Pookode lake.*

Without understanding the concept of Akasha , written in Vedic texts — he hastily propounded the ” Aether Wave theory”– and fell flat on his face when asked to explain refraction of light and diffusion. ( the same way his gravitation theory is bullshit too- little knowledge is a dangerous thing !.

When super genius Indian Mathematician Srinivasan Ramanujan arrived at London, he was greeted by Professor Hardy. Hardy made a innocent remark that the number of the taxi , he came in is 1729– a boring number.

Ramanujan looked at the number plate himself and replied casually in a knee jerk manner “No, actually it is a very interesting number. .It is the smallest natural number representable in two different ways as the sum of two cubes” This is known as equation **HARDY-RAMANUJAN NUMBER,(Hardy has nothing to do except he was British,white).**

BBC documentary on Madhavan, Aryabhatta ( they say 600 AD while it is 2700).

The sages who gave this planet the Vedas , Upanishads did not care to leave their names; the truths they set down were eternal, and the identity of those who arranged the words irrelevant.

The mathematical value pi has always been a curious number throughout history.ratio of a circle’s circumference to its diameter,

Here is Aryabhatta’s version of the** value of Pi in 2700 BC**:

Lets split the words and understand the meaning:

चतुरधिकम्शतम्- Four more than hundred (=104)

अष्टगुणम्- multiplied by 8 (104 x 8 = 832)

द्वाषष्टि= 62

तथासहस्राणाम्= of 1000 as such (=62000; totalling 62832)

अयुतद्वय= 10,000 x 2 (=20,000)

विष्कम्भस्य= of the diameter

आसन्न:- approximately

वृत्तपरिणाह:- to the circumference.

In effect, 62832/20000 = **3.1416 !**

It interesting to note the large numbers he has used to arrive at Pi and the remark that pi is only an approximate value.

And we have also coded it in Mantras by the** KATAPAYADI SYSTEM**

Vararuchi was a Mathematician from Kerala who taught at Bhoj Shala University inside the Saraswati Temple in 2860 BC . Today this ancient Hindu university is a Muslim mosque.

गोपीभाग्यमधुव्रातःश्रुंगशोदधिसंधिगः

खलजीवितखातावगलहालारसंधरः

*Gopibhagya madhuvrata srngisodadhisandhiga|*

*Khalajivitakhatava galahalarasandhara||*

Kaṭapayādi system dictates that:

* As the first digit is 3, the first consonant must be one of ga, ḍa, ba, la

* As the second digit is 1, the second consonant must be one of ka, ṭa, pa, ya

* For the third digit to be 4, the third consonant must be one of gha, ḍha, bha, va…

So to fit**3.14159265358979****3**…, the list of consonants in the verse must satisfy the regex

{g,ḍ,b,l}{k,ṭ,p,y}{gh,ḍh,bh,v}{k,ṭ,p,y}{ṅ,ṇ,m,ś}{jh,dh}{kh,ṭh,ph,r}{c,t,ṣ}{ṅ,ṇ,m,ś}{g,ḍ,b,l}{ṅ,ṇ,m,ś}{j,d,h}{jh,dh}{ch,th,s}{jh,dh}{g,ḍ,b,l}…

ga – 3 pii – 1 bhaa – 4 gya – 1 ma – 5 dhu – 9 ra – 2 ta -6 shru – 5 ga – 3 sho – 5 da – 8 dhi – 9 sa -7 dha – 9 ga – 3 kha – 2 la – 3 jii – 8 vi – 4 ta – 6 kha – 2 ta – 6 va – 4 ga- 3 la – 3 ra – 2 sa – 7 dha – 9 ra – 2

**pi = 3.1415926535897932384626433832792**

Oxford University gave credit back to ancient Indian scientists where newton stole from.

From Vadakail- Thanks for great knowledge.

%d bloggers like this:

Pingback: DECODED ORIGINS OF LIFE-ALL YOU WERE TAUGHT IS WRONG | HINDUISM AND SANATAN DHARMA

Nice explanation

LikeLike

Grest postings. Keep posting. I’ll keep sharing further

LikeLike

Thank you for reading.

LikeLike

Lot of theories in science invented by Indians and Lord Buddha invented quontam science not invented by scienties up to now.

LikeLiked by 1 person

You repeatedly claim 2700 bc, whereas it definitely is the 6th century CE. Sanskrit wasn’t even around 2700 bc, so by saying it was written in sanskrit you prove that it wasn’t that long ago. There was important Indian math dating to 2700 bce, but that was the Indus Valley civilization and their use of the first negative numbers.

LikeLike

Sanskrit is as old as > 170,000 years ago as first language of world and rest came from there if you want to gain some knowledge, read German philosophy to help you. You need to browse more materials I have in this site and search and read then only I could discuss with you.

LikeLike

The period of aryabhatta you wrote are wrong .aryabhata lived in 3-6 centuries bc

LikeLike

2700 yrs ago so that is what it means. 3-6 th century- that wide……………………….3rd century ………to 6th century – either you do not know what you talking about or here to make fun. Either case is no good.

LikeLike

this is one out of so many reasons colored people need to genocide white foreign Alien trash.

LikeLike

Pingback: NEWTON STOLE CALCULUS FROM ARYABHATTA,ANCIENT INDIAN SCIENTIST | HINDUISM AND SANATAN DHARMA – GLOBAL HINDUISM

Pingback: NEWTON STOLE CALCULUS FROM ARYABHATTA,ANCIENT INDIAN SCIENTIST | HINDUISM AND SANATAN DHARMA – Voice of world

Pingback: NEWTON STOLE CALCULUS FROM ARYABHATTA,ANCIENT INDIAN SCIENTIST | HINDUISM AND SANATAN DHARMA | SANSKRIT

really eye opening

LikeLike

Reblogged this on GLOBAL HINDUISM.

LikeLike

Are any original documents remains there? If yes then pls tell.

LikeLike

Solutions of quadratic equations

In the seventh century, the first written evidence of the rules for working with zero were formalised in the Brahmasputha Siddhanta. In his seminal text, the astronomer Brahmagupta introduced rules for solving quadratic equations (so beloved of secondary school mathematics students) and for computing square roots.

Rules for negative numbers

Brahmagupta also demonstrated rules for working with negative numbers. He referred to positive numbers as fortunes and negative numbers as debts. He wrote down rules such as: “A fortune subtracted from zero is a debt,” and “a debt subtracted from zero is a fortune”.

This latter statement is the same as the rule we learn in school, that if you subtract a negative number, it is the same as adding a positive number. Brahmagupta also knew that “The product of a debt and a fortune is a debt” – a positive number multiplied by a negative is a negative.

For the large part, European mathematicians were reluctant to accept negative numbers as meaningful. Many took the view that negative numbers were absurd. They reasoned that numbers were developed for counting and questioned what you could count with negative numbers. Indian and Chinese mathematicians recognised early on that one answer to this question was debts.

For example, in a primitive farming context, if one farmer owes another farmer 7 cows, then effectively the first farmer has -7 cows. If the first farmer goes out to buy some animals to repay his debt, he has to buy 7 cows and give them to the second farmer in order to bring his cow tally back to 0. From then on, every cow he buys goes to his positive total.

Basis for calculus

This reluctance to adopt negative numbers, and indeed zero, held European mathematics back for many years. Gottfried Wilhelm Leibniz was one of the first Europeans to use zero and the negatives in a systematic way in his development of calculus in the late 17th century. Calculus is used to measure rates of changes and is important in almost every branch of science, notably underpinning many key discoveries in modern physics.

But Indian mathematician Bhāskara had already discovered many of Leibniz’s ideas over 500 years earlier. Bhāskara, also made major contributions to algebra, arithmetic, geometry and trigonometry. He provided many results, for example on the solutions of certain “Doiphantine” equations, that would not be rediscovered in Europe for centuries.

The Kerala school of astronomy and mathematics, founded by Madhava of Sangamagrama in the 1300s, was responsible for many firsts in mathematics, including the use of mathematical induction and some early calculus-related results. Although no systematic rules for calculus were developed by the Kerala school, its proponents first conceived of many of the results that would later be repeated in Europe including Taylor series expansions, infinitessimals and differentiation.

The leap, made in India, that transformed zero from a simple placeholder to a number in its own right indicates the mathematically enlightened culture that was flourishing on the subcontinent at a time when Europe was stuck in the dark ages. Although its reputation suffers from the Eurocentric bias, the subcontinent has a strong mathematical heritage, which it continues into the 21st century by providing key players at the forefront of every branch of mathematics.

LikeLike

http://mobile.abc.net.au/news/2017-09-15/ancient-indians-used-zero-earlier-than-previously-thought/8949890

LikeLike