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Madhava (माधव) of Sangamagrama ( 1350 - 1425 ) was a major Mathematician from Kerala , South India . Madhava was the founder of the Kerala School and is considered the founder of Mathematical Analysis for having taken the decisive step from the finite procedures of ancient mathematics to treat their Limit -passage to Infinity , which is the kernel of modern classical analysis. He is also considered one of the greatest mathematician-astronomers of the Middle Ages , due to his important contributions to the fields of mathematical analysis, Infinite Series , Calculus , Trigonometry , Geometry and Algebra .

Sadly, all of his mathematical works are lost, although it is possible that extant work may yet be 'unearthed'. It is vaguely possible that he may have written ''Karana Paddhati'', a work written sometime between 1375 and 1475 , but this is only speculative. All we know of Madhava comes from the works of later scholars, primarily Nilakantha Somayaji and Jyesthadeva .


CONTRIBUTIONS

Perhaps Madhava's most significant contribution was in moving on from the finite procedures of ancient mathematics to 'treat their limit passage to infinity', which is considered to be the essence of modern classical analysis, and thus he is considered the founder of Mathematical Analysis . In particular, Madhava invented the fundamental ideas of:


Among his many contributions, he discovered the infinite series for the Trigonometric Function s of Sine , Cosine , Tangent and Arctangent , and many methods for calculating the Circumference of a Circle . One of Madhava's series is known from the text ''Yuktibhasa'' which describes -

The first term is the product of the given sine and radius of the desired arc divided by the cosine of the arc. The succeeding terms are obtained by a process of iteration when the first term is repeatedly multiplied by the square of the sine and divided by the square of the cosine. All the terms are then divided by the odd numbers 1, 3, 5, .... The arc is obtained by adding and subtracting respectively the terms of odd rank and those of even rank. It is laid down that the sine of the arc or that of its complement whichever is the smaller should be taken here as the given sine. Otherwise the terms obtained by this above iteration will not tend to the vanishing magnitude.


This yields

: r heta={ rac {r\ sin heta }{cos heta
}}-(1/3)\,r\,{ rac { \left(sin heta ight) ^
{3}}{ \left(cos heta ight) ^{3}}}+(1/5)\,r\,{ rac {
\left(sin heta ight) ^{5}}{ \left(cos
heta ight) ^{5}}}-(1/7)\,r\,{ rac { \left(sin heta
ight) ^{7}}{ \left(cos heta ight) ^{
7}}} + ...

which further yields the theorem

: heta = an heta - (1/3) an^3 heta + (1/5) an^5 heta - \ldots

popularly attributed to James Gregory , three centuries after Madhava. This series was traditionally known as the Gregory series but scholars have recently begun referring to it as the Madhava-Gregory series, in recognition of Madhava's work.

Madhava also found the Infinite Series expansion of π :

: rac{\pi}{4} = 1 - rac{1}{3} + rac{1}{5} - rac{1}{7} + \cdots \pm rac{1}{2n -1}

which he obtained from the power series expansion of the arctangent function.

Using a rational approximation of this series, he gave values of the number π as 3.14159265359 - correct to 11 decimals; and as 3.1415926535898 - correct to 13 decimals. These were the most accurate approximations of π after almost a thousand years.

He gave two methods for computing the value of π.

  • One of these methods is to obtain a rapidly converging series by transforming the original Infinite Series of π. By doing so, he obtained the infinite series


:\pi = \sqrt{12}\left(1-{1\over 3\cdot3}+{1\over5\cdot 3^2}-{1\over7\cdot 3^3}+\cdots ight)

and used the first 21 terms to compute an approximation of π correct to 11 decimal places as 3.14159265359.

  • The other method he used was to add a remainder term to the original series of π. He used the remainder term


:: rac{n^2 + 1}{4n^3 + 5n}

in the infinite series expansion of rac{\pi}{4} to improve the approximation of π to 13 decimal places of accuracy when n = 75.

Madhava was also responsible for many other original discoveries, including:


Mathematical Analysis

  • The trigonometric series of:

  • ---The sine function (Madhava- Newton power series).

  • ---The cosine function (Madhava-Newton power series).

  • ---The tangent function.

  • ---The arctangent function (Madhava-Gregory series).

  • The Taylor series approximations of:

  • ---The sine function to the second order.

  • ---The cosine function to the second order.

  • ---The sine function to the third order.

  • The power series of:

  • --- π (usually attributed to Leibniz ).

  • ---π/4 ( Euler 's series).

  • ---Any angle θ (equivalent to the Gregory series).

  • ---The Radius of a circle.

  • ---The Diameter of a circle.

  • ---The Circumference of a circle.

  • Method of Expansion .

  • Tests Of Convergence of infinite series.

  • Infinite Continued Fraction s.



Trigonometry

  • The analysis of trigonometric functions (as described above).

  • Sine table to 12 decimal places of accuracy.

  • Cosine table to 9 decimal places of accuracy.



Geometry

  • The analysis of the circle (as described above).

  • Many methods for calculating the circumference of a circle.

  • Computation of π correct to 13 decimal places.



Algebra



Calculus


Madhava laid the foundations for the development of Calculus , including Differential Calculus and Integral Calculus , which were further developed by his successors at the Kerala School . (It should be noted that Archimedes also contributed to integral calculus, though not to differential calculus.) Madhava also extended some results found in earlier works, including those of Bhaskara .

Some scholars have suggested that Madhava's work was transmitted to Europe via traders and Jesuit missionaries, and as a result, had an influence on later European developments in analysis and calculus. (See Possible Transmission Of Kerala Mathematics To Europe for further information.)


KERALA SCHOOL OF ASTRONOMY AND MATHEMATICS

See Also: Kerala School


The Kerala School was a school of mathematics and astronomy founded by Madhava in Kerala (in South India ) which included as its prominent members Parameshvara , Neelakanta Somayaji , Jyeshtadeva , Achyuta Pisharati , Melpathur Narayana Bhattathiri and Achyuta Panikkar. It flourished between the 14th and 16th Centuries and has its intellectual roots with Aryabhatta who lived in the 5th Century . The lineage continues down to modern times but the original research seems to have ended with Narayana Bhattathiri ( 1559 - 1632 ). These astronomers, in attempting to solve problems, invented revolutionary ideas of Calculus . These discoveries included the theory of Infinite Series , tests of Convergence (often attributed to Cauchy ), Differentiation , term by term Integration , Iterative Methods for solutions of Non-linear equations, and the theory that the area under a curve is its Integral . They achieved most of these results up to several centuries before European mathematicians.

Jyeshtadeva consolidated the Kerala School's discoveries in the ''Yuktibhasa'', the world's first calculus text.

The Kerala School also contributed much to linguistics. The Ayurvedic and poetic traditions of Kerala were founded by this school. The famous poem, Narayaneeyam , was composed by Narayana Bhattathiri .


BIBLIOGRAPHY



SEE ALSO