Matematik Aryabhata

Menempatkan sistem nilai dan kosong

The place-value system, first seen in the 3rd century Bakhshali Manuscript, was clearly in place in his work.[14] ; he certainly did not use the symbol, but French mathematician Georges Ifrah argues that knowledge of zero was implicit in Aryabhata's place-value system as a place holder for the powers of ten with null coefficients[15]

However, Aryabhata did not use the brahmi numerals. Continuing the Sanskritic tradition from Vedic times, he used letters of the alphabet to denote numbers, expressing quantities, such as the table of sines in a mnemonic form.[16]

Pi sebagai tidak rasional

Aryabhata worked on the approximation for Pi ( π {\displaystyle \pi } ), and may have come to the conclusion that π {\displaystyle \pi } is irrational. In the second part of the Aryabhatiyam (gaṇitapāda 10), he writes:

chaturadhikam śatamaśṭaguṇam dvāśaśṭistathā sahasrāṇām
Ayutadvayaviśkambhasyāsanno vrîttapariṇahaḥ.

"Add four to 100, multiply by eight, and then add 62,000. By this rule the circumference of a circle with a diameter of 20,000 can be approached."

This implies that the ratio of the circumference to the diameter is ((4+100)×8+62000)/20000 = 3.1416, which is accurate to five significant figures.

It is speculated that Aryabhata used the word āsanna (approaching), to mean that not only is this an approximation but that the value is incommensurable (or irrational). If this is correct, it is quite a sophisticated insight, because the irrationality of pi was proved in Europe only in 1761 by Lambert).[17]

After Aryabhatiya was translated into Arabic (ca. 820 CE)this approximation was mentioned in Al-Khwarizmi's book on algebra.[3]

Mensurasi dan trigonometri

In Ganitapada 6, Aryabhata gives the area of a triangle as

tribhujasya phalashariram samadalakoti bhujardhasamvargah

that translates to: "for a triangle, the result of a perpendicular with the half-side is the area."[18]

Aryabhata discussed the concept of sine in his work by the name of ardha-jya. Literally, it means "half-chord". For simplicity, people started calling it jya. When Arabic writers translated his works from Sanskrit into Arabic, they referred it as jiba. However, in Arabic writings, vowels are omitted, and it was abbreviated as jb. Later writers substituted it with jiab, meaning "cove" or "bay." (In Arabic, jiba is a meaningless word.) Later in the 12th century, when Gherardo of Cremona translated these writings from Arabic into Latin, he replaced the Arabic jiab with its Latin counterpart, sinus, which means "cove" or "bay". And after that, the sinus became sine in English.[19]

Persamaan tidak tetap

A problem of great interest to Indian mathematicians since ancient times has been to find integer solutions to equations that have the form ax + b = cy, a topic that has come to be known as diophantine equations. This is an example from Bhaskara's commentary on Aryabhatiya:

Find the number which gives 5 as the remainder when divided by 8, 4 as the remainder when divided by 9, and 1 as the remainder when divided by 7

That is, find N = 8x+5 = 9y+4 = 7z+1. It turns out that the smallest value for N is 85. In general, diophantine equations, such as this, can be notoriously difficult. They were discussed extensively in ancient Vedic text Sulba Sutras, whose more ancient parts might date to 800 BCE. Aryabhata's method of solving such problems is called the kuṭṭaka (कुट्टक) method. Kuttaka means "pulverizing" or "breaking into small pieces", and the method involves a recursive algorithm for writing the original factors in smaller numbers. Today this algorithm, elaborated by Bhaskara in 621 CE, is the standard method for solving first-order diophantine equations and is often referred to as the Aryabhata algorithm.[20] The diophantine equations are of interest in cryptology, and the RSA Conference, 2006, focused on the kuttaka method and earlier work in the Sulvasutras.

Algebra

In Aryabhatiya Aryabhata provided elegant results for the summation of series of squares and cubes:[21]

1 2 + 2 2 + ⋯ + n 2 = n ( n + 1 ) ( 2 n + 1 ) 6 {\displaystyle 1^{2}+2^{2}+\cdots +n^{2}={n(n+1)(2n+1) \over 6}}

and

1 3 + 2 3 + ⋯ + n 3 = ( 1 + 2 + ⋯ + n ) 2 {\displaystyle 1^{3}+2^{3}+\cdots +n^{3}=(1+2+\cdots +n)^{2}}

Rujukan

WikiPedia: Aryabhata http://www.bartleby.com/65/om/OmarKhay.html http://www.etymonline.com/ http://books.google.com/books?id=3zMPFJy6YygC&pg=P... http://books.google.com/books?id=N3DE3GAyqcEC&pg=P... http://books.google.com/books?id=W0Uo_-_iizwC&pg=P... http://books.google.com/books?id=fAsFAAAAMAAJ&pg=P... http://books.google.com/books?id=nh6jgEEqqkkC&pg=P... http://books.google.com/books?id=sEX11ZyjLpYC&pg=P... http://www.hindu.com/yw/2006/02/03/stories/2006020... http://www.scribd.com/doc/20912413/The-Aryabhatiya...