________________ [2.2] In the second section, we shall show that the Jaina school of Indian mathematics had [a] an idea of evaluation of the nth power of a number and [b] an exclusive idea of the act of lifting a number to its own power. [2.2.1] The Method for evaluating a" In context of finding the sum of a geometric progression, Mahavira (c. 850 A.D.) gives a method for evaluating a", when n is any positive integer, as follows: [a] If n is even, it is divided by 2 and a zero is put is a separate column, and if n is odd, unity is subtracted from it and unity is put in the column. The process is repeated till zero is obtained in the end. [b] In the column, the lowest term is always unity. It is multiplied by a and we get a. If there is zero above unity, this a is squared and if there is another unity, it is multiplied by a again. The process is continued till the highest term is disposed. In this way, a" is evaluated. If n = 12, we shall have Jain Education International 12 even 1226 even 6 ÷ 2 = 3 odd 312 even 2 2 1 odd 1-1=0 0 0 1 0 1 (a) = a12 12 (a3)" = a6 (a2). a = a3 (a)2 a2 = the end. This is what is known as the multiplication-square (gunana-vargaja) process. It was known to Pirigala (c. 200 B.C.) long before Mahavira (c. 850 A.D.) and Sridhara (c. 799 A.D.) and had been used by him in his Chandah-sutra (Rules of Meters) 5 for finding 2". [2.2.2] Vargana-samavargana 1.a = a The ancient philosopher Jainas have discussed cosmological system and 57 Arhat Vacana, 15 (4), 2003 For Private & Personal Use Only www.jainelibrary.org