Mahāvīra (mathematician)

Rules for decomposing fractions

Mahāvīra's Gaṇita-sāra-saṅgraha gave systematic rules for expressing a fraction as the sum of unit fractions. This follows the use of unit fractions in Indian mathematics in the Vedic period, and the Śulba Sūtras' giving an approximation of √2 equivalent to 1 + 1 3 + 1 3 ⋅ 4 − 1 3 ⋅ 4 ⋅ 34 .

In the Gaṇita-sāra-saṅgraha (GSS), the second section of the chapter on arithmetic is named kalā-savarṇa-vyavahāra (lit. "the operation of the reduction of fractions"). In this, the bhāgajāti section (verses 55–98) gives rules for the following:

To express 1 as the sum of n unit fractions (GSS kalāsavarṇa 75, examples in 76):

rūpāṃśakarāśīnāṃ rūpādyās triguṇitā harāḥ kramaśaḥ /

dvidvitryaṃśābhyastāv ādimacaramau phale rūpe //

When the result is one, the denominators of the quantities having one as numerators are [the numbers] beginning with one and multiplied by three, in order. The first and the last are multiplied by two and two-thirds [respectively].

To express 1 as the sum of an odd number of unit fractions (GSS kalāsavarṇa 77):

To express a unit fraction 1 / q as the sum of n other fractions with given numerators a 1 , a 2 , … , a n (GSS kalāsavarṇa 78, examples in 79):

To express any fraction p / q as a sum of unit fractions (GSS kalāsavarṇa 80, examples in 81):

Choose an integer i such that q + i p is an integer r, then write p q = 1 r + i r ⋅ q and repeat the process for the second term, recursively. (Note that if i is always chosen to be the smallest such integer, this is identical to the greedy algorithm for Egyptian fractions.)

To express a unit fraction as the sum of two other unit fractions (GSS kalāsavarṇa 85, example in 86):

To express a fraction p / q as the sum of two other fractions with given numerators a and b (GSS kalāsavarṇa 87, example in 88):

Some further rules were given in the Gaṇita-kaumudi of Nārāyaṇa in the 14th century.