Indeterminate Equations of the First Degree
Āryabhaṭa I (476) [1]was the earliest Hindu Algebraist worked on the Indeterminate Equations of the First Degree. He provided a method for solving the simple indeterminate equation
where a, b and c are integers.He also provided how to extend this to solve Simultaneous Indeterminate Equations of the first degree.
Bhāskara I (522) disciple of Āryabhaṭa I has displayed that the same method might be applied to solve the equation
and further that the solution of this equation would follow from that of
Brahmagupta and others followed the methods of Āryabhaṭa I and Bhāskara I
Importance
The subject of indeterminate analysis of the first degree was considered so important by ancient Hindu Algebraists that the whole science of algebra was once named after it. Āryabhaṭa II , Bhāskara II and others mentions precisely along with the sciences of arithmetic, algebra and astronomy.
On account of its special importance exclusive work on this entitled kuṭṭākāra śiromaṇi by Devarāja a commentator of of Āryabhaṭa I.
Varieties of Problems
There are three varieties of problems.
Variety 1 Three Varieties of Problems. Problems whose
solutions led the ancient Hindus to the investigation
of the simple indeterminate equation of the first degree
were distinguished broadly into three varieties. The
problem of one variety. is to find a number (N) which
being divided by two given numbers (a, b) will leave
two given remainders (Rl' R2). Thus we have
N = ax + Rl = by + R 2•
Hence by - ax = Rl - R2•
Putting c = Rl ,_, R2,
we get by - ax = ±c
the upper or lower sign being taken according as Rl
> or < R2• In a pro blem of the second kind we are
required to find a number (x) such that its product with
a given number (a) being increased or decreased .by
another given number .(v) and then divided by a 'third
given number (~) will leave no remainder. In other
words we shall have to solve
ax±- v =Y
~
in positive integers. The third variety of problems
similarly leads to equations of the form
by + ax = ± c.
References
- ↑ Datta, Bibhutibhusan; Narayan Singh, Avadhesh (1962). History of Hindu Mathematics. Mumbai: Asia Publishing House.