Indian mathematicians, such as Brahmagupta (AD 598–670) and Bhaskara II (AD 1114–1185), developed nonsymbolic, yet very precise, procedures for solving first- and second-degree equations and equations with more than one variable. However, the main contribution of Indian mathematicians was the elaboration of the decimal, positional numeral system. A full-fledged decimal, positional system certainly existed in India by the 9th century, yet many of its central ideas had been transmitted well before that time to China and the Islamic world. Indian arithmetic, moreover, developed consistent and correct rules for operating with positive and negative numbers and for treating zero like any other number. Several hundred years passed before European mathematicians fully integrated such ideas into the developing discipline of algebra.
Chinese mathematicians during the period parallel to the European Middle Ages developed their own methods for classifying and solving quadratic equations by radicals—solutions that contain only combinations of the most tractable operations: addition, subtraction, multiplication, division, and taking roots. They were unsuccessful, however, in their attempts to obtain exact solutions to higher-degree equations. Instead, they developed approximation methods of high accuracy, such as those described in Yang Hui’s Yang Hui suanfa (1275; “Yang Hui’s Mathematical Methods”). The calculational advantages afforded by their expertise with the abacus may help explain why Chinese mathematicians gravitated to numerical analysis methods
