I think it’s important to clarify that describing the Babylonian method of estimating the area under a curve using trapezoids as "proto-integration" or "pre-calculus" might be a bit misleading. While their approach demonstrates an impressive grasp of geometry and an early method for approximating areas, it doesn't quite align with the formal development of calculus that emerged centuries later.
Madhava of Sangamagrama, a 14th-century Indian mathematician, made groundbreaking contributions to calculus that were far more advanced. He is known for discovering infinite series expansions for trigonometric functions such as sine, cosine, and arctangent, as well as deriving power series for π. His work included innovative methods for numerically approximating π to remarkable precision. In comparison, Madhava's achievements represent a significant evolution in mathematical thought. While the Babylonians were certainly ahead of their time, their techniques were still relatively basic when juxtaposed with the sophisticated concepts introduced by Madhava. His work laid critical groundwork for the later development of calculus by figures like Newton and Leibniz.
The Babylonians, while advanced for their time, were still operating in a more primitive mathematical framework. So while the Babylonians showed an inkling of ideas that would later blossom into calculus, it's an overstatement to equate their methods directly with calculus. Madhava's work represents a much more mature and developed understanding of these concepts. The Babylonians were pioneers, but Madhava was a revolutionary in comparison. Let's give credit where it's due!
Madhava of Sangamagrama, a 14th-century Indian mathematician, made groundbreaking contributions to calculus that were far more advanced. He is known for discovering infinite series expansions for trigonometric functions such as sine, cosine, and arctangent, as well as deriving power series for π. His work included innovative methods for numerically approximating π to remarkable precision. In comparison, Madhava's achievements represent a significant evolution in mathematical thought. While the Babylonians were certainly ahead of their time, their techniques were still relatively basic when juxtaposed with the sophisticated concepts introduced by Madhava. His work laid critical groundwork for the later development of calculus by figures like Newton and Leibniz.
The Babylonians, while advanced for their time, were still operating in a more primitive mathematical framework. So while the Babylonians showed an inkling of ideas that would later blossom into calculus, it's an overstatement to equate their methods directly with calculus. Madhava's work represents a much more mature and developed understanding of these concepts. The Babylonians were pioneers, but Madhava was a revolutionary in comparison. Let's give credit where it's due!