Aryabhatta biography for class 7th
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Biography of Aryabhatta
The first Indian to study mathematics and astronomy was Aryabhatta. He was extremely knowledgeable in maths. Additionally, he made a number of discoveries throughout his time.Examples of some of them include the identification of algebraic identities, the value of pi, the discovery of trigonometric functions, and the place value system.
Additionally, he published a number of publications that are still useful to us now for completing computations. Many children were greatly influenced by Aryabhatta. From a very young age, he displayed intellectual talent.Additionally, he made significant contributions to society, and as a result, his ideas and works continue to be revered and remembered.Aryabhatta made significant contributions to mathematics. For example, he is credited with developing a number of trigonometrical functions that are still relevant today.
Additionally, his discovery of the meaning of "pi" simplified the difficulties in mathematics. The place value system and zero, which are two of his most significant contributions to the history of mathematics, were both founded by him. The fact that every idea in his book "Aryabhatiya," which outlines astronomical theories, is noteworthy. Additionally, he divided his book into many astronomy and mathematics sections.
Aryabhatta made significant contributions to astronomy in addition to his mathematical achievements. The planets are said to revolve around the Sun according to the heliocentric hypothesis he developed. The speed of the several planets relative to the Sun was computed using this idea.
In his book, Aryabhata also provided an explanation of solar and lunar eclipses. In light of this, he also suggested that the moon exists because of sunlight reflection. He clarified in his work that the earth and moon's shadows cause both lunar eclipses and solar eclipses.
In conclusion, astronomical estimations made by Aryabhatta were fairly precise. It supplied the computational paradigm's foundation, which serves as the groundwork for contemporary theories.
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