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What is Pythagoras eduction?
Pythagoras education was mathematics and was taught by other people
What is the history of Pythagoras?
Pythagoras (569-500 B.C.E.) was born on the island of Samos in Greece, and did much traveling through Egypt, learning, among other things, mathematics. Not much more is known of his early years. Pythagoras gained his famous status by founding a group, the Brotherhood of Pythagoreans, which was devoted to the study of mathematics
What is Pythagoras well known for in your mathematics books?
The 'Pythagorean Theorems. eg:- "The square on the hypotenuse is equal to the sum of the squares on the other two sides."
What did Pythagoras and Parmenides think?
Pythagoras believed that everything in the universe could be represented and understood through numbers, and that mathematics was the key to unlocking the mysteries of nature. Parmenides, on the other hand, argued that change and motion were illusions and that reality was unchanging and indivisible.
What major accomplishments was Pythagoras remember for?
In a 90-degree angle of a triangle is the hypotenuse squared is equal to the sum of squares of other two sides. Reasoning in mathematics. Number theory.
Are there other ancient Greek doctors other than Hippocrates?
Yes! The National Library of Medicine has a lot of good information on other ancient Greek doctors such as Galen, Dioscorides, Pythagoras (who is better known for his work in mathematics), and Artemidorus.
When did Pythagoras make his school?
Pythagoras didn't make a school, Other people made the school in honor of Pythagoras
What difference has Pythagoras' discovery made?
Pythagoras' discovery of the Pythagorean theorem revolutionized mathematics by establishing a fundamental relationship between the sides of right-angled triangles. This theorem, stating that the square of the hypotenuse equals the sum of the squares of the other two sides, has applications across various fields, including architecture, engineering, physics, and computer science. It also laid the groundwork for further developments in geometry and trigonometry, influencing mathematical thought for centuries. Overall, Pythagoras' work has had a lasting impact on both theoretical and practical aspects of mathematics.
Is pi and Pythagoras the same thing?
No, pi and Pythagoras are not the same thing. Pi (π) is a mathematical constant representing the ratio of a circle's circumference to its diameter, approximately equal to 3.14159. Pythagoras, on the other hand, was an ancient Greek philosopher and mathematician known for the Pythagorean theorem, which relates the lengths of the sides of a right triangle. While both are fundamental concepts in mathematics, they refer to different ideas.
What other family members does Pythagoras have?
Well Pythagoras is not really known for family .
What did pothageris figgure out?
Pythagoras, an ancient Greek philosopher and mathematician, is best known for formulating the Pythagorean theorem, which relates to right triangles. The theorem states that in a right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other two sides. This fundamental principle has far-reaching implications in mathematics, geometry, and various fields of science and engineering. Pythagoras also contributed to concepts in number theory and the philosophy of mathematics.
How did the discoveries of the Greeks change from the time of Pythagoras to the time of Eratosthenes?
The discoveries of the Greeks evolved significantly from the time of Pythagoras to Eratosthenes, reflecting a shift from abstract mathematical theories to practical applications in science and geography. Pythagoras focused on numbers, proportions, and the properties of geometric shapes, laying the groundwork for mathematical thought. By the time of Eratosthenes, there was a greater emphasis on empirical observation and the application of mathematics to real-world problems, as seen in his calculation of the Earth's circumference and the development of a more systematic approach to geography. This transition highlights the growing integration of mathematics with other fields of knowledge.
