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revisionmaths.com | ||
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www.myhealthatvanderbilt.com
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www.johndcook.com
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| | | | | How the Pythagorean theorem, law of sines, and law of cosines translate to hyperbolic geometry. | |
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corbettmaths.com
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| | | | | The Ultimate GCSE Higher Maths Revision Video and Booklet - Edexcel AQA OCR - Corbettmaths | |
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www.marxists.org
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| | | [AI summary] The text explores Zeno's paradoxes, particularly focusing on the concept of continuity and its implications for motion. Zeno's arguments, such as the 'Achilles and the Tortoise' and the 'Arrow' paradox, challenge the notion of motion by suggesting that motion is impossible due to the infinite divisibility of space and time. The text also discusses how Aristotle attempts to resolve these paradoxes by emphasizing the continuous nature of time and space, allowing for the possibility of motion despite infinite divisibility. The discussion highlights the philosophical and mathematical implications of these paradoxes and their relevance to understanding motion and continuity. | ||
