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Вміст надано Breaking Math, Gabriel Hesch, and Autumn Phaneuf. Весь вміст подкастів, включаючи епізоди, графіку та описи подкастів, завантажується та надається безпосередньо компанією Breaking Math, Gabriel Hesch, and Autumn Phaneuf або його партнером по платформі подкастів. Якщо ви вважаєте, що хтось використовує ваш захищений авторським правом твір без вашого дозволу, ви можете виконати процедуру, описану тут https://uk.player.fm/legal.
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80: Physical Dimension (Dimensional Analysis)
Manage episode 367109541 series 1358022
Вміст надано Breaking Math, Gabriel Hesch, and Autumn Phaneuf. Весь вміст подкастів, включаючи епізоди, графіку та описи подкастів, завантажується та надається безпосередньо компанією Breaking Math, Gabriel Hesch, and Autumn Phaneuf або його партнером по платформі подкастів. Якщо ви вважаєте, що хтось використовує ваш захищений авторським правом твір без вашого дозволу, ви можете виконати процедуру, описану тут https://uk.player.fm/legal.
The history of mathematics, in many ways, begins with counting. Things that needed, initially, to be counted were, and often still are, just that; things. We can say we have twelve tomatoes, or five friends, or that eleven days have passed. As society got more complex, tools that had been used since time immemorial, such as string and scales, became essential tools for counting not only concrete things, like sheep and bison, but more abstract things, such as distance and weight based on agreed-upon multiples of physical artifacts that were copied. This development could not have taken place without the idea of a unit: a standard of measuring something that defines what it means to have one of something. These units can be treated not only as counting numbers, but can be manipulated using fractions, and divided into arbitrarily small divisions. They can even be multiplied and divided together to form new units. So where does the idea of a unit come from? What's the difference between a unit, a dimension, and a physical variable? And how does the idea of physical dimension allow us to simplify complex problems? All of this and more on this episode of Breaking Math.
Distributed under a CC BY-SA 4.0 International License. For full text, visit: https://creativecommons.org/licenses/by-sa/4.0/
[Featuring: Sofía Baca; Millicent Oriana, Jacob Urban]
Help Support The Podcast by clicking on the links below:
- Try out ZenCastr w/ 30% DiscountUse my special link to save 30% off your first month of any Zencastr paid plan
- Patreon
- YouTube
- Breaking Math WebsiteEmail us for copies of the transcript!
140 епізодів
Поширити
Manage episode 367109541 series 1358022
Вміст надано Breaking Math, Gabriel Hesch, and Autumn Phaneuf. Весь вміст подкастів, включаючи епізоди, графіку та описи подкастів, завантажується та надається безпосередньо компанією Breaking Math, Gabriel Hesch, and Autumn Phaneuf або його партнером по платформі подкастів. Якщо ви вважаєте, що хтось використовує ваш захищений авторським правом твір без вашого дозволу, ви можете виконати процедуру, описану тут https://uk.player.fm/legal.
The history of mathematics, in many ways, begins with counting. Things that needed, initially, to be counted were, and often still are, just that; things. We can say we have twelve tomatoes, or five friends, or that eleven days have passed. As society got more complex, tools that had been used since time immemorial, such as string and scales, became essential tools for counting not only concrete things, like sheep and bison, but more abstract things, such as distance and weight based on agreed-upon multiples of physical artifacts that were copied. This development could not have taken place without the idea of a unit: a standard of measuring something that defines what it means to have one of something. These units can be treated not only as counting numbers, but can be manipulated using fractions, and divided into arbitrarily small divisions. They can even be multiplied and divided together to form new units. So where does the idea of a unit come from? What's the difference between a unit, a dimension, and a physical variable? And how does the idea of physical dimension allow us to simplify complex problems? All of this and more on this episode of Breaking Math.
Distributed under a CC BY-SA 4.0 International License. For full text, visit: https://creativecommons.org/licenses/by-sa/4.0/
[Featuring: Sofía Baca; Millicent Oriana, Jacob Urban]
Help Support The Podcast by clicking on the links below:
- Try out ZenCastr w/ 30% DiscountUse my special link to save 30% off your first month of any Zencastr paid plan
- Patreon
- YouTube
- Breaking Math WebsiteEmail us for copies of the transcript!
140 епізодів
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Player FM сканує Інтернет для отримання високоякісних подкастів, щоб ви могли насолоджуватися ними зараз. Це найкращий додаток для подкастів, який працює на Android, iPhone і веб-сторінці. Реєстрація для синхронізації підписок між пристроями.
Схожі до Breaking Math Podcast
Come dive into one of the curiously delightful conversations overheard at National Geographic’s headquarters, as we follow explorers, photographers, and scientists to the edges of our big, weird, beautiful world. Hosted by Peter Gwin and Amy Briggs.
…
continue reading
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…
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Player FM - додаток Podcast
Переходьте в офлайн за допомогою програми Player FM !
Переходьте в офлайн за допомогою програми Player FM !
