60: HAMILTON! [But Not the Musical] (Quaternions)

i^2 = j^2 = k^2 = ijk = -1. This deceptively simple formula, discovered by Irish mathematician William Rowan Hamilton in 1843, led to a revolution in the way 19th century mathematicians and scientists thought about vectors and rotation. This formula, which extends the complex numbers, allows us to talk about certain three-dimensional problems with more ease. So what are quaternions? Where are they still used? And what is inscribed on Broom Bridge? All of this and more on this episode of Breaking Math. This episode is distributed under a CC BY-SA 4.0 license. For more information, visit CreativeCommons.org. The theme for this episode was written by Elliot Smith. [Featuring: Sofía Baca, Meryl Flaherty]

Om Podcasten

Hosted by Gabriel Hesch and Autumn Phaneuf, who have advanced degrees in electrical engineering and industrial engineering/operations research respectively, come together to discuss mathematics as a pure field all in its own as well as how it describes the language of science, engineering, and even creativity.   Breaking Math brings you the absolute best in interdisciplinary science discussions -  bringing together experts in varying fields including artificial intelligence, neuroscience, evolutionary biology, physics, chemistry and materials-science, and more -  to discuss where humanity is headed. website:  breakingmath.io  linktree:  linktree.com/breakingmathmedia email:  breakingmathpodcast@gmail.com