Numbers are Serious but they are also Fun - Michael Atiyah
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- čas přidán 23. 05. 2018
- Oxford Mathematics Public Lectures - Numbers are Serious but they are also Fun - Michael Atiyah
Archimedes, who famously jumped out of his bath shouting "Eureka", also 'invented' the number pi. Euler invented e and had fun with his formula e^(2 pi i) = 1. The world is full of important numbers waiting to be invented. Why not have a go?
Michael Atiyah is one of the world's leading mathematicians and a pivotal figure in twentieth and twenty-first century mathematics. His lecture is followed by an interview with Sir John Ball, Sedleian Professor of Natural Philosophy here in Oxford, where Michael talks about his lecture, his work and his life as a mathematician.
The Oxford Mathematics Public Lectures are generously supported by XTX Markets.
Sadly Sir Michael died in January 2019. What a fascinating man. RIP.
I have deep respect and love for Sir Michael. I emailed him yesterday and he responded immediately. His humility and simplicity must be admired.
rest in peace Professor, the echo of your work will stay as long as humans will walk this Earth.
His lectures are so entertaining it’s like watching a good show or movie! Great man
Because of Sir Michael's presentation on Modulo-geometrical = trig matters, the concepts of Pi and the Exponential as created numbers starts to make sense for the inherited traditions of Mathematical thought, and the explanation of an Origin of omnidirectional-dimensional cause-effect self-defining Actuality observed and translated into practical Intuition confirmation of music-math reciprocation-recirculation potential positioning measurement rules.
Ie the distinction between trivial pseudo random 0-1-2-ness connection and Absolute placement of line-of-sight relative-timing ratio-rates, @Zero-infinity reference-framing-> entangled => containment of/by i-reflection 2-ness in 3-ness Singularity-point positioning, Totality Conception in/of Eternity-now e-Pi-i 1-0-infinity sync-duration Unit Circle Apature of Centre of Logarithmic Time resonance = modulo-geometrical radial-resonance expectations of inside-outside prime-cofactor continuity, ..in/of log-antilog Condensates as form following functional relative-timing "numbers".
(Well "it follows" in parallel coexistence configuration with the context/content of his lectures)
Awesome lecture
Hello Oxford, I'm from Brazil solving the formula zeta sums 3+3+3+3... to infinity and the 7+7+7+7... to infinity after the perfect squares odd minus with final 5 example 9×9.11×11.13 ×13...it won't stop
What a lovely person he was. Rest in peace.
Funniest mathematician lecture ever.
wtf why would anyone dislike this video ...
Great Video
Let me just leave this here:
RESPECT
♥️
Hello Oxford I'm from Brazil I showed you the formula all non-cousins automatically you discover the cousins
And with proper massaging and encouragements they could lie through their teeth, as well.