Tom Rocks Maths | Paradoxes and Supertasks: Zeno, Littlewood-Ross and Thomson's Lamp @TomRocksMaths | Uploaded 3 years ago | Updated 2 hours ago
Tom Rocks Maths intern Kira Miller discusses the philosophy of 'supertasks' and how they are related to Zeno's Paradox, Thomson's Lamp and the Littlewood-Ross Paradox.
Zeno's Paradox looks at convergent infinite sequences in the context of Achilles racing against a tortoise which is given a head-start.
Thomson's Lamp is a paradox relating to a lamp that is switched on and off at increasingly small time intervals before noon - will it be on or off as the clock strikes 12?
The Littlewood-Ross Paradox talks about filling an infinite jar with infinitely many marbles, but removing them following a defined pattern. In each case we are considering infinity minus infinity, but the results differ significantly...
Produced by Kira Miller with assistance from Dr Tom Crawford at the University of Oxford.
Kira is a third year undergraduate student at the University of Oxford studying Maths and Philosophy. Tom is an Early-Career Teaching and Outreach Fellow at St Edmund Hall: seh.ox.ac.uk/people/tom-crawford
For more maths content check out Tom's website tomrocksmaths.com
You can also follow Tom on Facebook, Twitter and Instagram @tomrocksmaths.
facebook.com/tomrocksmaths
twitter.com/tomrocksmaths
instagram.com/tomrocksmaths
Get your Tom Rocks Maths merchandise here:
beautifulequations.net/collections/tom-rocks-maths
Tom Rocks Maths intern Kira Miller discusses the philosophy of 'supertasks' and how they are related to Zeno's Paradox, Thomson's Lamp and the Littlewood-Ross Paradox.
Zeno's Paradox looks at convergent infinite sequences in the context of Achilles racing against a tortoise which is given a head-start.
Thomson's Lamp is a paradox relating to a lamp that is switched on and off at increasingly small time intervals before noon - will it be on or off as the clock strikes 12?
The Littlewood-Ross Paradox talks about filling an infinite jar with infinitely many marbles, but removing them following a defined pattern. In each case we are considering infinity minus infinity, but the results differ significantly...
Produced by Kira Miller with assistance from Dr Tom Crawford at the University of Oxford.
Kira is a third year undergraduate student at the University of Oxford studying Maths and Philosophy. Tom is an Early-Career Teaching and Outreach Fellow at St Edmund Hall: seh.ox.ac.uk/people/tom-crawford
For more maths content check out Tom's website tomrocksmaths.com
You can also follow Tom on Facebook, Twitter and Instagram @tomrocksmaths.
facebook.com/tomrocksmaths
twitter.com/tomrocksmaths
instagram.com/tomrocksmaths
Get your Tom Rocks Maths merchandise here:
beautifulequations.net/collections/tom-rocks-maths