Squeeze theorem: Difference between revisions
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{{First pic|Calculus demonstration | {{First pic|Calculus demonstration 2.jpg|Part of the [[Mathematical proof|demonstration]] made by the [[Twelfth Doctor]]. ([[TV]]: ''[[The Pilot (TV story)|The Pilot]]'')}} | ||
The [[Twelfth Doctor]] once used the '''squeeze theorem''' to prove that | The [[Twelfth Doctor]] once used the '''squeeze theorem''' to [[Mathematical proof|prove]] that <math>\lim_{\theta\to 0} \frac {sin \theta} {\theta} = 1</math>. During the [[Mathematical proof|demonstration]], the Doctor used [[Mathematics|mathematical]] concepts such as [[sine|sin]], [[cosine|cos]], [[tangent|tan]], [[inequality|inequalities]] and [[limit]]. ([[TV]]: ''[[The Pilot (TV story)|The Pilot]]'') | ||
During the demonstration, the Doctor used [[Mathematics|mathematical]] concepts such as [[sine|sin]], [[cosine|cos]], [[ | |||
== Behind the scenes == | == Behind the scenes == | ||
Although the name "squeeze theorem" wasn't used, and the demonstration wasn't explained by the Doctor, it is a faily basic calculus theorem, and can be recognised by the viewers. | Although the name "squeeze theorem" wasn't used, and the demonstration wasn't explained by the Doctor, it is a faily basic calculus theorem, and can be recognised by the viewers. | ||
[[Category:Mathematics from the real world]] | [[Category:Mathematics from the real world]] | ||
Latest revision as of 17:59, 3 September 2020
The Twelfth Doctor once used the squeeze theorem to prove that . During the demonstration, the Doctor used mathematical concepts such as sin, cos, tan, inequalities and limit. (TV: The Pilot)
Behind the scenes[[edit] | [edit source]]
Although the name "squeeze theorem" wasn't used, and the demonstration wasn't explained by the Doctor, it is a faily basic calculus theorem, and can be recognised by the viewers.
