(ε, δ)-definisie van 'n limiet: Verskil tussen weergawes
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Nuwe bladsy geskep met 'thumb|right|Whenever a point ''x'' is within δ units of ''c'', ''f''(''x'') is within ε units of ''L'' In calculus, die '''(ε, δ)-de...' |
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[[File:Límite 01.svg|thumb|right|Whenever a point ''x'' is within δ units of ''c'', ''f''(''x'') is within ε units of ''L'']] |
[[File:Límite 01.svg|thumb|right|Whenever a point ''x'' is within δ units of ''c'', ''f''(''x'') is within ε units of ''L'']] |
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In [[calculus]], die '''(ε, δ)-definisie van `n limiet''' ("[[epsilon]]-[[delta (letter)|delta]] definisie van `n limiet") is `n amptelike weergawe van die konsep van `n [[Limit of a function|limit]]. Dit was eerste beskryf deur [[Bernard Bolzano]] in 1817, gevolg deur `n minder presiese weergawe deur [[Augustin-Louis Cauchy]]. Die defnitiewe moderne stelling was verskaf deur [[Karl Weierstrass]] |
In [[calculus]], die '''(ε, δ)-definisie van `n limiet''' ("[[epsilon]]-[[delta (letter)|delta]] definisie van `n limiet") is `n amptelike weergawe van die konsep van `n [[Limit of a function|limit]]. Dit was eerste beskryf deur [[Bernard Bolzano]] in 1817, gevolg deur `n minder presiese weergawe deur [[Augustin-Louis Cauchy]]. Die defnitiewe moderne stelling was verskaf deur [[Karl Weierstrass]] |
Wysiging soos op 12:03, 20 September 2013
In calculus, die (ε, δ)-definisie van `n limiet ("epsilon-delta definisie van `n limiet") is `n amptelike weergawe van die konsep van `n limit. Dit was eerste beskryf deur Bernard Bolzano in 1817, gevolg deur `n minder presiese weergawe deur Augustin-Louis Cauchy. Die defnitiewe moderne stelling was verskaf deur Karl Weierstrass