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• Conway_base_13_function abstract "The Conway base 13 function is a function created by British mathematician John H. Conway as a counterexample to the converse of the intermediate value theorem. In other words, even though Conway's function f is not continuous, if f(a) < f(b) and an arbitrary value x is chosen such that f(a) < x < f(b), a point c lying between a and b can always be found such that f(c) = x. In fact, this function is even stronger than this: it takes on every real value in each interval on the real line.".
• Conway_base_13_function wikiPageID "11151490".
• Conway_base_13_function wikiPageRevisionID "596506861".
• Conway_base_13_function hasPhotoCollection Conway_base_13_function.
• Conway_base_13_function subject Category:Functions_and_mappings.
• Conway_base_13_function comment "The Conway base 13 function is a function created by British mathematician John H. Conway as a counterexample to the converse of the intermediate value theorem. In other words, even though Conway's function f is not continuous, if f(a) < f(b) and an arbitrary value x is chosen such that f(a) < x < f(b), a point c lying between a and b can always be found such that f(c) = x. In fact, this function is even stronger than this: it takes on every real value in each interval on the real line.".
• Conway_base_13_function label "Conway base 13 function".
• Conway_base_13_function label "Funzione base-13 di Conway".
• Conway_base_13_function sameAs Funzione_base-13_di_Conway.
• Conway_base_13_function sameAs m.02r1r06.
• Conway_base_13_function sameAs Q2896394.
• Conway_base_13_function sameAs Q2896394.
• Conway_base_13_function wasDerivedFrom Conway_base_13_function?oldid=596506861.
• Conway_base_13_function isPrimaryTopicOf Conway_base_13_function.