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• Normal_order_of_an_arithmetic_function abstract "In number theory, a normal order of an arithmetic function is some simpler or better-understood function which "usually" takes the same or closely approximate values.Let ƒ be a function on the natural numbers. We say that g is a normal order of ƒ if for every ε > 0, the inequalitieshold for almost all n: that is, if the proportion of n ≤ x for which this does not hold tends to 0 as x tends to infinity.It is conventional to assume that the approximating function g is continuous and monotone.".
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• Normal_order_of_an_arithmetic_function citation "cite book".
• Normal_order_of_an_arithmetic_function hasPhotoCollection Normal_order_of_an_arithmetic_function.
• Normal_order_of_an_arithmetic_function page "473".
• Normal_order_of_an_arithmetic_function title "Normal Order".
• Normal_order_of_an_arithmetic_function urlname "NormalOrder".
• Normal_order_of_an_arithmetic_function subject Category:Arithmetic_functions.
• Normal_order_of_an_arithmetic_function type Abstraction100002137.
• Normal_order_of_an_arithmetic_function type ArithmeticFunctions.
• Normal_order_of_an_arithmetic_function type Function113783816.
• Normal_order_of_an_arithmetic_function type MathematicalRelation113783581.
• Normal_order_of_an_arithmetic_function type Relation100031921.
• Normal_order_of_an_arithmetic_function comment "In number theory, a normal order of an arithmetic function is some simpler or better-understood function which "usually" takes the same or closely approximate values.Let ƒ be a function on the natural numbers. We say that g is a normal order of ƒ if for every ε > 0, the inequalitieshold for almost all n: that is, if the proportion of n ≤ x for which this does not hold tends to 0 as x tends to infinity.It is conventional to assume that the approximating function g is continuous and monotone.".
• Normal_order_of_an_arithmetic_function label "Normal order of an arithmetic function".
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• Normal_order_of_an_arithmetic_function sameAs Normal_order_of_an_arithmetic_function.
• Normal_order_of_an_arithmetic_function wasDerivedFrom Normal_order_of_an_arithmetic_function?oldid=566061367.
• Normal_order_of_an_arithmetic_function isPrimaryTopicOf Normal_order_of_an_arithmetic_function.