Backhouse's constant
Backhouse's constant is a mathematical constant named after Nigel Backhouse. Its value is approximately 1.456 074 948. It is defined by using the power series such that the coefficients of successive terms are the prime numbers, and its multiplicative inverse as a formal power series, Then: . This limit was conjectured to exist by Backhouse, and later proven by Philippe Flajolet.
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Backhouse's constant
Backhouse's constant is a mathematical constant named after Nigel Backhouse. Its value is approximately 1.456 074 948. It is defined by using the power series such that the coefficients of successive terms are the prime numbers, and its multiplicative inverse as a formal power series, Then: . This limit was conjectured to exist by Backhouse, and later proven by Philippe Flajolet.
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Backhouse's constant is a math ...... r proven by Philippe Flajolet.
@en
Inom matematiken är Backhouse ...... ouse och bevisades senare av .
@sv
백하우스 상수(Backhouse's constant)는 나이젤 백하우스(Nigel Backhouse)의 이름을 딴 수학 상수다.
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title
Backhouse's Constant
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BackhousesConstant
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Backhouse's constant is a math ...... r proven by Philippe Flajolet.
@en
Inom matematiken är Backhouse ...... ouse och bevisades senare av .
@sv
백하우스 상수(Backhouse's constant)는 나이젤 백하우스(Nigel Backhouse)의 이름을 딴 수학 상수다.
@ko
label
Backhouse's constant
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Backhouses konstant
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백하우스 상수
@ko