Feller's coin-tossing constants
http://dbpedia.org/resource/Feller's_coin-tossing_constants an entity of type: WikicatMathematicalConstants
Feller's coin-tossing constants are a set of numerical constants which describe asymptotic probabilities that in n independent tosses of a fair coin, no run of k consecutive heads (or, equally, tails) appears. William Feller showed that if this probability is written as p(n,k) then where αk is the smallest positive real root of and
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Feller's coin-tossing constants
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10818503
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Feller's coin-tossing constants are a set of numerical constants which describe asymptotic probabilities that in n independent tosses of a fair coin, no run of k consecutive heads (or, equally, tails) appears. William Feller showed that if this probability is written as p(n,k) then where αk is the smallest positive real root of and
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2575