De Moivre’s book “The Doctrine of Chances” (2) is thorough account of what was known about probability and annuities. The proof that is the object of this paper is included in the very last pages of the book (pages 235-243). The aim of the present paper is to explicate De Moivre’s first part of the proof in such a way that we can trace back the reasoning behind this creation has shaped the modern way of doing science
Ars Conjectandi (English: The Art of Conjecturing) is a book on combinatorics and mathematical proba...
The following files accompany this module 07_Gombaud_Solution.xls 07_FACT_COMBIN_PERMUT.xlsx 07_Ex...
In this paper I introduced a new Probability mass function (Pmf) that is named as Pavan’s Pmf then u...
De Moivre’s book “The Doctrine of Chances” (2) is thorough account of what was known about probabili...
Abraham de Moivre (1667-1754) a French mathematician, is known among other for the normal distributi...
Jacob Bernoulli worked for many years on the manuscript of his book Ars Conjectandi, but it was inco...
This study is concerned with aspects of the early history of the Probability Calculus up to the time...
This paper describes the contribution of the four famous Bernoullis (Jacob, Johann, Daniel and Nicol...
The first person to attempt an answer to the question of how to determine probability from observed ...
AbstractThe coincidence of two independent developments led to the mathematization of probability fr...
Esta investigação tem como objetivo a história da origem da curva normal identificando a contribuiçã...
Seventeenth century "chance combinatorics" was a self-contained theory. It had an objective notion o...
The central limit theorem ranks high amongst the most important discoveries in the field of mathemat...
Some experiments are composed of repetition of independent trials, denoted by n, each with two possi...
The aim of this tutorial is to show that, when properly formulated, probability theory is simply the...
Ars Conjectandi (English: The Art of Conjecturing) is a book on combinatorics and mathematical proba...
The following files accompany this module 07_Gombaud_Solution.xls 07_FACT_COMBIN_PERMUT.xlsx 07_Ex...
In this paper I introduced a new Probability mass function (Pmf) that is named as Pavan’s Pmf then u...
De Moivre’s book “The Doctrine of Chances” (2) is thorough account of what was known about probabili...
Abraham de Moivre (1667-1754) a French mathematician, is known among other for the normal distributi...
Jacob Bernoulli worked for many years on the manuscript of his book Ars Conjectandi, but it was inco...
This study is concerned with aspects of the early history of the Probability Calculus up to the time...
This paper describes the contribution of the four famous Bernoullis (Jacob, Johann, Daniel and Nicol...
The first person to attempt an answer to the question of how to determine probability from observed ...
AbstractThe coincidence of two independent developments led to the mathematization of probability fr...
Esta investigação tem como objetivo a história da origem da curva normal identificando a contribuiçã...
Seventeenth century "chance combinatorics" was a self-contained theory. It had an objective notion o...
The central limit theorem ranks high amongst the most important discoveries in the field of mathemat...
Some experiments are composed of repetition of independent trials, denoted by n, each with two possi...
The aim of this tutorial is to show that, when properly formulated, probability theory is simply the...
Ars Conjectandi (English: The Art of Conjecturing) is a book on combinatorics and mathematical proba...
The following files accompany this module 07_Gombaud_Solution.xls 07_FACT_COMBIN_PERMUT.xlsx 07_Ex...
In this paper I introduced a new Probability mass function (Pmf) that is named as Pavan’s Pmf then u...