bac-s-maths 2018 QIII.B.2

bac-s-maths · France · centres-etrangers Discrete Probability Distributions Recurrence Relations and Sequences Involving Probabilities

A customer is chosen at random from those who bought a melon during week 1. Among customers who buy a melon in a given week, $90\%$ of them buy a melon the following week; among customers who do not buy a melon in a given week, $60\%$ of them do not buy a melon the following week. For $n \geqslant 1$, we set $p_n = P(A_n)$, where $A_n$ is the event ``the customer buys a melon during week $n$''. Thus $p_1 = 1$. Prove that, for all integer $n \geqslant 1$: $p_{n+1} = 0{,}5\, p_n + 0{,}4$.

A customer is chosen at random from those who bought a melon during week 1. Among customers who buy a melon in a given week, $90\%$ of them buy a melon the following week; among customers who do not buy a melon in a given week, $60\%$ of them do not buy a melon the following week. For $n \geqslant 1$, we set $p_n = P(A_n)$, where $A_n$ is the event ``the customer buys a melon during week $n$''. Thus $p_1 = 1$.\\
Prove that, for all integer $n \geqslant 1$: $p_{n+1} = 0{,}5\, p_n + 0{,}4$.

Paper Questions

QI.1 QI.2 QI.3 QII.1 QII.2 QII.3 QII.4 QIII.A.1 QIII.A.2 QIII.A.3 QIII.B.1 QIII.B.2 QIII.B.3 QIII.B.4 QIV.A QIV.B QIV.C