What are the odds of a mother giving birth to 3 children on 3 consecutive days, different years? Example: June 7, 1960, June 8, 1964, June 9, 1968 These were all natural births, no induced deliveries.
What are the odds of a mother giving birth to three children on three consecutive days, different years? June 7, 1960, June 8, '64, June 9, '68
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2That needs some pretty specific assumptions about the probability distribution of the time between two consecutive births. Lots of explicit choice on the part of the parents go into the calculation too. – 2012-06-02
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1If those are all C-sections then the probability is pretty good. – 2012-06-02
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1The question cannot be answered without knowledge of a vast array of real world data. Is an average baby equally likely to be born on any given day of the year? How many mothers have three children at all? – 2012-06-02
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1Perhaps her husband worked was a sailor and came visit home the first days of every september...? things like these can affect probability in a serious way. – 2012-06-03
1 Answers
One draws uniformly and independently three elements $x_1$, $x_2$ and $x_3$ of $\mathbb Z/N\mathbb Z$. Consider the event $A$ that there exists some $k$ in $\mathbb Z/N\mathbb Z$ such that $\{x_1,x_2,x_3\}=\{k,k+1,k+2\}$. Assume that $x_1=i$. Then, $A$ can happen in several ways:
- If $x_2=i+1$, then $x_3=i+2$ or $x_3=i-1$: this happens with probability $\frac1N\frac2N$.
- If $x_2=i-1$, then $x_3=i-2$ or $x_3=i+1$: this happens with probability $\frac1N\frac2N$.
- If $x_2=i+2$, then $x_3=i+1$: this happens with probability $\frac1N\frac1N$.
- If $x_2=i-2$, then $x_3=i-1$: this happens with probability $\frac1N\frac1N$.
Thus, the probability that $A$ happens is $\frac6{N^2}$.
In the present case, $N=365$ but note that the result only assumes that all the points $i-2$, $i-1$, $i$, $i+1$ and $i+2$ are different in $\mathbb Z/N\mathbb Z$, that is, that $N\geqslant5$. This also considers that December 31st and January 1st are consecutive days. More importantly, as explained in the comments, this assumes at the onset that some nontrivial and pretty unrealistic modeling hypothesis hold: the uniform distribution of each birth date and the independence of the different birth dates.