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Assuming that our crystal ball tells us that fifteen cut-throat murders of female adults will occur in the coming year, throughout England, what are the odds against any two of them occurring on the same day?
They are much, much, much, … LOWER than I had realized.
In my attempts to formulate a meaningful set of odds against the occurrence of a multi-perpetrator 'Double Event', I have erroneously relied upon the concept of a simple Joint probability: i.e. the probability of outcomes A and B, where A and B are independent of each other.
Case in Point:
If our crystal ball were to tell us that fifteen cut-throat murders of female adults would occur in the coming year, throughout England, what would be the odds against any two of them occurring on the same day?
The concept of Joint probability dictates that the probability of outcomes A and B is equal to the probability of A, times the probability of B.
15/365 x 15/365
= 0.17%
= a chance of 1 in 592
= odds (against) of 1 to 591
This is all well and good, if in fact I am asking "what are the odds against any two of them occurring specifically on … let's say … September 30?"; which is precisely what I have been doing: Suggesting in turn that we should expect such an occurrence to take place once every 592 years.
I have recognized this shortcoming in my attempts to formulate a meaningful set of odds (against) that we should all be willing to perceive, with regard to the relative unlikelihood of a multi-perpetrator 'Double Event'; but I have mistakenly assumed it to be the nature of the beast. It's not! In fact, it is - so I have recently discovered – a simple process to formulate a set of odds against any two of the murders occurring on any given – i.e. unspecified – day:
- The probability that the first murder will occur on any given day, within the coming year: 365/365
- The probability that the second murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 364/365
- The probability that the third murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 363/365
- The probability that the fourth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 362/365
- The probability that the fifth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 361/365
- The probability that the sixth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 360/365
- The probability that the seventh murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 359/365
- The probability that the eighth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 358/365
- The probability that the ninth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 357/365
- The probability that the tenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 356/365
- The probability that the eleventh murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 355/365
- The probability that the twelfth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 354/365
- The probability that the thirteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 353/365
- The probability that the fourteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 352/365
- The probability that the fifteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 351/365
Multiplying each of these probabilities, we get: 74.71%, this being the probability that none of the fifteen murders will occur on the same day.
Subtracting this probability from 1, we get:
- a probability of 25.29%
- a chance of 1 in 4
- odds (against) of 1 to 3
This is tantamount to saying that if fifteen Casebook posters are online at any given moment, then there is a 25.29% probability, i.e. a chance of 1 in 4, that two of them will have the same birthday.
In formulating a set of odds against the occurrence of a multi-perpetrator 'Double Event', we must move beyond the realm of the number of days that exist within a year, and into the realm of the number of hours that exist within the same. We must also incorporate the demographic and/or geographic variables that are deemed to be applicable.
I will make a formal presentation of my calculations when I am able to set aside the necessary amount of time for doing so, but at this juncture I am seeing the following, with regard to the occurrence of a multi-perpetrator 'Double Event':
- a probability as great as 0.33%
- a chance as great as 1 in 301
- odds (against) as little as 1 to 300
These odds are hardly insurmountable, and make the prospect of a multi-perpetrator 'Double Event' substantially more believable.
Bearing that in mind, we should not expect such an occurrence to take place any more frequently than once every 300 years.
~~~
As arrogant as I am sure I must seem, I continually question and second-guess my own conclusions. I reevaluate in perpetuity. That comes with being obsessive compulsive.
As I have already stated above; I was aware of the shortcomings of my earlier efforts in this arena, but believed that nothing more was attainable. I also believed that my conclusions were nonetheless quite meaningful. They really weren't.
Again:
I will make a formal presentation of my calculations when I am able to set aside the necessary amount of time for doing so.
They are much, much, much, … LOWER than I had realized.
In my attempts to formulate a meaningful set of odds against the occurrence of a multi-perpetrator 'Double Event', I have erroneously relied upon the concept of a simple Joint probability: i.e. the probability of outcomes A and B, where A and B are independent of each other.
Case in Point:
If our crystal ball were to tell us that fifteen cut-throat murders of female adults would occur in the coming year, throughout England, what would be the odds against any two of them occurring on the same day?
The concept of Joint probability dictates that the probability of outcomes A and B is equal to the probability of A, times the probability of B.
15/365 x 15/365
= 0.17%
= a chance of 1 in 592
= odds (against) of 1 to 591
This is all well and good, if in fact I am asking "what are the odds against any two of them occurring specifically on … let's say … September 30?"; which is precisely what I have been doing: Suggesting in turn that we should expect such an occurrence to take place once every 592 years.
I have recognized this shortcoming in my attempts to formulate a meaningful set of odds (against) that we should all be willing to perceive, with regard to the relative unlikelihood of a multi-perpetrator 'Double Event'; but I have mistakenly assumed it to be the nature of the beast. It's not! In fact, it is - so I have recently discovered – a simple process to formulate a set of odds against any two of the murders occurring on any given – i.e. unspecified – day:
- The probability that the first murder will occur on any given day, within the coming year: 365/365
- The probability that the second murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 364/365
- The probability that the third murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 363/365
- The probability that the fourth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 362/365
- The probability that the fifth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 361/365
- The probability that the sixth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 360/365
- The probability that the seventh murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 359/365
- The probability that the eighth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 358/365
- The probability that the ninth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 357/365
- The probability that the tenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 356/365
- The probability that the eleventh murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 355/365
- The probability that the twelfth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 354/365
- The probability that the thirteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 353/365
- The probability that the fourteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 352/365
- The probability that the fifteenth murder will occur on any of the remaining (i.e. not yet selected) given days, within the coming year: 351/365
Multiplying each of these probabilities, we get: 74.71%, this being the probability that none of the fifteen murders will occur on the same day.
Subtracting this probability from 1, we get:
- a probability of 25.29%
- a chance of 1 in 4
- odds (against) of 1 to 3
This is tantamount to saying that if fifteen Casebook posters are online at any given moment, then there is a 25.29% probability, i.e. a chance of 1 in 4, that two of them will have the same birthday.
In formulating a set of odds against the occurrence of a multi-perpetrator 'Double Event', we must move beyond the realm of the number of days that exist within a year, and into the realm of the number of hours that exist within the same. We must also incorporate the demographic and/or geographic variables that are deemed to be applicable.
I will make a formal presentation of my calculations when I am able to set aside the necessary amount of time for doing so, but at this juncture I am seeing the following, with regard to the occurrence of a multi-perpetrator 'Double Event':
- a probability as great as 0.33%
- a chance as great as 1 in 301
- odds (against) as little as 1 to 300
These odds are hardly insurmountable, and make the prospect of a multi-perpetrator 'Double Event' substantially more believable.
Bearing that in mind, we should not expect such an occurrence to take place any more frequently than once every 300 years.
~~~
As arrogant as I am sure I must seem, I continually question and second-guess my own conclusions. I reevaluate in perpetuity. That comes with being obsessive compulsive.
As I have already stated above; I was aware of the shortcomings of my earlier efforts in this arena, but believed that nothing more was attainable. I also believed that my conclusions were nonetheless quite meaningful. They really weren't.
Again:
I will make a formal presentation of my calculations when I am able to set aside the necessary amount of time for doing so.
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