Difference between revisions of "Category:Odds"

From
Jump to: navigation, search
m
m
Line 1: Line 1:
 +
=Absolute Number=
 
Odds (no synonyms), are expressed as an absolute number.
 
Odds (no synonyms), are expressed as an absolute number.
  
The odds of an event ("odds", always plural) occurring is the probability (e.g. risk) that this event will occur divided by the probability that the event will not occur. It can also be expressed as the probability that an event will occur divided by "1 minus the probability that the event will occur"<ref>Porta, M. A dictonary of Epidemiology, Fifth edition. Oxford University press, 2008.</ref>.
+
The odds of an event ("odds", always plural) occurring is the probability (e.g. risk) that this event will occur divided by the probability that the event will not occur. It can also be expressed as the probability that an event will occur divided by "1 minus the probability that the event will occur"<ref>Porta, M. A Dictionary of Epidemiology, Fifth edition. Oxford University press, 2008.</ref>.
  
 
                     P
 
                     P
Line 7: Line 8:
 
                   1 - P
 
                   1 - P
  
This probability measure is popular in the world of gambling. If we compute the number of people putting money on one horse winning and the number of people putting money on the horse not winning (i.e. putting money on other horses) we can compute the odds of winning. For example among 3100 persons gambling on horses, 100 persons put money on horse "A" to win and 3000 do not (they bet on other horses). The odds of winning are then 1/30 (100/3100 divided by 3000/3100 which can be simplified as 100/3000 or 1 / 30). In fact in gambling the odds of not winning are preferred and expressed as a ratio X/1. In our example, 30/1, or in words "thirty to one". This means that for every Euro that you bet, you will receive 30 if you win.
+
This probability measure is popular in the world of gambling. If we compute the number of people putting money on one horse winning and the number of people putting money on the horse not winning (i.e., putting money on other horses), we can compute the odds of winning. For example, among 3100 persons gambling on horses, 100 persons put money on horse "A" to win, and 3000 do not (they bet on other horses). The odds of winning are then 1/30 (100/3100 divided by 3000/3100 which can be simplified as 100/3000 or 1 / 30). In fact, in gambling, the odds of not winning are preferred and expressed as a ratio X/1. In our example, 30/1, or in words, "thirty to one". This means that for every Euro that you bet, you will receive 30 if you win.
  
Since in epidemiology, we illustrate the population under investigation with a two-by-two table, we will use a table to describe how to calculate odds. In the two-by-two table the concept of exposure is also included. However, to calculate the odds of disease, it not needed to take into account that in our population, some might have been exposed to a particular exposure and some not.
+
Since we illustrate the population under investigation in epidemiology with a two-by-two table, we will use a table to describe how to calculate odds. In the two-by-two table, the concept of exposure is also included. However, to calculate the odds of disease, it is not necessary to consider that in our population, some might have been exposed to a particular exposure and some not.
  
 
===Example 1===
 
===Example 1===
Line 71: Line 72:
 
Odds of disease            (50 / 100000) / 1 - (50/100000)            =  0.00050025
 
Odds of disease            (50 / 100000) / 1 - (50/100000)            =  0.00050025
  
When getting the disease is a rare event, the risk of disease approximates the odds of disease.
+
When getting the disease is rare, the risk of disease approximates the odds of disease.
  
 
===Example 3===
 
===Example 3===

Revision as of 12:20, 19 December 2022

Absolute Number

Odds (no synonyms), are expressed as an absolute number.

The odds of an event ("odds", always plural) occurring is the probability (e.g. risk) that this event will occur divided by the probability that the event will not occur. It can also be expressed as the probability that an event will occur divided by "1 minus the probability that the event will occur"[1].

                   P
Odds of event = -----------
                 1 - P

This probability measure is popular in the world of gambling. If we compute the number of people putting money on one horse winning and the number of people putting money on the horse not winning (i.e., putting money on other horses), we can compute the odds of winning. For example, among 3100 persons gambling on horses, 100 persons put money on horse "A" to win, and 3000 do not (they bet on other horses). The odds of winning are then 1/30 (100/3100 divided by 3000/3100 which can be simplified as 100/3000 or 1 / 30). In fact, in gambling, the odds of not winning are preferred and expressed as a ratio X/1. In our example, 30/1, or in words, "thirty to one". This means that for every Euro that you bet, you will receive 30 if you win.

Since we illustrate the population under investigation in epidemiology with a two-by-two table, we will use a table to describe how to calculate odds. In the two-by-two table, the concept of exposure is also included. However, to calculate the odds of disease, it is not necessary to consider that in our population, some might have been exposed to a particular exposure and some not.

Example 1

Developing the disease Not developing the disease Total
Exposed a b a+b
Not exposed c d c+d
Total 30 70 100

The table yields the following calculations:

0028.risk of dis.png-550x0.png
2086.odds of dis.png-550x0.png





Therefore to calculate the odds: divide the risk of getting the disease by the risk of not getting the disease. It is equal to the ratio of the number of people with the disease to the number of people without it in a particular population.

The odds is a measure rarely used in epidemiology. Most often the odds are used to express the odds ratio. A disease-odds ratio is the ratio of the odds of having the disease among the exposed and the odds of having the disease among the unexposed [1]. In other words, the odds ratio is the ratio of the odds of disease observed in 2 subsets of a population.

In you take again the table as an example, the disease-odds ratio will be equal to:

Odds of developing the disease among the exposed: a / b

Odds of developing the disease among the unexposed: c / d

Disease-odds ratio:

2330.or simple.png-550x0.png




As you see by comparing example one, two and three, the risk and the odds approximate each other when the event is rare. When the event occurs frequently the odds overestimate the risk of disease.

For this reason, in many situations (when the disease is rare) the odds ratio can estimate the risk ratio.

Example 2

Developing the disease Not developing the disease Total
Exposed a b a+b
Not exposed c d c+d
Total 50 99 950 100 000

Risk of disease = 50 / 100000 = 0.00050000

Odds of disease (50 / 100000) / 1 - (50/100000) = 0.00050025

When getting the disease is rare, the risk of disease approximates the odds of disease.

Example 3

Developing the disease Not developing the disease Total
Exposed a b a+b
Not exposed c d c+d
Total 59 950 1000

Risk of disease = 50 / 1000 = 0.05000

Odds of disease (50 / 1000) / 1 - (50/1000) = 0.05263

References

  1. Porta, M. A Dictionary of Epidemiology, Fifth edition. Oxford University press, 2008.

Credits

Pages in category "Odds"

This category contains only the following page.