流行病学通常被称为公共卫生的“基石”，它是一门研究疾病的分布和决定因素，健康状况，或人群间的活动和应用于控制健康问题的学科。由于流行病学与现实生活息息相关，并更好地评估公共卫生项目和政策，学生将理解流行病学的研究方法，通过这一门课所学到的理论知识应用到当今的公共健康问题。本课程通过流行病学的视框，探讨了心血管疾病和传染病等公共卫生问题，对地区情况和全球情况都进行了讨论。 翻译: Yi Zhou

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來自 The University of North Carolina at Chapel Hill 的課程

流行病学：基础公共卫生科学

1146 個評分

流行病学通常被称为公共卫生的“基石”，它是一门研究疾病的分布和决定因素，健康状况，或人群间的活动和应用于控制健康问题的学科。由于流行病学与现实生活息息相关，并更好地评估公共卫生项目和政策，学生将理解流行病学的研究方法，通过这一门课所学到的理论知识应用到当今的公共健康问题。本课程通过流行病学的视框，探讨了心血管疾病和传染病等公共卫生问题，对地区情况和全球情况都进行了讨论。 翻译: Yi Zhou

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Measures of Association

This module introduces measures of association and confidence intervals.

- Dr. Karin YeattsClinical Associate Professor

Department of Epidemiology, UNC Gillings School of Global Public Health - Dr. Lorraine AlexanderClinical Associate Professor, Director of Distance Learning (North Carolina Institute for Public Health)

Department of Epidemiology, UNC Gillings School of Global Public Health

[MUSIC]

Welcome, in this segment we will discuss the odds ratio.

In this segment, you will learn how

to define, calculate and interpret the odds ratio.

In a case-control study, we calculate the exposure odds ratio.

The odds ratio approximates the incident rate

ratio or risk ratio under certain conditions.

Remember that odds is p divided by 1 minus p.

The probability of an event occurring divided

by the probability of it not occurring.

When Odds Ratio is equal to 1 then there is

no association between the exposure and the outcome of interest.

When the Odds Ratio is greater than 1.

There is a positive association.

And when the odds ratio is less than one, there is a negative association.

Be careful of how you set up your 2.2 table here.

Cross, the cross product formula only works if the table is set up correctly.

For this epidemiology MOOC, we will use the convention

of disease on the top, and exposure on the side.

However, outside this course, you may see these switched.

As I said before, in a case control study, the odds ratio is the exposure odds ratio,

which is the odds of being exposed in the cases equals a divided by c.

Divided by the odds of being exposed in the controls or b divided by d.

Mathematically, this is the same as the cross product, which

is equal to a times d divided by b times c.

The odds ratio is the ratio of the odds

of the health outcome or disease in the exposed

Relative to the odds of the disease or health

outcome in the none exposed or less exposed group.

Odds ratios can be calculated in cohorts studies and in case control studies.

Prevalence odds ratios can be calculated for cross sectional studies.

There are different ways that you can interpret

a measure of association and words as illustrated here.

You could say ,those in a traffic ac,

accident were 1.62 times as likely to have been

texting while driving compared with those who were

not in a traffic accident in the past year.

Or those in a traffic accident were 62%

more likely to have been texting while driving.

Then those who were not in a traffic accident in the past year.

But the most precise interpretation is as follows the odds of a traffic accident

among those who texted while driving was 1.62 times the odds of a traffic accident.

Among people who did not text while driving.

Be careful, you cannot calculate a risk or rate directly from case control data.

The denominators obtained in a case control study do not represent

the total number of exposed and

non-exposed person in the source population.

The investigators arbitrarily decide how many controls

will be selected to compare with the cases.

We cannot directly measure risks or rates because the population at risk in the

denominator is not ascertained. Under certain conditions, we can

obtain a valid estimate of the rate ratio risk ratio using the odds ratio.

But we won't go into those conditions for this MOOC.

So let's review.

We can't estimate a risk or rate directly from a case control study

Because we or the researchers, decide on the number disease people, the cases.

And the non-disease people are controls. When we design our study.

So the ratio of controls to

cases is not biologically or substantively meaningful.

Instead We estimate the risk ratio or the rate

ratio in a case control study using the odds ratio.

Lets look at an example of calculating and interpreting

the odds ratio, using childhood vaccines and human papillomavirus.

Researchers conducted a case control study to examine whether childhood

vaccines Protected children against HPV in real world conditions i.e.

Rural areas with little access to regular health care.

Note this is a hypothetical example.

A total of 25 cases and 19 controls were identified.

Data obtained from the cases and controls found that

15 cases and 12 controls had received the vaccine.

Another way to interpret the effect of

the vaccine is to compare the odds of those

who did not get the vaccine to those who did.

To do so, you take the reciprocal of the odds ratio i.e.

1 over 0.875, which gives you 1.14. So

children who did not receive childhood vaccines were 1.14 times as likely to

have HPV compared to children who did receive childhood vaccines.

Okay, let's try another example.

You are investigating an outbreak of paralytic

shellfish poisoning among patrons of an Alaskan restaurant.

You conduct a case control study to identify food associated with the illness.

A total of 240 cases and 134 controls were identified.

Data obtained from the cases and controls found

that 218 cases and 45 controls consumed scallops.

Now I'd like you to create a two by two table and calculate the odds

ratio for this example and interpret your results, and then check back in a minute.

This is what your table would look like.

218 cases of paralytic shellfish poisoning and 45 controls who consumed scallops.

And then we see there were 22 cases in 89 controls who did not consume scallops.

So to calculate

the odds ration, you take the cross product, which

is 218 times 89, divided by 45 times 22. And

you get 19.6. To interpret this.

You can use the following interpretation.

There are other permutations, but here's a short one.

Cases were 19.6 times

as likely, compared to controls to have eaten the scallops.