March 2013 1
Back to Basics, 2013POPULATION HEALTH (1):
Epidemiology Methods, Critical Appraisal,
Biostatistical Methods
N. Birkett, MDEpidemiology & Community Medicine
Other resources available on Individual & Population Health web site
March 2013 2
THE PLAN (1)
• Session 1 (March 18, 1300-1700)– Diagnostic tests
• Sensitivity, specificity, validity, PPV– Critical Appraisal– Intro to Biostatistics– Brief overview of epidemiological research
methods
March 2013 3
THE PLAN (2)
• Aim to spend about 2.5-3 hours on lectures– Review MCQs in remaining time
• A 10 minute break about half-way through• You can interrupt for questions, etc. if
things aren’t clear.– Goal is to help you, not to cover a fixed
curriculum.
4March 2013
INVESTIGATIONS (1)
• 78.2– Determine the reliability and predictive value
of common investigations– Applicable to both screening and diagnostic
tests.
March 2013 5
Reliability
• = reproducibility. Does it produce the same result every time?
• Related to chance error
• Averages out in the long run, but in patient care you hope to do a test only once; therefore, you need a reliable test
March 2013 6
Validity
• Whether it measures what it purports to measure in long run– is a disease present (or absent)
• Normally use criterion validity, comparing test results to a gold standard
• Link to SIM web on validity
March 2013 7
Reliability and Validity: the metaphor of target shooting. Here, reliability is represented by consistency, and validity by aim
Reliability Low High
Low
Validity
High
•
•••
•
•
•• •
••
•
••••••
•• ••••
March 2013 8
Test Properties (1)Diseased Not diseased
Test +ve 90 5 95
Test -ve 10 95 105
100 100 200
True positives False positives
False negatives True negatives
March 2013 9
Test Properties (2)Diseased Not diseased
Test +ve 90 5 95
Test -ve 10 95 105
100 100 200
Sensitivity = 0.90 Specificity = 0.95
March 2013 10
2x2 Table for Testing a Test
Gold standardDisease Disease Present Absent
Test Positive a (TP) b (FP)Test Negative c (FN) d (TN)
SensitivitySpecificity
= a/(a+c) = d/(b+d)
March 2013 11
Test Properties (6)• Sensitivity =Pr(test positive in a person
with disease)• Specificity = Pr(test negative in a person
without disease)• Range: 0 to 1
– > 0.9: Excellent– 0.8-0.9: Not bad– 0.7-0.8: So-so– < 0.7: Poor
March 2013 12
Test Properties (7)
• Sensitivity and Specificity– Values depend on cutoff point between normal/abnormal– Generally, high sensitivity is associated with low specificity and
vice-versa.– Not affected by prevalence, if ‘case-mix’ is constant
• Do you want a test to have high sensitivity or high specificity?– Depends on cost of ‘false positive’ and ‘false negative’ cases– PKU – one false negative is a disaster– Ottawa Ankle Rules: insisted on sensitivity of 1.00
March 2013 13
Test Properties (8)• Sens/Spec not directly useful to clinician, who
knows only the test result• Patients don’t ask:
– “If I’ve got the disease, how likely is a positive test?”
• They ask:– “My test is positive. Does that mean I have the
disease?”• → Predictive values.
March 2013 14
Predictive Values• Based on rows, not columns
– PPV = a/(a+b); interprets positive test– NPV = d/(c+d); interprets negative test
• Depend upon prevalence of disease, so must be determined for each clinical setting
• Immediately useful to clinician: they provide the probability that the patient has the disease
March 2013 15
Test Properties (9)Diseased Not diseased
Test +ve 90 5 95
Test -ve 10 95 105
100 100 200
PPV = 0.95
NPV = 0.90
March 2013 16
2x2 Table for Testing a Test
Gold standardDisease Disease Present Absent
Test + a (TP) b (FP) PPV = a/(a+b)Test - c (FN) d (TN) NPV= d/(c+d)
a+c b+d N
March 2013 17
Prevalence of Disease• Is your best guess about the probability that
the patient has the disease, before you do the test
• Also known as Pretest Probability of Disease
• (a+c)/N in 2x2 table• Is closely related to Pre-test odds of disease:
(a+c)/(b+d)
March 2013 18
Test Properties (10)Diseased Not diseased
Test +ve a b a+b
Test -ve c d c+d
a+c b+d a+b+c+d =N
Prevalence odds
Prevalence proportion
March 2013 19
Prevalence and Predictive Values• Predictive values of a test are dependent on
the pre-test prevalence of the disease– Tertiary hospitals see more pathology then FP’s
• Their positive tests are more often true positives.
• How do you determine how useful a test is in a different patient setting?
March 2013 20
Prevalence and Predictive Values• Often called ‘calibrating’a test for use
– Relies on the stability of sensitivity & specificity across populations.
– Allows us to estimate what the PPV and NPOV would be in a new population.
March 2013 21
Methods for Calibrating a Test
Four methods can be used:– Apply definitive test to a consecutive series of patients
• rarely feasible, especially during the LMCCs– Hypothetical table
• Assume the new population has 10,000 people• Fill in the cells based on the prevalence, sensitivity and specificity
– Bayes’s Theorem (Likelihood Ratio)– Nomogram
• only useful if you have access to the nomogram
• You need to be able to do one of the last 3. • By far the easiest is using a hypothetical table.
March 2013 22
Calibration by hypothetical table
Fill cells in following order:“Truth”
Disease Disease Total PV
Present AbsentTest Pos 4th 7th 8th
10th Test Neg 5th 6th 9th
11th Total 2nd 3rd 10,000 (1st)
March 2013 23
Test Properties (11)
Diseased Not diseased
Test +ve 450 25 475
Test -ve 50 475 525
500 500 1,000
Tertiary care: research study. Prev=0.5
PPV = 0.89
Sens = 0.90 Spec = 0.95
March 2013 24
Test Properties (12)
Diseased Not diseased
Test +ve
Test -ve
10,000
Primary care: Prev=0.01
PPV = 0.1538
9,900
90
10
100
495
9,405
585
9,415
Sens = 0.90 Spec = 0.95
March 2013 25
Calibration by Bayes’ Theorem
• You don’t need to learn Bayes’ theorem• Instead, work with the Likelihood Ratio (+ve)
– Equivalent process exists for Likelihood Ratio (–ve), but we shall not calculate it here
• Consider the following table (from a research study)– How do the ‘odds’ of having the disease change
once you get a positive test result?
March 2013 26
Test Properties (13)Diseased Not
diseasedTest +ve
90 5 95
Test -ve
10 95 105
100 100 200 Pre-test odds = 1.00
Post-test odds (+ve) = 18.0
Odds (after +ve test) are 18-times higher than the odds before you had the test. This is the LIKELIHOOD RATIO.
March 2013 27
Calibration by Bayes’s Theorem
• LR(+) is fixed across populations just like sensitivity & specificity.– Bigger is better.
• Likelihood ratios are related to sens & specLR(+) = sens/(1-spec)
• Sometime given as the definition or the LR(+)– obscures what is really going on
March 2013 28
Calibration by Bayes’s Theorem
• How does this help?• Remember:
– Post-test odds(+) = pretest odds * LR(+)– And, the LR(+) is ‘fixed’ across populations
• To ‘calibrate’ your test for a new population:– Use the LR(+) value from the reference source– Estimate the pre-test odds for your population– Compute the post-test odds– Convert to post-test probability to get PPV
March 2013 29
Converting between odds & probabilities
• if prevalence = 0.20, then • pre-test odds = .20/0.80 = 0.25
• if post-test odds = 0.25, then • PPV = .25/1.25 = 0.20
March 2013 30
Example of Bayes' Theorem(‘new’ prevalence 1%, sens 90%, spec 95%)
• Compare to the ‘hypothetical table’ method (PPV=15.38%)
March 2013 31
Calibration with Nomogram
• Graphical approach which avoids arithmetic• Scaled to work directly with probabilities
– no need to convert to odds• Draw line from pretest probability
(=prevalence) through likelihood ratio– extend to estimate posttest probabilities
• Only useful if someone gives you the nomogram!
32April 2011 32
Example of Nomogram (pretest probability 1%, LR+ 18, LR– 0.105)
Pretest Prob. LR Posttest Prob.
1%
18
.105
15%
0.01%
March 2013
March 2013 33
Are sens & spec really constant?
• Generally, assumed to be constant. BUT…..• Sensitivity and specificity usually vary with case mix
(severity of disease)– May vary with age and sex
• Therefore, you can use sensitivity and specificity only if they were determined on patients similar to your own
• Risk of spectrum bias (populations may come from different points along the spectrum of disease)
Cautionary Tale #1: Data Sources
March 2013 34
The Government is extremely fond of amassinggreat quantities of statistics. These are raised to the nth degree, the cube roots are extracted, and
the results are arranged into elaborate and impressive displays. What must be kept ever in
mind, however, is that in every case, the figures are first put down by a village watchman, and he puts
down anything he damn well pleases!Sir Josiah Stamp,
Her Majesty’s Collector of Internal Revenue.
March 2013 35
78.2: CRITICAL APPRAISAL (1)
• “Evaluate scientific literature in order to critically assess the benefits and risks of current and proposed methods of investigation, treatment and prevention of illness”
• UTMCCQE does not present hierarchy of evidence (e.g., as used by Task Force on Preventive Health Services)
March 2013 36
Hierarchy of evidence(lowest to highest quality, approximately)
• Systematic reviews• Experimental (Randomized)• Quasi-experimental• Prospective Cohort• Historical Cohort• Case-Control• Cross-sectional• Ecological (for individual-level exposures)• Case report/series• Expert opinion
} similar/identical
Cautionary Tale #2: Analysis
March 2013 37
Consider a precise number: the normal body temperature of 98.6°F. Recent investigations involving millions of measurements have shown that this number is wrong: normal body temperature is actually 98.2°F. The fault lies not with the original measurements - they were averaged and sensibly rounded to the nearest degree: 37°C. When this was converted to Fahrenheit, however, the rounding was forgotten and 98.6 was taken as accurate to the nearest tenth of a degree.
March 2013 38
BIOSTATISTICS Core concepts (1)
• Sample: – A group of people, animals, etc. which is used to represent a
larger ‘target’ population.• Best is a random sample• Most common is a convenience sample.
– Subject to strong risk of bias.
• Sample size: – the number of units in the sample
• Much of statistics concerns how samples relate to the population or to each other.
March 2013 39
BIOSTATISTICS Core concepts (2)
• Mean: – average value. Measures the ‘centre’ of the data. Will be roughly
in the middle.
• Median: – The middle value: 50% above and 50% below. Used when data is
skewed.
• Variance: – A measure of how spread out the data are.– Defined by subtracting the mean from each observation, squaring,
adding them all up and dividing by the number of observations.
40March 2013
March 2013 41
BIOSTATISTICS Core concepts (2)
• Standard deviation: – square root of the variance.
March 2013 42
BIOSTATISTICS Core concepts (3)• Standard error (of the mean):
– Standard deviation looks at the variation of the data in individuals– We usually study samples.
• Select 10 people• measure BMI• take the group average
– Repeat many times.• Each time, we get a mean of the sample
– What is the distribution of these means?– Will be ‘normal’, ‘Gaussian’ or ‘Bell curve’– Mean of the means
• same as population mean
– Variance of the means is• smaller.
March 2013 43
BIOSTATISTICS Core concepts (4)• Standard error (of the mean):
• Confidence Interval:
– A range of numbers which tells us where we believe the correct answer lies. • For a 95% confidence interval, we are 95% sure that
the true value lies inside the interval.– Usually computed as: mean ± 2 SE
March 2013 44
Example of Confidence Interval
• If sample mean is 80, standard deviation is 20, and sample size is 25 then:
• We can be 95% confident that the true mean lies within the range:
80 ± (2*4) = (72, 88).
March 2013 45
Example of Confidence Interval
• If the sample size were 100, then
– 95% confidence interval is 80 ± (2*2) = (76, 84).
– More precise.
March 2013 46
Core concepts (4)
• Random Variation (chance): – every time we measure anything, errors will
occur. – Any sample will include people with values
different from the mean, just by chance.– These are random factors which affect the
precision (SD) of our data but not the validity.– Statistics and bigger sample sizes can help here.
March 2013 47
Core concepts (5)
• Bias: – A systematic factor which causes two groups to
differ. • A study uses a two section measuring scale for
height which was incorrectly assembled (with a 1” gap between the upper and lower section).
• Over-estimates height by 1” (a bias).– Bigger numbers and statistics don’t help much;
you need good design instead.
March 2013 48
BIOSTATISTICSInferential Statistics
• Draws inferences about populations, based on samples from those populations. – Inferences are valid only if samples are representative
(to avoid bias).• Polls, surveys, etc. use inferential statistics to infer
what the population thinks based on talking to a few people.
• RCTs use them to infer treatment effects, etc.• 95% confidence intervals are a very common way
to present these results.
49
An experiment (1)
• Here is a ‘fair’ coin• I will toss it to generate some data (heads or
tails)– Write the sequence on the board
March 2013
50
An experiment (2)
• At some point, you get suspicious– the number of ‘heads’ in a row exceeds what is
reasonable.• This is the core of hypothesis testing
March 2013
51
An experiment (3)• Start with a theory
– Null Hypothesis• My coin is ‘fair’
• Generate some data• Check to see if the data is consistent with the theory.
– if the data is ‘unlikely’, then reject the theory or null hypothesis.
• Statistics just puts a mathematical overlay on top of this intuitive approach
March 2013
March 2013 52
Hypothesis Testing (1)• Used to compare two or more groups.
– We first assume that the two groups have the same outcome results.• null hypothesis (H0)
– Generate some data– From the data, compute some number (a statistic)
• Under this null hypothesis (H0), this should be ‘0’.
– Compare the value I get to ‘0’.• If it is ‘too large’, we can conclude that our assumption (null
hypothesis) is unlikely to be true (reject the null hypothesis).
March 2013 53
Hypothesis Testing (2)• Quantity the extent of our discomfort with
the statistic through the p-value.– If the null hypothesis were true, how likely it
that our statistic would be as big as we saw (or bigger).
• Reject H0 if the p-value is ‘too small’• What is ‘too small’?
– arbitrary.– tradition sets it at < 0.05
March 2013 54
Example of significance test• Is there an association between sex and smoking:
– 35 of 100 men smoke but only 20 of 100 women smoke
• Calculate the chi-square (the statistic)– = 5.64.– If there is no effect of sex on smoking (the null hypothesis), a chi-
square value as large as 5.64 would occur only 1.8% of the time.• P=0.018
– Instead of computing the p-value, could compare your statistic to the ‘critical value’• The value of the Chi-square which gives p=0.05 is 3.84• Since 5.64 > 3.84, we conclude that p<0.05
March 2013 55
Hypothesis Testing (3)• Common methods used are:
– T-test– Z-test– Chi-square test– ANOVA
• Approach can be extended through the use of regression models– Linear regression
• Toronto notes are wrong in saying this relates 2 variables. It can relate many independent variables to one dependent variable.
– Logistic regression– Cox models
March 2013 56
Hypothesis Testing (4)• Once you select a method for hypothesis testing,
interpretation involves:– Type 1 error (alpha)– Type 2 error (beta)– P-value
• Essentially the alpha value
– Power• Related to type 2 error (Beta)
March 2013 57
Hypothesis testing (5)
No effect Effect
No effect No error Type 2 error (β)
Effect Type 1 error (α)
No error
Actual Situation
Results of Stats Analysis
March 2013 58
Hypothesis Testing (7)• Statistical Power:
– ‘Easy’ to show that a drug increases survival by 10 times– ‘Hard’ to show that a drug increase survival by 1.2 times– More likely to ‘miss’ the small effect than the large effect– Statistical Power is:
• The chance you will find a difference between groups when there really is a difference (of a given amount).
• Basically, this is 1-β– Power depends on how big a difference you consider to be
important
March 2013 59
How to improve your power?
• Increase sample size• Improve precision of the measurement tools
used (reduces standard deviation)• Use better statistical methods• Use better designs• Reduce bias
Cautionary Tale #3: Anecdotes
March 2013 60
Laboratory and anecdotal clinical evidence suggest that some common non-antineoplastic drugs may affect the course of cancer. The authors present two cases that appear to be consistent with such a possibility: that of a 63-year-old woman in whom a high-grade angiosarcoma of the forehead improved after discontinuation of lithium therapy and then progressed rapidly when treatment with carbamezepine was started, and that of a 74-year-old woman with metastatic adenocarcinoma of the colon which regressed when self-treatment with a non-prescription decongestant preparation containing antihistamine was discontinued. The authors suggest ...... ‘that consideration be given to discontinuing all nonessential medications for patients with cancer.’
March 2013 61
Epidemiology overview• Key study designs to examine (SIM web link)
– Case-control– Cohort– Randomized Controlled Trial (RCT)
• Confounding• Relative Risks/odds ratios
– All ratio measures have the same interpretation• 1.0 = no effect• < 1.0 protective effect• > 1.0 increased risk
– Values over 2.0 are of strong interest
March 2013 62
The Epidemiological Triad
Host Agent
Environment
March 2013 63
Terminology
• Prevalence: – The probability that a person has the outcome of
interest today. Relates to existing cases of disease. Useful for measuring burden of illness.
• Incidence: – The probability (chance) that someone without
the outcome will develop it over a fixed period of time. Relates to new cases of disease. Useful for studying causes of illness.
March 2013 64
Prevalence
• On July 1, 2007, 140 graduates from the U. of O. medical school start working as interns.
• Of this group, 100 had insomnia the night before.
• Therefore, the prevalence of insomnia is:
100/140 = 0.72 = 72%
March 2013 65
Incidence Proportion (risk)• On July 1, 2007, 140 graduates from the U.
of O. medical school start working as interns.
• Over the next year, 30 develop a stomach ulcer.
• Therefore, the incidence proportion (risk) of an ulcer in the first year post-graduation is:
30/140 = 0.21 = 214/1,000 over 1 yr
March 2013 66
Incidence Rate (1)• Incidence rate is the ‘speed’ with which people get
ill.• Everyone dies (eventually). It is better to die later
death rate is lower.• Compute with person-time denominator:
PT = # people * duration of follow-up
March 2013 67
Incidence rate (2)• 140 U. of O. medical students were
followed during their residency– 50 did 2 years of residency– 90 did 4 years of residency– Person-time = 50 * 2 + 90 * 4 = 460 PY’s
• During follow-up, 30 developed ‘stress’.• Incidence rate of stress is:
March 2013 68
Prevalence & incidence
• As long as conditions are ‘stable’ and disease is fairly rare, we have this relationship:
That is, Prevalence ≈ Incidence rate * average disease duration
March 2013 69
Cohort study (1)• Select non-diseased subjects based on their exposure status
• Main method used:• Select a group of people with the exposure of interest• Select a group of people without the exposure
• Can also simply select a group of people without the disease and study a range of exposures.
• Follow the group to determine what happens to them.• Compare the incidence of the disease in exposed and unexposed people
• If exposure increases risk, there should be more cases in exposed subjects than unexposed subjects
• Compute a relative risk.
• Framingham Study is standard example.
March 2013 70
Exposed group
Unexposedgroup
No disease
Disease
No disease
Disease
time
Study begins Outcomes
March 2013 71
Cohort study (2)
YES NO
YES a b a+b
NO c d c+d
a+c b+d N
Disease
Exp
RISK RATIO
Risk in exposed: = Risk in Non-exposed =
If exposure increases risk, you would expect to be larger than . How much larger can be assessed by the ratio of one to the other:
March 2013 72
Cohort study (3)
YES NO
Yes 42 80 122
No 43 302 345
85 382 467
Death
Exposure
Risk in exposed: = 42/122 = 0.344Risk in Non-exposed = 43/345 = 0.125
March 2013 73
Cohort study (4)
• Historical cohort study• Recruit subjects sometime in the past• Follow-up to the present
• Usually use administrative records
• Can continue to follow into the future
• Example: cancer in Gulf War Vets• Identify soldiers deployed to Gulf in 1991• Identify soldiers not deployed to Gulf in 1991• Compare development of cancer from 1991 to 2010
March 2013 74
Case-control study (1)• Select subject based on their final outcome.
– Select a group of people with the outcome/disease (cases)
– Select a group of people without the outcome (controls)
– Ask them about past exposures– Compare the frequency of exposure in the two groups
• If exposure increases risk, there should be more exposed cases than exposed controls
– Compute an Odds Ratio– Under many conditions, OR ≈ RR
March 2013 75
Disease(cases)
No disease(controls)
Exposed
Unexposed
Exposed
Unexposed
The study begins by selecting
subjects based on
Reviewrecords
Reviewrecords
March 2013 76
Case-control study (2)
YES NO
YES a b a+b
NO c d c+d
a+c b+d N
Disease?
Exp?
ODDs RATIO
Odds of exposure in cases =
Odds of exposure in controls =
If exposure increases risk, you would to find more exposed cases than exposed controls. That is, the odds of exposure for cases would be higher This can be assessed by the ratio of one to the other:
March 2013 77
Yes No
Yes 42 18
No 43 67
85 85
Exposure
Odds of exp in cases: = 42/43 = 0.977Odds of exp in controls: = 18/67 = 0.269
Case-control study (3)Death
March 2013 78
Randomized Controlled Trials• Basically a cohort study where the researcher
decides which exposure (treatment) the subject get.– Recruit a group of people meeting pre-specified
eligibility criteria.– Randomly assign some subjects (usually 50% of them)
to get the control treatment and the rest to get the experimental treatment.
– Follow-up the subjects to determine the risk of the outcome in both groups.
– Compute a relative risk or otherwise compare the groups.
March 2013 79
Randomized Controlled Trials (2)
• Some key design features– Allocation concealment– Blinding (masking)
• Patient• Treatment team• Outcome assessor• Statistician
– Monitoring committee
• Two key problems– Contamination
• Control group gets the new treatment
– Co-intervention• Some people get treatments other than those under study
• Number needed to treat, NNT (to prevent one adverse event) =
March 2013 80
Randomized Controlled Trials: Analysis
• Outcome is often an adverse event– RR is expected to be <1
• Absolute risk reduction
• Relative risk reduction
March 2013 81
RCT – Example of Analysis
Asthma No Total Incid attack attack
Treatment 15 35 50 .30Control 25 25 50 .50
Relative Risk = 0.30/0.50 = 0.60Absolute Risk Reduction = 0.50-0.30 = 0.20 Relative Risk Reduction = 0.20/0.50 = 40%Number Needed to Treat = 1/0.20 = 5
March 2013 82
Confounding• Interest is in the effect of an exposure on an outcome
– Does alcohol drinking cause oral cancer?
• BUT, the effect of alcohol is ‘mixed up’ with the effect of smoking.• The effect of this third factor ‘confounds’ the relationship we are
interested in.– Produces a biased results.– Can make result more or less strong
• Confounder is an extraneous factor which is associated with both exposure and outcome, and is not an intermediate step in causal pathway
• Proper statistical analysis must adjust for the confounder.
March 2013 83
The Confounding Triangle
Exposure Outcome
Confounder
Causal
Association
March 2013 84
Confounding (example)• Does heavy alcohol drinking cause mouth cancer?
– Do a case-control study– OR=3.4 (95% CI: 2.1-4.8).
• BUT– Smoking causes mouth cancer– Heavy drinkers tend to be heavy smokers.– Smoking is not part of causal pathway for alcohol.
• Therefore, we have confounding.• We do a statistical adjustment (logistic regression is most common):
– OR=1.3 (95% CI: 0.92-1.83)
March 2013 85
Standardization• An method of adjusting for confounding (usually used for
differences in age between two populations)• Refers observed events to a standard population, producing
hypothetical values• Direct:
– yields age-standardized rate (ASMR)
• Indirect:– yields standardized mortality ratio (SMR)
• You don’t need to know how to do this• Nearly always used when presenting population rates and trends.
March 2013 86
Mortality dataThree ways to summarize them
• Mortality rates– crude
• Overall all-cause mortality rate– specific
• mortality rate for a specific group (men), disease (lung cancer), etc.– standardized
• Mortality rate adjustment to take account of the aging population
March 2013 87
Mortality dataThree ways to summarize them
• Life expectancy: – average age at death if current mortality rates
continue. Derived from a life table.• Potential Years of Life Lost (PYLL):
– subtract age at death from some “acceptable” age of death.
– Sum up over a group• estimates ‘potential’ lost due to early death• Places more emphasis on causes that kill at younger ages.
March 2013 88
0 100 200 300 400 500
HIV/AIDS
Respiratory disese
Suicide and violence
Unintentional injury
Circulatory disease
Cancer
Mortality rate (per 100,000) PYLL (000)
Impact of different causes of death in Canada 2001: Mortality rates and PYLL
Source: Statistics Canada
March 2013 89
Summary measuresof population health
• Mortality is a ‘crude’ measure of population health• Need to consider
– morbidity– quality of life– disability– and so on.
• Many other measures have been developed• Quality Adjusted Life Years (QALYs)
– Years lived are weighted according to quality of life, disability, etc.
• Two ‘classes’ of these types of measures:– Health expectancies point up from zero– Health gaps point down from ideal
March 2013 90
Attributable Risks (1) (SIM web link)
• Would like to know the amount of a disease which might be prevented if we eliminate a risk– Gives an upper limit on amount of preventable disease.– Meaningful only if association is causal.
• Tricky area since there are several measures with similar names.– Attributable risk– Attributable fraction– Population Attributable Risk– and so on
March 2013 91
Attributable Risks (1) (SIM web link)
• Two main targets for these measures• The amount of disease due to exposure in
the exposed subjects. The same as the risk difference.
• The proportion of risk attributed to the exposure in the general population – depends on
• Risk due to exposure• How common the exposure is.
March 2013 92
Attributable risks (2)
ExpUnexp
Risk Difference or Attributable Risk
Iexp
Iunexp
RD = AR = Iexp - Iunexp
March 2013 93
Attributable risks (2)
ExpUnexp
PopulationAttributable Risk
Iexp
Iunexp
Ipop
Population
94March 2013