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Sample size calculation
Dr Sa’ed H. Zyoud
Testing hypothesis (Outcomes)Decision ErrorsTwo types of errors can result from a hypothesis test.
• Type I error. occurs when the researcher rejects a null hypothesis when it is true. The probability of committing a Type I error is called the significance level. This probability is also called alpha (α).
• Type II error. A Type II error occurs when the researcher fails to reject a null hypothesis that is false. The probability of not committing a Type II error is called the Power of the test. The probability of committing a Type II error is called Beta (β).
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Factors that affect the sample size
1. Power of the study
- The power of a study is the probability of detecting a real difference. In other words, it is same as the probability of making a positive diagnosis when the disease is present.
- For a good study one should have to take at least 80% power.
- An increase in the sample size or a greater difference between the control and the test groups leads to an increase in the power of the test.
2. Level of significance
- Level of significance is the probability of rejecting null hypothesis when it is true.
- This is the most important factor in determination of sample size.
- Therefore, the level of significance must be fixed before the testing of hypothesis, estimation and sample size calculation. In a standard situation, the probability can be taken as 0.05 or 0.01.
Estimating a proportion
1. Raosoft sample size calculator
• An automated software program, (Raosoft sample size calculator: (http://www.raosoft.com/samplesize.html)
is used to calculate the required sample size for this study.
Raosoft sample size calculator
• The estimated sample size is …….. patients out of the ………. eligible patients registered in the public health care clinics.
Raosoft sample size calculator
• In order to minimize erroneous results and increase the study reliability, the target sample size will be increased 5% to 10%.
2. Danial sample size formula
• The sample size formula (Daniel, 1999) is used, which is
• If your population more than 10.000
Where
• Z: statistic for a level of confidence. (For the level of confidence of 95%, which is conventional, Z value is 1.96).
• P: expected prevalence or proportion. (P is considered 0.5)
• d: precision. (d is considered 0.05 to produce good precision and smaller error of estimate)
• A hospital administrator wishes to know what proportion of discharged patients is unhappy with the care received during hospitalization. If 95% Confidence interval is desired to estimate the proportion within 5%, how large a sample should be drawn?
• n = Z2 p(1-p)/d2 =(1.96)2(.5×.5)/(.05)2 =384.2 ≈385 patients
Adjusted sample for population less than 10.000
• n / (1+ (n/population)) = adjusted sample• Where
n= calculated sample size from Danial formula
3. Pocock’s sample size formula
• Pocock’s sample size formula which is a common formula for comparing two proportions can be used.
• This equation provides a continuity corrected value intended to be used with Chi-square or Fischer’s exact tests (Pocock, 1983) .
Pocock’s sample size formula
• n = [P1 (1-P1) + P2 (1-P2)] ( Zα/2 + Z β) 2• (P1-P2)2
• Where:
• n: required sample size
• P1: estimated proportion of study outcome in the exposed group
• P2: estimated proportion of study outcome in the unexposed group
• α: level of statistical significance
• Zα/2: Represents the desired level of statistical significance (typically 1.96 for α = 0.05)
• Z β: Represents the desired power (typically 0.84 for 80% power)
• n for each group *2= total sample (i.e. for the 2 groups)
Typical values for significance level and power
4. Altman’s nomogram (Altman 1980)n = total sample (i.e. for the 2 groups)
• P = (P1 +P2)• 2• Where: • P: mean of the two proportions• P1: estimated proportion of study outcome in the
exposed group • P2: estimated proportion of study outcome in the
unexposed group • Standardised difference = (P1 – P2) • √ [P (1- P)]
Pocock’s sample size formula• This equation assumes that the comparison is to
be made across two equally sized groups.
• However, comparisons in observational studies are mainly made across two unequally sized groups.
• In this case, the sample size should be adjusted according to the actual ratio of the two groups in order to reflect the inequality (Whitley and Ball, 2002).
• The adjusted sample size (nadjusted) depends on the following formula (Whitley and Ball 2002):
• • nadjusted = n × (k +1)2
4 k
where: • n: sample size = total sample (i.e. for the 2 groups)• k: actual ratio of the two groups
Estimating a mean
• n = Z2 σ2 / d2
Where “
• Z: statistic for a level of confidence. (For the level of confidence of 95%, which is conventional, Z value is 1.96).
• σ: estimated standard deviation from previous studies• d: precision. (d is considered 0.05 to produce good
precision and smaller error of estimate)