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Intra-Subject Parallel Design

Using the notation of Chow et al., \(\sigma^2_{WR}\) and \(\sigma^2_{WT}\) are the intra-subject variance for treatments \(R\) and \(T\) respectively. This calculator performs power and sample size calculatios for the two-sided hypothesis: \[ H_0: \frac{\sigma^2_{WT}}{\sigma^2_{WR}} = 1 \text{ versus } H_a: \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \ne 1 \]

or the one-sided hypthesis:

\[ H_0: \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \ge \delta \text{ versus } H_a: \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \lt \delta \]

or the hypothesis of similarity:

\[ H_0: \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \ge \delta \text{ or } \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \le \frac{1}{\delta} \text{ versus } H_a: \frac{1}{\delta} \lt \frac{\sigma^2_{WT}}{\sigma^2_{WR}} \lt \delta \]

where \(\delta\) is the similarity limit using a parallel design with replicates. The model used to test this hypothesis is explained in more depth here.

Power Calculation Parameters

To input multiple values, seperate them by a comma.

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Power Calculation Explanation

Solve For
The unknown you are interested in solving for.
The sample size used to test the hypothesis.
The \(\alpha\) (Type I error rate) level of the hypothesis test.
The power (1 - Type II error rate) of the hypothesis test.
The number of replications in the study (\(m\))
The inter-subject variability for the test treatment, \(T\)
The inter-subject variability for the reference treatment, \(R\)
Similarity Limit \(\delta\)
The similarity limit against which the ratio of variabilities is tested.

Calculation Results

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N Replications Alpha Power \(\sigma_{WT}\) \(\sigma_{WR}\) Similarity Limit
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  • Chow, S., Shao, J., & Wang, H. (2003), Sample size calculations in clinical research, New York: Marcel Dekker.