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The Fisher Z-Transformation is a statistical method used to transform a set of data with a non-normal distribution into a set of data with a normal distribution. This transformation is particularly useful in analyzing data that follows a non-normal distribution, as it allows for the use of traditional statistical tests and techniques that assume a normal distribution. The transformation is achieved by taking the natural logarithm of the data and then calculating the inverse hyperbolic tangent. This results in a new set of data that follows a normal distribution. An example of using the Fisher Z-Transformation would be in analyzing the correlation between two variables that have a non-normal distribution. By transforming the data using this method, the correlation coefficient can be accurately calculated and interpreted.
Fisher Z-Transformation: Definition & Example
The Fisher Z transformation is a formula we can use to transform Pearson’s correlation coefficient (r) into a value (zr) that can be used to calculate a confidence interval for Pearson’s correlation coefficient.
The formula is as follows:
zr = ln((1+r) / (1-r)) / 2
For example, if the Pearson correlation coefficient between two variables is found to be r = 0.55, then we would calculate zr to be:
- zr = ln((1+r) / (1-r)) / 2
- zr = ln((1+.55) / (1-.55)) / 2
- zr = 0.618
It turns out that the of this transformed variable follows a .
This is important because it allows us to calculate a confidence interval for a Pearson correlation coefficient.
Without performing this Fisher Z transformation, we would be unable to calculate a reliable confidence interval for the Pearson correlation coefficient.
The following example shows how to calculate a confidence interval for a Pearson correlation coefficient in practice.
Example: Calculating a Confidence Interval for Correlation Coefficient
Suppose we want to estimate the correlation coefficient between height and weight of residents in a certain county. We select a random sample of 60 residents and find the following information:
- Sample size n = 60
- Correlation coefficient between height and weight r = 0.56
Here is how to find a 95% confidence interval for the population correlation coefficient:
Step 1: Perform Fisher transformation.
Let zr = ln((1+r) / (1-r)) / 2 = ln((1+.56) / (1-.56)) / 2 = 0.6328
Step 2: Find log upper and lower bounds.
Let L = zr – (z1-α/2 /√n-3) = .6328 – (1.96 /√60-3) = .373
Step 3: Find confidence interval.
Confidence interval = [(e2L-1)/(e2L+1), (e2U-1)/(e2U+1)]
Confidence interval = [(e2(.373)-1)/(e2(.373)+1), (e2(.892)-1)/(e2(.892)+1)] = [.3568, .7126]
Note: You can also find this confidence interval by using the .
This interval gives us a range of values that is likely to contain the true population Pearson correlation coefficient between weight and height with a high level of confidence.
Note the importance of the Fisher Z transformation: It was the first step we had to perform before we could actually calculate the confidence interval.
Additional Resources
Cite this article
stats writer (2024). What is the definition of Fisher Z-Transformation and can you provide an example?. PSYCHOLOGICAL SCALES. Retrieved from https://scales.arabpsychology.com/stats/what-is-the-definition-of-fisher-z-transformation-and-can-you-provide-an-example/
stats writer. "What is the definition of Fisher Z-Transformation and can you provide an example?." PSYCHOLOGICAL SCALES, 1 Jul. 2024, https://scales.arabpsychology.com/stats/what-is-the-definition-of-fisher-z-transformation-and-can-you-provide-an-example/.
stats writer. "What is the definition of Fisher Z-Transformation and can you provide an example?." PSYCHOLOGICAL SCALES, 2024. https://scales.arabpsychology.com/stats/what-is-the-definition-of-fisher-z-transformation-and-can-you-provide-an-example/.
stats writer (2024) 'What is the definition of Fisher Z-Transformation and can you provide an example?', PSYCHOLOGICAL SCALES. Available at: https://scales.arabpsychology.com/stats/what-is-the-definition-of-fisher-z-transformation-and-can-you-provide-an-example/.
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