The Z-Score Measure of the Body Mass Index

Do you need this or any other assignment done for you from scratch?
We have qualified writers to help you.
We assure you a quality paper that is 100% free from plagiarism and AI.
You can choose either format of your choice ( Apa, Mla, Havard, Chicago, or any other)

NB: We do not resell your papers. Upon ordering, we do an original paper exclusively for you.

NB: All your data is kept safe from the public.

Click Here To Order Now!

The Z-Score is a statistical measure of how far a particular data point is from the mean. It allows you to compare scores from different distributions (e.g. different test subjects, different years, etc.) by considering the distribution’s standard deviation.

To calculate a Z-Score, use this formula:

Z = (x – μ) / σ (Ekwattanakit et al., 2017)

Where: x is the score you want to calculate the Z-Score for μ is the mean or average of the distribution σ is the standard deviation.

From the data provided, the determination of the Z-Score for the BMI involves the calculation of the standard deviation and the average BMI for the sample (Till et al., 2018).

Table 1: Descriptive Statistics

BMI
Mean 25.83398189
Standard Error 0.041190846
Median 25.45
Mode 23.48
Standard Deviation 4.037123166
Sample Variance 16.29836346
Kurtosis 2.910720406
Skewness 0.986061651
Range 42.37
Minimum 14.43
Maximum 56.8
Sum 248161.23
Count 9606
Confidence Level (95.0%) 0.080742749

Standard deviation is 4.0371

Mean is 25.83

Z = (25.83) / 4.0371

Z = 6.3984

The Z-Score is a measure of how unusual the data are. A Z-Score of zero means that the data are exactly what you would expect to find if the null hypothesis were true. In the above case, there is a positive Z-score of 6.3984, meaning that the data are more unusual than you would expect if the null hypothesis were true, and a negative Z-score means that the data are less unusual than you would expect if the null hypothesis were true (Fatimah & Sunaryo, 2022). The Z-Score is based on the standard deviation of the data. The standard deviation is a measure of how much variation there is in the data. The larger the standard deviation, the more variation there is in the data.

References

Ekwattanakit, S., Nakavachara, P., & Viprakasit, V. (2017). Microsoft® Office Excel-based worksheet program for rapid calculation of weight-for-age (WA) and height-for-age (HA) z-scores in Thai pediatric population (THAI-Z). Southeast Asian J Trop Med Public Health, 48, 183-191. Web.

Fatimah, F., & Sunaryo, D. (2022). Analysis of The Effect Of The Altman Z-Score Method On Financial Distress. International Journal of Educational Research & Social Sciences, 3(1), 46-61.

Till, K., Morris, R., Emmonds, S., Jones, B., & Cobley, S. (2018). Strength & Conditioning Journal, 40(5), 24-33. Web.

Do you need this or any other assignment done for you from scratch?
We have qualified writers to help you.
We assure you a quality paper that is 100% free from plagiarism and AI.
You can choose either format of your choice ( Apa, Mla, Havard, Chicago, or any other)

NB: We do not resell your papers. Upon ordering, we do an original paper exclusively for you.

NB: All your data is kept safe from the public.

Click Here To Order Now!