[Tagalog] z-Test - Computation and Interpretation

Learn With Mayora

12 Feb 202109:17

Summary

TLDRIn this video, the presenter explains the Z-test, a statistical method to determine the significant difference between a sample mean and a hypothesized mean. They go over the formula and demonstrate its application using a practical example involving calorie consumption among women over 55. The example calculates the Z-value and uses an online P-value calculator to decide whether to accept or reject the null hypothesis. The video concludes by emphasizing how to interpret results when the P-value is less than the significance level, indicating a significant difference.

Takeaways

📊 The video explains the basics of conducting an Ivan statistical test, starting with the z-test.
🔢 The z-test helps determine if there is a significant difference between a sample mean and a hypothesized mean.
✅ The z-test is applicable for parametric data, where mean, variance, and standard deviation are given.
📈 The formula for z-test is z = (sample mean - hypothesized mean) / (standard deviation / √n).
🧮 In the example, a study of 43 women aged 55+ found that their average calorie consumption was 1446, with a standard deviation of 56.
💡 The hypothesized mean in this example was 1660 calories per day.
🧪 The video walks through the hypothesis testing process, explaining that the null hypothesis states there is no significant difference.
🔄 This is a two-tailed test, with a level of significance (alpha) set at 0.05.
🖩 After calculating the z-value of -25.006, the p-value was found to be less than 0.0001, which is smaller than the alpha.
🚫 Because the p-value is less than alpha, the null hypothesis is rejected, meaning there is a significant difference in calorie consumption.

Q & A

What is a Z-test?
-A Z-test is a statistical test used to determine if there is a significant difference between a sample mean and a hypothesized population mean. It is applicable when the data is parametric, meaning it has a known mean, variance, or standard deviation.
What are the conditions for using a Z-test?
-The conditions for using a Z-test include having a sample mean, a hypothesized mean, a known population standard deviation, and a sample size greater than or equal to 30.
What is the formula for calculating the Z-value in a Z-test?
-The formula for calculating the Z-value is Z = (sample mean - hypothesized mean) / (standard deviation / √n), where n is the sample size.
How is the Z-value used in hypothesis testing?
-The Z-value is used to determine the p-value, which is then compared to the level of significance (alpha) to decide whether to accept or reject the null hypothesis.
What is the null hypothesis in the context of the video?
-In the video, the null hypothesis states that there is no significant difference in the mean number of calories consumed by women over the age of 55, which is hypothesized to be 1660 calories per day.
What is the alternative hypothesis in the example provided?
-The alternative hypothesis in the example is that there is a significant difference in the mean number of calories consumed by women over the age of 55 compared to the hypothesized mean of 1660 calories per day.
What does it mean to reject the null hypothesis?
-Rejecting the null hypothesis means that there is enough evidence to suggest that the sample data is significantly different from the hypothesized population mean, indicating a real effect or difference.
What is the significance level used in the example?
-The significance level used in the example is not explicitly stated, but it is implied to be a common value such as 0.05, as the p-value obtained was less than 0.001, leading to the rejection of the null hypothesis.
How was the sample size determined in the example?
-In the example, the researcher interviewed 43 women over the age of 55 to determine the mean number of calories they consumed.
What does the p-value represent in the context of the Z-test?
-The p-value represents the probability of observing the sample data, or more extreme data, if the null hypothesis were true. A small p-value indicates that such an observation would be unlikely under the null hypothesis.
What is the conclusion of the example in the video?
-The conclusion of the example is that there is a significant difference between the number of calories consumed by women over the age of 55 and the hypothesized mean of 1660 calories per day, as the p-value was less than the level of significance.