What is 0.095 on the z-score table or where
To find the value of 0.095 on the z-score table, you would need to refer to the standard normal distribution table, also known as the z-score table. This table shows the area under the standard normal curve for various z-scores.
Unfortunately, I cannot directly provide the value of 0.095 from the z-score table without knowing the specific z-score corresponding to that area.
However, if you provide me with the desired z-score or the specific percentile within the standard normal distribution, I can help you find the corresponding value on the z-score table.
The z-score table, also known as the standard normal distribution table, is a table that provides the area under the standard normal curve for different values of the z-score. The z-score represents the number of standard deviations a data point is from the mean.
To find the value of 0.095 on the z-score table, follow these steps:
1. Locate the z-score table: You can find the z-score table in statistics textbooks or online resources. Many online resources provide interactive tools or calculators that allow you to enter the z-score and find the corresponding area.
2. Identify the nearest value: Find the row in the z-score table that most closely matches your desired z-score. Since the table may not have every possible z-score, you will have to look for the nearest value.
3. Determine the area: Once you have identified the row corresponding to the closest z-score, locate the column on that row that corresponds to the decimal part of your z-score. In this case, you would look for the column closest to 0.095.
4. Read the value: Once you have located the row and column that corresponds to your z-score, read the value in the intersection. This value represents the area under the standard normal curve for your z-score.
Note that most tables give the area to the left of the z-score. If you are looking for the area to the right of the z-score, subtract the value you found from 1. For example, if the value you found is 0.600, the area to the right would be 1 - 0.600 = 0.400.
It's important to note that technology has made it easier to find these values without using a z-score table. There are numerous online calculators and statistical software packages that can provide more precise values and greater ease of use.
Is that value the Z score or the probability?
Find table in the back of your statistics text labeled something like "areas under normal distribution" to find the proportion/probability (.095) and its Z score.