Term
| 1. A measure of the strength of the linear relationship between two variables. |
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Definition
| 1. What is correlation coefficient. |
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Term
| 2. The type of data required for regression analysis. |
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Definition
| 2. What are bivariate quantitative data. |
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Term
| 3. A variable that gives the value (may not be a number) of the outcome of a study on each individual |
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Definition
| 3. What is the response variable. |
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Term
| 4. The two requirements for computing correlation coefficient. |
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Definition
| 4. What are the two variables must be quantitative and their relationship must be linear. |
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Term
5. A two dimensional plot used to examine strength of relationship between two variables as well as direction
and type of relationship. |
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Definition
| 5. What is a scatterplot. |
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Term
| 6. An observation that substantially alters the correlation coefficient value. |
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Definition
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Term
| 7. Type of association where high values of one variable tend to associate with high values of another variable. |
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Definition
| 7. What is a positive association. |
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Term
| 8. The maximum and minimum possible values of correlation coefficient. |
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Definition
| 8. What are plus one and minus on. |
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Term
| 9. The unit of measure for the correlation coefficient. |
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Definition
| 9. What is “no” unit of measure”. |
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Term
10. The value of the correlation coefficient when there is no linear association between two quantitative
variables. |
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Definition
| 10. What is zero? Note a non-linear relationship and no relationship can have an r of zero. |
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Term
| 1. A graph for displaying bivariate quantitative data. |
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Definition
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Term
| 2. The symbol for sample correlation coefficient. |
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Definition
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Term
| 3. A measure of the strength of the linear relationship between X and Y. |
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Definition
| 3. What is correlation coefficient. |
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Term
| 4. The line with the smallest sum of squared residuals. |
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Definition
| 4. What is least squares regression line. |
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Term
| 5. A plot of the residuals versus the observed x values. |
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Definition
| 5. What is residual plot. |
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Term
| 6. Requirements for computing correlation coefficient. |
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Definition
| 6. What is bivariate quantitative data with a linear relationship. |
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Term
| 7. The name of the value computed from observed y minus predicted y. |
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Definition
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Term
| 8. A diagnostic tool used to determine if a regression model is a good fit. |
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Definition
| 8. What is residual plot. |
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Term
| 9. The pattern in a residual plot indicating lack of linearity. |
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Definition
| 9. What is a smile or a frown. |
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Term
| 10. The pattern in a residual plot indicating that the variability of the y’s is not constant across all x values. |
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Definition
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Term
| 11. A measure of the percentage of variation in Y explained by X. |
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Definition
| 11. What is r2 (squared). |
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Term
| 12. A measure of the average change in Y for every one unit increase in X. |
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Definition
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Term
| 13. A measure of how far a data point is vertically from the regression line. |
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Definition
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Term
| 14. The unit of measure for correlation coefficient. |
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Definition
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Term
| 15. The commonality between slope and correlation coefficient. |
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Definition
| 15. What is both have the same sign. |
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Term
| 1. A distribution computed from only one row or one column of a two-way table. |
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Definition
| 1. What is conditional distribution. |
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Term
| 2. A distribution computed from the row totals or the column totals. |
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Definition
| 2. What is marginal distribution. |
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Term
3. How the conditional distributions compare when an association exists between the explanatory and response
variables. |
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Definition
| 3. What is “They are different.” |
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Term
4. A reversal in the association between two variables depending on whether a third variable is considered or
ignored. |
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Definition
| 4. What is Simpson’s paradox. |
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Term
5. Percentages found by dividing the counts in a row by the row total (or counts in a column by the column
total). |
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Definition
| 5. What is a conditional distribution. |
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Term
1. The name of the statement telling us that the sampling distribution of x-bar is approximately normal whenever
the sample is large and random. |
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Definition
| 1. What is Central Limit Theorem. |
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Term
| 2. A list of the possible values of a statistic together with the frequency (or probability) of each value. |
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Definition
| 2. What is sampling distribution. |
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Term
3. The shape of the sampling distribution of x-bar when the sample is random from a non-Normal population and
the sample size is large. |
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Definition
| 3. What is approximately Normal. |
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Term
| 4. The symbol for the standard deviation of the theoretical sampling distribution of x-bar. |
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Definition
| 4. What is sigma over the square root of n . |
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Term
| 5. The value of the mean of the theoretical sampling distribution of x-bar. |
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Definition
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Term
| 6. A measure of the variability of the values of the statistic x-bar about µ. |
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Definition
| 6. What is Standard deviation of the sampling distribution. of x-bar. |
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Term
7. Shape of the sampling distribution of x-bar when the sample is small and randomly selected from a Normal
population. |
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Definition
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Term
| 8. A measure of the variability of the sampling distribution of x-bar. |
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Definition
| 8. What is Standard deviation of the sampling distribution. of x-bar. |
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Term
| 9. A measure of the center of the sampling distribution of x-bar. |
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Definition
| 9. What is mean of the sampling distribution of x-bar, namely, mu. |
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Term
10. The name of the fact that the average of the data in a sample will get closer and closer to the population
mean as we increase the sample size. |
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Definition
| 10. What is Law of Large Numbers. |
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Term
| 1. A characteristic of a population that is usually unknown. |
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Definition
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Term
| 2. A subset of the population. |
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Definition
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Term
| 3. x (x-bar), s, pˆ(p-hat), r . |
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Definition
| 3. What are statistic symbols. |
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Term
| 4. (sigma) σ, μ (mu), and p. |
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Definition
| 4. What are parameter symbols. |
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Term
| 5. Using results from a sample to draw conclusions about the entire population. |
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Definition
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Term
| 6. A number computed from sample data used to estimate a parameter. |
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Definition
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Term
| 7. A collection of all of the individuals about which we wish information. |
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Definition
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Term
| 8. Type of samples required for valid inference. |
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Definition
| 8. What is probability samples. |
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Term
| 9. Shape of the histogram of a sample when the sample is large and random. |
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Definition
| 9. What is similar to population histogram. |
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Term
| 10. The difference between the value of a statistic from a sample and the parameter it estimates. |
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Definition
| 10. What is error in the estimate. |
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Term
| 1. A list of the possible values of a variable together with the frequencies of each value. |
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Definition
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Term
| 2. The sum of the probabilities of all possible outcomes. |
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Definition
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Term
| 3. Using random numbers to imitate chance behavior. |
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Definition
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Term
| 4. The probability of event A or event B where events A and B are disjoint. |
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Definition
| 4. What is probability of event A plus probability of event B. |
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Term
5. A measure of the proportion of times an outcome occurs in the long run that gives us an indication of the
likelihood of the outcome. |
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Definition
| 5. What is probability of an outcome. |
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Term
| 1. Value of the center line. |
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Definition
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Term
| 2) mu minus 3 times sigma over the square of n |
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Definition
| 2. What is lower control limit. |
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Term
| 3) mu plus 3 times sigma over the square of n |
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Definition
| 3. What is upper control limit. |
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Term
4. A procedure used to check a process at regular intervals to detect problems and correct them before they
become serious. |
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Definition
| 4. What is process control. |
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Term
5. A chart plotting the means ( x-bars) of regular samples of size n against time; this chart is used to access
whether the process is in control. |
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Definition
| 5. What is control chart or quality control chart. |
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Term
1. The grouping of experimental units according to some similar characteristic where the random allocation is
carried out separately within each group. |
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Definition
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Term
| 2. The condition eliminated by randomly allocating individuals to treatments. |
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Definition
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Term
| 3. Results of a study that differ too much from what we expect due to just randomization to attribute to chance. |
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Definition
| 3. What is statistically significant. |
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Term
| 4. The condition of having more than one individual in each treatment combination. |
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Definition
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Term
5. Fill in the blanks: The advantage of _______________ over _____________ is to remove variation
associated with the blocking variable from experimental error. |
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Definition
| 5. What is “randomized block experiment” over “completely randomized experiment”. |
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Term
| T/F 1. x-bar is the value of the mean of the sampling distribution of x-bar. |
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Definition
| 1. What is False—the mean of the sampling distribution of x bar equals mu. |
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Term
T/F 2. The standard deviation of the population is less than the standard deviation of the sampling distribution of
x-bar. |
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Definition
2. What is false—The standard deviation of the population is greater than the standard deviation of the
sampling distribution of x-bar. |
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Term
| T/F 3. The sampling distribution of x-bar is always taller and skinnier than the population. |
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Definition
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Term
| T/F 4. The mean of the sampling distribution of x-bar gets closer and closer to mu as the sample size increases. |
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Definition
| 4. What is false—The mean of the sampling distribution of x-bar exactly equals mu. |
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Term
T/F 5. The shape of the sampling distribution of x-bar gets closer and closer to the shape of the population as sample
size increases. |
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Definition
| 5. What is false—The shape of the sampling distribution of x-bar gets closer and closer to Normal. |
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Term
T/F 6. The shape of the histogram of data in a sample gets closer and closer to the shape of the population as
sample size increases. |
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Definition
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Term
T/F 7. The shape of the sampling distribution of x-bar gets closer and closer to Normal as the sample size increases
when the population is normal. |
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Definition
7. What is false—The shape of the sampling distribution of x-bar is Normal regardless of sample size if the
population is Normal. |
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Term
T/F 8. The shape of the sampling distribution of x-bar gets closer and closer to Normal as the sample size increases
when the population is non-normal. |
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Definition
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Term
| T/F 9. The shape of the sampling distribution of x-bar is always Normal when the population shape is Normal. |
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Definition
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Term
| T/F 10. The standard deviation of the sampling distribution of x-bar gets closer and closer to sigma as n increases. |
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Definition
| 10. What is false—The standard deviation of the sampling distribution of x-bar equals sigma over the square of n. |
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Term
| T/F 11. The standard deviation of the sampling distribution of x-bar gets smaller and smaller as n increases. |
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Definition
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Term
T/F 12. The standard deviation of the sampling distribution of x-bar gets closer and closer to sigma over the square of n
as n increases. |
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Definition
12. What is false—The standard deviation of the sampling distribution of x-bar is equal to sigma over the square of n regardless of
sample size. |
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Term
T/F 13. We measure the variability of the sampling distribution of x-bar with sigma over the square of n
. |
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Definition
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Term
| T/F 14. The sampling distribution of x-bar tells us the possible values for x-bar together with how often each occurs. |
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Definition
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Term
| T/F 15. The sampling distribution of x-bar tells us all possible values we could get in our sample of size n. |
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Definition
23. What is false—The sampling distribution of x-bar tells us possible values we could get for the sample mean.
That’s because the sampling distribution gives all possible values for x-bar together with their frequencies (or probabilities). |
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