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CLEP General Mathematics: Probability And Statistics

Subjects : clep, math

Instructions:

Answer 50 questions in 15 minutes.
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Match each statement with the correct term.
Don't refresh. All questions and answers are randomly picked and ordered every time you load a test.

This is a study tool. The 3 wrong answers for each question are randomly chosen from answers to other questions. So, you might find at times the answers obvious, but you will see it re-enforces your understanding as you take the test each time.

1. Ratio and interval measurements which can be either discrete or continuous - due to their numerical nature are grouped together as
Statistics
An Elementary event
quantitative variables
That value is the median value

2. The proportion of the explained variation by a linear regression model in the total variation.
Variability
the sample or population mean
Coefficient of determination
Type I errors & Type II errors

3. Is defined as the expected value of random variable (X -
An Elementary event
Prior probability
The Covariance between two random variables X and Y - with expected values E(X) =
Simpson's Paradox

4. Is a sample space over which a probability measure has been defined.
Dependent Selection
That is the median value
Joint probability
A probability space

5. In Bayesian inference - this represents prior beliefs or other information that is available before new data or observations are taken into account.
Cumulative distribution functions
Prior probability
Sampling
applied statistics

6. In the long run - as the sample size increases - the relative frequencies of outcomes approach to the theoretical probability.
f(z) - and its cdf by F(z).
the population correlation
That value is the median value
Law of Large Numbers

7. Is data that can take only two values - usually represented by 0 and 1.
Binary data
Power of a test
A Distribution function
Law of Parsimony

8. Have no meaningful rank order among values.
the population correlation
Nominal measurements
A probability density function
Type 2 Error

9. Patterns in the data may be modeled in a way that accounts for randomness and uncertainty in the observations - and are then used for drawing inferences about the process or population being studied; this is called
Descriptive
Valid measure
The variance of a random variable
inferential statistics

10. Is a function that gives the probability of all elements in a given space: see List of probability distributions
A Random vector
A data point
A probability distribution
Skewness

11. When info. in a contingency table is re-organized into more or less categories - relationships seen can change or reverse.

12. Of a group of numbers is the center point of all those number values.
hypotheses
The average - or arithmetic mean
Beta value
observational study

13. Is a set of entities about which statistical inferences are to be drawn - often based on random sampling. One can also talk about a population of measurements or values.
Skewness
A population or statistical population
Alpha value (Level of Significance)
An Elementary event

14. Is that part of a population which is actually observed.
A sample
the population mean
Statistical adjustment
An Elementary event

15. Data are gathered and correlations between predictors and response are investigated.
Type I errors & Type II errors
Step 1 of a statistical experiment
observational study
Ratio measurements

16. When there is an even number of values...
That is the median value
Divide the sum by the number of values.
A sample
The Range

17. Is used to describe probability in a continuous probability distribution. For example - you can't say that the probability of a man being six feet tall is 20% - but you can say he has 20% of chances of being between five and six feet tall. Probabilit
Probability density
Inferential
Probability
Parameter - or 'statistical parameter'

18. Cov[X - Y] :
covariance of X and Y
Correlation
Outlier
Lurking variable

19. Used to reduce bias - this measure weights the more relevant information higher than less relevant info.
the sample or population mean
Statistical adjustment
quantitative variables
Descriptive

20. Where the null hypothesis is falsely rejected giving a 'false positive'.
Type I errors
Seasonal effect
Beta value
the sample mean - the sample variance s2 - the sample correlation coefficient r - the sample cumulants kr.

21. Consists of a number of independent trials repeated under identical conditions. On each trial - there are two possible outcomes.
Observational study
Atomic event
Binomial experiment
Sample space

22. A measurement such that the random error is small
Reliable measure
the population cumulants
A Probability measure
Probability density

23. Is its expected value. The mean (or sample mean of a data set is just the average value.
Inferential
The Mean of a random variable
Standard error
Individual

24. Interpretation of statistical information in that the assumption is that whatever is proposed as a cause has no effect on the variable being measured can often involve the development of a
A likelihood function
Correlation
Null hypothesis
A statistic

25. Is a sample and the associated data points.
Interval measurements
the population cumulants
observational study
A data set

26. Var[X] :
variance of X
Parameter
The arithmetic mean of a set of numbers x1 - x2 - ... - xn
Probability

27. Is a measure of the 'peakedness' of the probability distribution of a real-valued random variable. Higher kurtosis means more of the variance is due to infrequent extreme deviations - as opposed to frequent modestly sized deviations.
P-value
Kurtosis
Type 2 Error
Step 2 of a statistical experiment

28. A numerical measure that describes an aspect of a sample.
nominal - ordinal - interval - and ratio
Type I errors & Type II errors
Alpha value (Level of Significance)
Statistic

29. A numerical measure that describes an aspect of a population.
The Expected value
A sampling distribution
Law of Parsimony
Parameter

30. Given two random variables X and Y - the joint distribution of X and Y is the probability distribution of X and Y together.
Probability density
Particular realizations of a random variable
Prior probability
Joint distribution

31.
Probability and statistics
the population mean
Experimental and observational studies
Coefficient of determination

32. Descriptive statistics and inferential statistics (a.k.a. - predictive statistics) together comprise
Cumulative distribution functions
The average - or arithmetic mean
applied statistics
That value is the median value

33. A collection of events is mutually independent if for any subset of the collection - the joint probability of all events occurring is equal to the product of the joint probabilities of the individual events. Think of the result of a series of coin-fl
hypotheses
Sample space
Mutual independence
Reliable measure

34. Samples are drawn from two different populations such that there is a matching of the first sample data drawn and a corresponding data value in the second sample data.
Dependent Selection
experimental studies and observational studies.
quantitative variables
Mutual independence

35. Summarize the population data by describing what was observed in the sample numerically or graphically. Numerical descriptors include mean and standard deviation for continuous data types (like heights or weights) - while frequency and percentage are
Step 2 of a statistical experiment
Alpha value (Level of Significance)
Average and arithmetic mean
Descriptive statistics

36. Involves taking measurements of the system under study - manipulating the system - and then taking additional measurements using the same procedure to determine if the manipulation has modified the values of the measurements.
An experimental study
Greek letters
covariance of X and Y
Descriptive

37. Changes over time that show a regular periodicity in the data where regular means over a fixed interval; the time between repetitions is called the period.
Step 2 of a statistical experiment
Block
Simple random sample
Seasonal effect

38. Gives the probability of events in a probability space.
A Probability measure
Beta value
A probability distribution
the population cumulants

39. Are usually written with upper case calligraphic (e.g. F for the set of sets on which we define the probability P)
Probability and statistics
Probability density
Block
s-algebras

40. Is the result of applying a statistical algorithm to a data set. It can also be described as an observable random variable.
the sample or population mean
Variable
A statistic
The median value

41. The collection of all possible outcomes in an experiment.
The sample space
Type 1 Error
experimental studies and observational studies.
Sample space

42. The result of a Bayesian analysis that encapsulates the combination of prior beliefs or information with observed data
f(z) - and its cdf by F(z).
Lurking variable
Posterior probability
Simulation

43. To prove the guiding theory further - these predictions are tested as well - as part of the scientific method. If the inference holds true - then the descriptive statistics of the new data increase the soundness of that
Beta value
hypothesis
The standard deviation
Law of Large Numbers

44. Are usually written in upper case roman letters: X - Y - etc.
A Probability measure
Random variables
Dependent Selection
Seasonal effect

45. A consistent - repeated deviation of the sample statistic from the population parameter in the same direction when many samples are taken.
the population mean
Bias
Trend
Nominal measurements

46. The probability of the observed value or something more extreme under the assumption that the null hypothesis is true.
P-value
Bias
A sampling distribution
descriptive statistics

47. Is the most commonly used measure of statistical dispersion. It is the square root of the variance - and is generally written s (sigma).
Simple random sample
A probability distribution
Reliable measure
The standard deviation

48. A group of individuals sharing some common features that might affect the treatment.
A statistic
A population or statistical population
Block
the population correlation

49. A numerical measure that assesses the strength of a linear relationship between two variables.
the population cumulants
Law of Large Numbers
Correlation coefficient
Quantitative variable

50. Are simply two different terms for the same thing. Add the given values
Type I errors
Average and arithmetic mean
Step 2 of a statistical experiment
Random variables