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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.
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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. A numerical facsimilie or representation of a real-world phenomenon.
A sampling distribution
Inferential
A population or statistical population
Simulation

2. 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.
The Expected value
A sample
An experimental study
Random variables

3. Is data arising from counting that can take only non-negative integer values.
Atomic event
Count data
A data point
Descriptive

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

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5. The proportion of the explained variation by a linear regression model in the total variation.
Coefficient of determination
Divide the sum by the number of values.
Simple random sample
Marginal probability

6. Working from a null hypothesis two basic forms of error are recognized:
Ordinal measurements
covariance of X and Y
Type I errors & Type II errors
Sample space

7. Where the null hypothesis is falsely rejected giving a 'false positive'.
A Random vector
s-algebras
A data point
Type I errors

8. Is used in 'mathematical statistics' (alternatively - 'statistical theory') to study the sampling distributions of sample statistics and - more generally - the properties of statistical procedures. The use of any statistical method is valid when the
Marginal probability
f(z) - and its cdf by F(z).
Probability
Pairwise independence

9. Are usually written with upper case calligraphic (e.g. F for the set of sets on which we define the probability P)
s-algebras
An event
Statistics
The Mean of a random variable

10. Uses patterns in the sample data to draw inferences about the population represented - accounting for randomness. These inferences may take the form of: answering yes/no questions about the data (hypothesis testing) - estimating numerical characteris
Ratio measurements
Inferential statistics
Inferential
Null hypothesis

11. A consistent - repeated deviation of the sample statistic from the population parameter in the same direction when many samples are taken.
Mutual independence
Bias
Null hypothesis
Step 1 of a statistical experiment

12. A common goal for a statistical research project is to investigate causality - and in particular to draw a conclusion on the effect of changes in the values of predictors or independent variables on dependent variables or response.
A sampling distribution
A population or statistical population
Experimental and observational studies
Statistical inference

13. Gives the probability distribution for a continuous random variable.
A probability density function
An event
Count data
Standard error

14. Another name for elementary event.
Atomic event
Bias
Binomial experiment
Estimator

15. Gives the probability of events in a probability space.
Parameter - or 'statistical parameter'
Treatment
A Probability measure
Sample space

16. 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
The variance of a random variable
A Probability measure
Treatment
hypothesis

17. When you have two or more competing models - choose the simpler of the two models.
Law of Parsimony
A population or statistical population
A statistic
Variability

18. Long-term upward or downward movement over time.
An event
Trend
A population or statistical population
Individual

19. (cdfs) are denoted by upper case letters - e.g. F(x).
Cumulative distribution functions
Particular realizations of a random variable
Skewness
Treatment

20. Is that part of a population which is actually observed.
Confounded variables
A sample
Law of Large Numbers
The median value

21.
Sample space
quantitative variables
the population mean
Trend

22. Is inference about a population from a random sample drawn from it or - more generally - about a random process from its observed behavior during a finite period of time.
Statistical inference
Likert scale
Estimator
hypotheses

23. A subjective estimate of probability.
Sampling Distribution
P-value
Credence
Simpson's Paradox

24. A numerical measure that assesses the strength of a linear relationship between two variables.
Correlation coefficient
the population mean
Law of Large Numbers
Step 3 of a statistical experiment

25. When there is an even number of values...
That is the median value
the population cumulants
Seasonal effect
Inferential statistics

26. Have imprecise differences between consecutive values - but have a meaningful order to those values
P-value
Nominal measurements
The Expected value
Ordinal measurements

27. Describes a characteristic of an individual to be measured or observed.
Probability and statistics
Variable
Sampling Distribution
Valid measure

28. Is the probability distribution - under repeated sampling of the population - of a given statistic.
experimental studies and observational studies.
Treatment
A sampling distribution
Type I errors & Type II errors

29. 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.
Ratio measurements
Cumulative distribution functions
Beta value
Dependent Selection

30. A variable has a value or numerical measurement for which operations such as addition or averaging make sense.
Simpson's Paradox
A statistic
Quantitative variable
The average - or arithmetic mean

31. Is denoted by - pronounced 'x bar'.
the population correlation
Sampling frame
The arithmetic mean of a set of numbers x1 - x2 - ... - xn
Descriptive statistics

32. A variable describes an individual by placing the individual into a category or a group.
Null hypothesis
Qualitative variable
An Elementary event
Binary data

33. Ratio and interval measurements which can be either discrete or continuous - due to their numerical nature are grouped together as
Law of Parsimony
An event
quantitative variables
The Range

34. Samples are drawn from two different populations such that the sample data drawn from one population is completely unrelated to the selection of sample data from the other population.
A probability distribution
The Covariance between two random variables X and Y - with expected values E(X) =
An experimental study
Independent Selection

35. Var[X] :
Power of a test
Descriptive statistics
variance of X
Beta value

36. Cov[X - Y] :
Sampling Distribution
covariance of X and Y
Probability
An estimate of a parameter

37. 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.
A population or statistical population
A sampling distribution
The average - or arithmetic mean
Reliable measure

38. Where the null hypothesis fails to be rejected and an actual difference between populations is missed giving a 'false negative'.
hypothesis
Parameter
expected value of X
Type II errors

39. Is a sample and the associated data points.
A data set
Correlation coefficient
Binary data
Law of Large Numbers

40. Are simply two different terms for the same thing. Add the given values
the population correlation
Average and arithmetic mean
Null hypothesis
Step 3 of a statistical experiment

41. 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.
Statistical dispersion
Kurtosis
Residuals
A data point

42. Is the study of the collection - organization - analysis - and interpretation of data. It deals with all aspects of this - including the planning of data collection in terms of the design of surveys and experiments.
Count data
Statistics
covariance of X and Y
Parameter

43. A numerical measure that describes an aspect of a sample.
Statistic
Sampling frame
The Mean of a random variable
Sampling Distribution

44. Some commonly used symbols for population parameters
A likelihood function
methods of least squares
the population mean
Beta value

45. There are two major types of causal statistical studies: In both types of studies - the effect of differences of an independent variable (or variables) on the behavior of the dependent variable are observed. The difference between the two types lies
Probability density
experimental studies and observational studies.
An event
Standard error

46. Can be a population parameter - a distribution parameter - an unobserved parameter (with different shades of meaning). In statistics - this is often a quantity to be estimated.

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47. The probability distribution of a sample statistic based on all the possible simple random samples of the same size from a population.
An estimate of a parameter
Nominal measurements
Joint distribution
Sampling Distribution

48. ?
Statistic
Simulation
Mutual independence
the population correlation

49. (or just likelihood) is a conditional probability function considered a function of its second argument with its first argument held fixed. For example - imagine pulling a numbered ball with the number k from a bag of n balls - numbered 1 to n. Then
An event
Sampling
Descriptive statistics
A likelihood function

50. Can be - for example - the possible outcomes of a dice roll (but it is not assigned a value). The distribution function of a random variable gives the probability of different results. We can also derive the mean and variance of a random variable.
A random variable
Lurking variable
Sampling Distribution
the population mean