Exam 2 ISDS
With independent events, the multiplication rule simplifies to ...
P(A∩B)=P(A)P(B)
a bell curve
a normal curve is also called ...
event
a subset of the sample space
a statistic used to calculate population parameter
estimator
a value of one equals
indefinite events
it is representative of the population we are trying to describe
What is a primary requirement of a good sample?
Given odds for event A occurring of "a to b," the probability of A is
a/a+b
Given odds against event A occurring of "a to b," the probability of A is
b/a+b
is characterized by uncountable values because it can take on any value within an interval
continuous random variable
A particular value of the estimator
estimate
mutually exclusive
events that do not share any common outcome of an experiment
number or houses a realtor sells in a month
example of discrete random variable
marginal probabilities
The values in the margins of the joint probability table, which provide the probability of each event separately.
that the sum or the average of a large number of independent observations from the same underlying distribution has an approximate normal distribution
the central limit theorem states
dependant
the occurrence of one is related to the probability of the occurrence of the other
how much the population varies from the normality
the sample size used to approximate the normal distribution depends on _______________
union
union of two events, denoted A∪B, is the event consisting of all outcomes in A or B.
average of squared differences from the mean
variance
constant; unknown
a parameter is ________, although its value may be ____________
empirical probability
a probability value based on observing the relative frequency with which an event occurs
when the objective is to reduce costs
cluster sampling is preferred
a subset of the population
sample
improves; increases
according to the CLT, the approximation steadily ________ as the number of observations ____________
the tendency of a sample statistic to systematically overestimate or underestimate a population parameter
bias
compliment
compliment of event A, denoted Ac, is the event consisting of all outcomes in the sample space S that are not in A.
the weighted value of all possible values of a random variable
expected value
A sample space S yields eight equally likely events, E, F, G, H, I, J, K, and L. Find P(E U G U I).
(1/8+1/8+1/8) = .375
A sample space S yields eight equally likely events, E, F, G, H, I, J, K, and L. Find P(F^c)
(7/8 = e+g+h+i+j+k+l/e+f+g+h+i+J+k+l) = .875
an estimator
When a sample statistic is used to make inferences about a population parameter it is referred to as _______________
joint probability table
A contingency table whose frequencies have been converted to relative frequencies.
statistical inference
A major portion of statistics is concerned with __________ __________, where we examine the problem of estimating population parameters or testing hypotheses about such parameters.
bias
If a sample statistic continuously over-or-under estimates a population parameter then there is ________
the population mean μ and the population variance σ2
If the normal distribution is completely described by two parameters, what are the two parameters?
observations from each group
In stratified sampling, the sample consists of
two events, A and B, are independent if ...
P(A | B)=P(A)
when the objective is to increase precision
Stratified sampling is preferred
to increase precision
Stratified sampling is the preferred sample method when the objective is _________
If P(A) denotes the probability of an event A occurring, and P(A) does not equal zero or one, then:
The odds for A occurring equalP(A)/1−P(A), and The odds against A occurring equal1−P(A)/P(A)
joint probabilities
The values in the interior of the table represent the probabilities of the intersection of two events
independant
the occurrence of one event does not affect the probability of the occurrence of the other event
np is greater than or equal to 5 and n(1-p) is greater than or equal to 5
for any population proportion p, the sampling distribution of the sample proportion is approx. normally distributed if __________
observations from the selected groups
in cluster sampling, the sample consists of
intersection
intersection of two events, denoted A∩B, is the event consisting of all outcomes in A and B.
x=μ+zσ
inverse transformation formula
a simple event consists of:
just one of the possible outcomes of an experiment
a function of the random sample used to make inferences about the value of an unknown population parameter
point estimator
consists of all items of interest in a statistical problem
population
assumes a countable number of distinct values
discrete random variable
the waiting time at a toll booth
examples of continuous random variable
Two defining properties of probability
1. The probability of any event A is a value between 0 and 1; that is, 0≤P(A)≤1.0≤PA≤1. 2. The sum of the probabilities of any list of mutually exclusive and exhaustive events equals 1.
A sample space S yields eight equally likely events, E, F, G, H, I, J, K, and L.a. Find P(H).
(1/8 = h/e+f+g+i+j+k+l) = .125
Given two events A and B, each with a positive probability of occurring, the probability that A occurs given that B has occurred (A conditioned on B) is equal to
P(A | B)=P(A∩B)/P(B)
the probability that B occurs given that A has occurred (B conditioned on A) is equal to
P(B | A)=P(A∩B)/P(A)
False
True or False: The expected value of the sample proportion is not equal to the population proportion
True
True or False: the sample proportion is an unbiased estimator of the population proportion.
statistic; parameter
We use a calculated sample _______, to make inferences about an unknown population __________.
Probability
a numerical value that measures the likelihood that an event occurs
subjective probability
a probability value based on personal and subjective judgement
experiment
a process that leads to one of several possible outcomes. The diversity of the outcomes of an experiment is due to the uncertainty of the real world
the probability of interest is usually what type of probability?
conditional
sample space
contains all possible outcomes of the experiment
Heights and weights of newborn babies Scores on the SAT Cumulative debt of college graduates Advertising expenditure of firms Rate of return on an investment
examples of random variables that follow a normal distribution
The mean, the median, and the mode are all equal for a normally distributed random variable
if the normal distribution is bell shaped and symmetric around its mean, what happens with the mean median and mode?
a value of zero equals
impossible events
refers to a systematic difference in preferences between respondents and nonrespondents to a survey or a poll.
nonresponse bias
the most extensively used probability distribution in statistical work
normal probability distribution
Classical Probability
often used in games of chance; They are based on the assumption that all outcomes of an experiment are equally likely.
a function that assigns numerical values to the outcomes of an experiment
random variable
a random variable used to estimate the unknown population parameter of interest
sample statistic / statistic
the probability distribution of the sample mean
sampling distribution
refers to a systematic underrepresentation of certain groups from consideration for the sample.
selection bias
contingency table
shows frequencies for two qualitative (categorical) variables, x and y, where each cell represents a mutually exclusive combination of the pair of x and y values.
a sample of n observations that has the same probability of being selected from the population as any other sample of n observations
simple random sample
a special case of the normal distribution with a mean equal to zero and a standard deviation (or variance) equal to one
standard normal distribution
compliment rule
states that the probability of the complement of an event, P(Ac), is equal to one minus the probability of the event; that is, P(Ac)=1−P(A).
addition rule
states that the probability that A or B occurs, or that at least one of these events occurs, is equal to the probability that A occurs, plus the probability that B occurs, minus the probability that both A and B occur. P(A∪B)=P(A)+P(B)−P(A∩B).
the population is first divided up into mutually exclusive and collectively exhaustive groups, called strata. A stratified sample includes randomly selected observations from each stratum. The number of observations per stratum is proportional to the stratum's size in the population. The data for each stratum are eventually pooled.
stratified random sample
multiplication rule
the probability that A and B both occur in P(A∩B)=P(A | B)P(B)
If A and B are mutually exclusive events ...
then P(A∩B)=0PA∩B=0 and, therefore, the addition rule simplifies to P(A∪B)=P(A)+P(B).
bell-shaped and symmetric around its mean, completely described by two parameters, and asymptotic
three characteristics of a normal distribution:
exhausted
when all possible outcomes of an experiment is included in the events
