Post on 20-Jan-2018
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Section 9.1
Samples and Central Tendency
Objectives:1. To distinguish population
parameters from sample statistics.
2. To find measures of centraltendency.
Researchers use a small group of people, called a sample, to
approximate information about a larger group, called the
population.
AA populationpopulation is the complete is the complete collection of elements (scores, collection of elements (scores, people, measurements) to be people, measurements) to be studied.studied.
A A samplesample is a subset of a is a subset of a population.population.
DefinitionDefinition
The larger group of interest is called the population, and the selected subset is a sample.
If every member of the population has an equal
chance of being included in the sample, then it is a random
sample.
A stratified random sample is a random sample within certain
groups of a population.
A stratified random sample is a sample obtained by separating the population elements into
nonoverlapping groups, called strata, and then selecting a
simple random sample within each stratum.
Parameter Parameter The actual value of The actual value of a quantity for the population, a quantity for the population, usually known only to God.usually known only to God.
**Usually represented with Usually represented with Greek lettersGreek letters
DefinitionDefinition
Statistic Statistic An estimate of the An estimate of the population parameter based on population parameter based on a sample.a sample.
**Usually represented with Usually represented with English lettersEnglish letters
DefinitionDefinition
Greek letters usually represent parameters, while English
letters represent statistics. For example, μ represents the
population mean while x (x bar) represents the sample mean.
The bar over the x distinguishes the sample mean from an individual value of the
variable x.
The number (n) of values is the sample size, the number in the population is N, and the data
values are numbered with subscripts x1, x2, x3, . . . xn.
These values can be referred to as xi for i = 1, 2, 3, . . . n.
The letter i is a counter variable or index. The symbol
is used to represent the addition of data values
because it is the capital Greek letter sigma that corresponds
to our letter s as an abbreviation for sum.
The starting value of the index appears below the and the
ending value above the . The summation in the following
definition is read “summation of x sub i as i goes from 1 to
n.”
MeanMean
where where nn is the sample size is the sample sizen
xx
n
i = 1i
=
DefinitionDefinition
The mean is one of several statistics that are called
measures of central tendency.
Median Median The middle value (or The middle value (or average of the middle two average of the middle two values) after listing the data in values) after listing the data in order of size.order of size.
DefinitionDefinition
Mode Mode The most frequent The most frequent value(s) (if any).value(s) (if any).
DefinitionDefinition
Midrange Midrange The average of the The average of the highest and lowest value.highest and lowest value.
DefinitionDefinition
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88 x1, x2, x3, x4, x5, x6, x7, x8
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the sample size.
n = 8
= 85 + 93 + 96 + 74 + 65
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the mean.
=
8
1iix
= 676
+ 88 + 87 + 88
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the mean.
x = n xi
n
i =1 = 84.5= 6768
5.87=2
8887 +
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the median.
65, 74, 85, 87, 88, 88, 93, 96
65, 74, 85, 87, 88, 88, 93, 96
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the mode.
5.80=2
9665 +
Practice: The following test scores were recorded:
85, 93, 96, 74, 65, 88, 87, 88
Find the midrange.
65, 74, 85, 87, 88, 88, 93, 96
n
i =1
n
i =1
n
i =1(xi + yi) = xi + yi
n
i =1k = nk for any k R
Summation Rules:
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.sample sizen = 8
mean
= 685
i =1xi = 76 + 86 + 78 + 83 + 90 +
8
88 + 94 + 90
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.
mean
8685x = = 85.625 ≈ 85.6=
n
n
i =1xi
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.
median76, 78, 83, 86, 88, 90, 90, 94
= 872
86 + 88
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.
mode76, 78, 83, 86, 88, 90, 90, 94
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.
midrange76, 78, 83, 86, 88, 90, 90, 94
= 852
76 + 94
Practice: Give the four measures of central tendency for the following scores: 76, 86, 78, 83, 90, 88, 94, 90.
Homework:
pp. 451-453
■ Cumulative Review
27. Solve ABC if b = 29, c = 21, and C = 42°.
■ Cumulative Review
28. Find the central angle of a circle of radius 10.2 m if the angle
intercepts an arc of length 47.9 m. Give the answer in both radians and degrees.
■ Cumulative Review
29. Which elementary row operation changes the sign of the
determinant?
■ Cumulative Review
30. Find 5<2, 7> – 2<1, -6>
■ Cumulative Review
31. Write the equation of an ellipse with center (5, -2), horizontal major axis of 10, and eccentricity of 0.75.