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Note 7 of 5E
Statistics with Economics and Statistics with Economics and Business ApplicationsBusiness Applications
Chapter 5 The Normal and Other Continuous Probability Distributions
Normal Probability Distribution
Note 7 of 5E
ReviewReview
I. I. What’s in last lecture?What’s in last lecture?
Binomial, Poisson and Hypergeometric Probability Distributions. Chapter 4.
II. II. What's in this lecture?What's in this lecture?
Normal Probability Distribution. Read Chapter 5
Note 7 of 5E
Continuous Random VariablesContinuous Random Variables
A random variable is continuous if it can assume the infinitely many values corresponding to points on a line interval.
• Examples:Examples:
– Heights, weights
– length of life of a particular product
– experimental laboratory error
Note 7 of 5E
Continuous Probability DistributionContinuous Probability Distribution Suppose we measure height of students in this class. If we
“discretize” by rounding to the nearest feet, the discrete probability histogram is shown on the left. Now if height is measured to the nearest inch, a possible probability histogram is shown in the middle. We get more bins and much smoother appearance. Imagine we continue in this way to measure height more and more finely, the resulting probability histograms approach a smooth curve shown on the right.
Note 7 of 5E
Probability Distribution for a Continuous Probability Distribution for a Continuous Random VariableRandom Variable
Probability distribution describes how the probabilities are distributed over all possible values. A probability distribution for a continuous random variable x is specified by a mathematical function denoted by f(x) which is called the density function. The graph of a density function is a smooth curve.
Note 7 of 5E
Properties of Continuous Probability Properties of Continuous Probability DistributionsDistributions
• f(x) 0• The area under the curve is equal to 11..• P(a x b) = area under the curvearea under the curve between a and
b.
Note 7 of 5E
Some IllustrationsSome Illustrations
a
P(x<a)
Notice that for a continuous random variable x, P(x = a) = 0 for any specific value a because the “area above a point” under the curve is a line segment and hence has 0 area. Specifically this means P(x<a) = P(x a) P(a<x<b) = P(ax<b) = P(a<xb) = P(a xb)
b
P(x>b)
Note 7 of 5E
Method of Probability CalculationMethod of Probability CalculationThe probability that a continuous random variable x lies between a lower limit a and an upper limit b is
P(a<x<b) = (cumulative area to the left of b) –
(cumulative area to the left of a)
= P(x < b) – P(x < a)
= -a b ab
Note 7 of 5E
Continuous Probability Continuous Probability DistributionsDistributions
• There are many different types of continuous random variables
• We try to pick a model that– Fits the data well– Allows us to make the best possible
inferences using the data.• One important continuous random variable is
the normal random variablenormal random variable.
Note 7 of 5E
The Normal DistributionThe Normal Distribution
deviation. standard andmean population theare and
1416.3 7183.2
for 2
1)(
2
2
1
e
xexfx
deviation. standard andmean population theare and
1416.3 7183.2
for 2
1)(
2
2
1
e
xexfx
Two parameters, mean and standard deviation, completely determine the Normal distribution. The shape and location of the normal curve changes as the mean and standard deviation change.
The formula that generates the normal probability distribution is:
Note 7 of 5E
Normal Distributions: =1
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
0, 1
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
1, 1
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
2, 1
Normal Distributions: =1
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
3, 1
0.00
0.10
0.20
0.30
0.40
0.50
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
1, 1
Note 7 of 5E
Normal Distributions: Normal Distributions: =0=0
0.00
0.20
0.40
0.60
0.80
1.00
1.20
1.40
1.60
1.80
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
=0, =1
0.00
0.20
0.40
0.60
0.80
1.00
1.20
1.40
1.60
1.80
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
=0, =1=0, =2
0.00
0.20
0.40
0.60
0.80
1.00
1.20
1.40
1.60
1.80
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
=0, =1=0, =2=0, =3
0.00
0.20
0.40
0.60
0.80
1.00
1.20
1.40
1.60
1.80
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
=0, =1=0, =2=0, =3=0, =0.5
0.00
0.20
0.40
0.60
0.80
1.00
1.20
1.40
1.60
1.80
-5.0 -4.0 -3.0 -2.0 -1.0 0.0 1.0 2.0 3.0 4.0 5.0 6.0
=0, =1=0, =2=0, =3=0, =0.5=0, =0.25
Note 7 of 5E
The Standard Normal The Standard Normal DistributionDistribution
• To find P(a < x < b), we need to find the area under the appropriate normal curve.
• To simplify the tabulation of these areas, we standardizestandardize each value of x by expressing it as a z-score, the number of standard deviations it lies from the mean .
x
z
x
z
Note 7 of 5E
The Standard The Standard Normal (Normal (zz) )
DistributionDistribution
• Mean = 0; Standard deviation = 1• When x = , z = 0• Symmetric about z = 0• Values of z to the left of center are negative• Values of z to the right of center are positive• Total area under the curve is 1.• Areas on both sides of center equal .5
Note 7 of 5E
Using Table 3Using Table 3The four digit probability in a particular row and column of Table 3 gives the area under the standard normal curve between 0 and a positive value z. This is enough because the standard normal curve is symmetric.
Note 7 of 5E
To find an area between 0 and a positive z-value, read directly from the tableUse properties of standard normal curve and other probability rules to find other areas
To find an area between 0 and a positive z-value, read directly from the tableUse properties of standard normal curve and other probability rules to find other areas
Using Table 3Using Table 3
P(0<z<1.96) = .4750
P(-1.96<z<0)= P(0<z<1.96)=.4750
P(z<1.96)=P(z<0)+ P(0<z<1.96)=.5+.4750=.9750
P(z<-1.96)=P(z>1.96)=.5-.4750=.0250
P(-1.96<z<1.96)=P(z<1.96)-P(z<-1.96)
=.9750-.0250=.9500
Note 7 of 5E
1. Look for the four digit area closest to .4750 in Table 3.
2. What row and column does this value correspond to?
1. Look for the four digit area closest to .4750 in Table 3.
2. What row and column does this value correspond to?
Working BackwardsWorking Backwards
Often we know the area and want to find the z-value that gives the area.
Example: Find the value of a positive z that has area .4750 between 0 and z.
3. z = 1.96
Note 7 of 5E
ExampleExample
P(z<?) = .75
P(z<?)=P(z<0)+P(0<z<?)=.5+P(0<z<?)=.75
P(0<z<?)=.25
z = .67
What percentile does this value represent?
75th percentile, or the third quartile.
What percentile does this value represent?
75th percentile, or the third quartile.
Note 7 of 5E
1. The area to its left will be 1 - .05 = .95
2. The area to its left and right to 0 will be .95-.5=.45
3. Look for the four digit area closest to .4500 in Table 3.
4. Since the value .4500 is halfway between .4495 and .4505, we choose z halfway between 1.64 and 1.65. z=1.645
1. The area to its left will be 1 - .05 = .95
2. The area to its left and right to 0 will be .95-.5=.45
3. Look for the four digit area closest to .4500 in Table 3.
4. Since the value .4500 is halfway between .4495 and .4505, we choose z halfway between 1.64 and 1.65. z=1.645
Working BackwardsWorking Backwards
Find the value of z that has area .05 to its right.
Note 7 of 5E
Finding Probabilities for the Finding Probabilities for the General Normal Random VariableGeneral Normal Random Variable
To find an area for a normal random variable x with mean and standard deviation , standardize or rescale the interval in terms of z. Find the appropriate area using Table 3.
To find an area for a normal random variable x with mean and standard deviation , standardize or rescale the interval in terms of z. Find the appropriate area using Table 3.
Example: Example: x has a normal distribution with mean = 5 and sd = 2. Find P(x > 7).
1587.3413.5.1)10()0(1
)1(1)1()2
57()7(
zPzP
zPzPzPxP
Note 7 of 5E
ExampleExampleThe weights of packages of ground beef are normally distributed with mean 1 pound and standard deviation .10. What is the probability that a randomly selected package weighs between 0.80 and 0.85 pounds?
0440.4332.4772.
)5.10()20(
)25.1()5.12(
)1.
185.
1.
180.()85.80(.
zPzP
zPzP
zPxP
Note 7 of 5E
ExampleExampleWhat is the weight of a package such that only 5% of all packages exceed this weight?
16.11)1(.645.1?
645.11.
1? 3, Table From
45.50.95.)1.
1?0(
05.)1.
1?(
05.?)(
zP
zP
xP
16.11)1(.645.1?
645.11.
1? 3, Table From
45.50.95.)1.
1?0(
05.)1.
1?(
05.?)(
zP
zP
xP
Note 7 of 5E
ExampleExample
A Company produces “20 ounce” jars of a picante sauce. The true amounts of sauce in the jars of this brand sauce follow a normal distribution.
Suppose the companies “20 ounce” jars follow a normally distribution with a mean =20.2 ounces with a standard deviation =0.125 ounces.
Note 7 of 5E
Example Example What proportion of the jars are under-filled (i.e.,
have less than 20 ounces of sauce)?
P(z<-1.60) = P(z>1.60) = P(z>0)-P(0<z<1.60) = .5-.4452 = .0548. The proportion of the sauce jars that are under-filled is .0548
60.1125.0
2.2020
xz
Note 7 of 5E
What proportion of the sauce jars contain between 20 and 20.3 ounces of sauce.
Z
20 2020125
160.
.. Z
203 2020125
080. ..
.
P(-1.60<z<.80) = P(-1.60<z<0)+P(0<z<.80) = P(0<z<1.60)+P(0<z<.80)=.4452+.2881=.7333
P(-1.60<z<.80) = P(z<.80)-P(z<-1.60)=.5+P(0<z<.80)-[.5-P(0<z<1.60)]=P(0<z<1.60)+P(0<z<.80)=.7333
Example Example
Note 7 of 5E
99% of the jars of this brand of picante sauce will contain more than what amount of sauce?
Example Example
91.19)125(.33.22.20?
33.2125.
?2.20 3, Table From
49.)125.
?2.200(
)125.
?2.200(5.)
125.
?2.20()
125.
2.20?(01.
)125.
2.20?(?)(99.
zP
zPzPzP
zPxP
91.19)125(.33.22.20?
33.2125.
?2.20 3, Table From
49.)125.
?2.200(
)125.
?2.200(5.)
125.
?2.20()
125.
2.20?(01.
)125.
2.20?(?)(99.
zP
zPzPzP
zPxP
Note 7 of 5E
How Probabilities Are DistributedHow Probabilities Are Distributed
• The interval contains approximately 68% of the measurements.
• The interval 2 contains approximately 95% of the measurements.
• The interval 3 contains approximately 99.7% of the measurements.
• The interval contains approximately 68% of the measurements.
• The interval 2 contains approximately 95% of the measurements.
• The interval 3 contains approximately 99.7% of the measurements.
Note 7 of 5E
The Normal Approximation to the The Normal Approximation to the BinomialBinomial
• We can calculate binomial probabilities using– The binomial formula– The cumulative binomial tables
• When n is large, and p is not too close to zero or one, areas under the normal curve with mean np and variance npq can be used to approximate binomial probabilities.
SticiGuiSticiGui
Note 7 of 5E
Approximating the BinomialApproximating the Binomial
Make sure to include the entire rectangle for the values of x in the interval of interest. This is called the continuity correctioncontinuity correction. . Standardize the values of x using
npqnp,σ,μσ
μxz
npqnp,σ,μ
σ
μxz
Make sure that np and nq are both greater than 5 to avoid inaccurate approximations! Orn is large and 2 falls between 0 and n (book)
Note 7 of 5E
Correction for ContinuityCorrection for Continuity Add or subtract .5 to include the entire rectangle. For
illustration, suppose x is a Binomial random variable with n=6, p=.5. We want to compute P(x 2). Using 2 directly will miss the green area. P(x 2)=P(x 2.5) and use 2.5.
Note 7 of 5E
ExampleExampleSuppose x is a binomial random variable with n = 30 and p = .4. Using the normal approximation to find P(x 10).
n = 30 p = .4 q = .6
np = 12 nq = 18
683.2)6)(.4(.30
12)4(.30
Calculate
npq
np
683.2)6)(.4(.30
12)4(.30
Calculate
npq
np
The normal approximation
is ok!
Note 7 of 5E
ExampleExample
)xP()xP(
)xP()xP(
P(x)P(x
)xP)P(x
xP)P(x
5.95.4105
5.95.5105
)5.55
5.4(5
)5.9(10
Note 7 of 5E
ExampleExampleA production line produces AA batteries with a reliability rate of 95%. A sample of n = 200 batteries is selected. Find the probability that at least 195 of the batteries work.
Success = working battery n = 200
p = .95 np = 190 nq = 10
The normal approximation
is ok!
))05)(.95(.200
1905.194()195(
zPxP
0722.9278.1)46.1( zP
Note 7 of 5E
Key ConceptsKey ConceptsI. Continuous Probability DistributionsI. Continuous Probability Distributions
1. Continuous random variables
2. Probability distributions or probability density functions
a. Curves are smooth.
b. The area under the curve between a and b represents
the probability that x falls between a and b.
c. P (x a) 0 for continuous random variables.
II. The Normal Probability DistributionII. The Normal Probability Distribution
1. Symmetric about its mean .
2. Shape determined by its standard deviation .
Note 7 of 5E
Key ConceptsKey ConceptsIII. The Standard Normal DistributionIII. The Standard Normal Distribution
1. The normal random variable z has mean 0 and standard deviation 1.2. Any normal random variable x can be transformed to a standard normal random variable using
3. Convert necessary values of x to z.4. Use Table 3 in Appendix I to compute standard normal probabilities.5. Several important z-values have tail areas as follows:
Tail Area: .005 .01 .025 .05 .10
z-Value: 2.58 2.33 1.96 1.645 1.28
x
z
x
z