1 1 Slide MA4704Gerry Golding Normal Probability Distribution n The normal probability distribution...
-
Upload
josie-tumbleson -
Category
Documents
-
view
233 -
download
1
Transcript of 1 1 Slide MA4704Gerry Golding Normal Probability Distribution n The normal probability distribution...
1 1 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
The The normal probability distributionnormal probability distribution is the most is the most important distribution for describing a important distribution for describing a continuous random variable.continuous random variable.
It is widely used in statistical inference.It is widely used in statistical inference.
2 2 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
HeightsHeightsof peopleof peopleHeightsHeights
of peopleof people
Normal Probability DistributionNormal Probability Distribution
It has been used in a wide variety of It has been used in a wide variety of applications:applications:
ScientificScientific measurementsmeasurements
ScientificScientific measurementsmeasurements
3 3 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
AmountsAmounts
of rainfallof rainfall
AmountsAmounts
of rainfallof rainfall
Normal Probability DistributionNormal Probability Distribution
It has been used in a wide variety of It has been used in a wide variety of applications:applications:
TestTest scoresscoresTestTest
scoresscores
4 4 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
Normal Probability Density FunctionNormal Probability Density Function
2 2( ) / 21( )
2xf x e
2 2( ) / 21( )
2xf x e
= mean= mean
= standard deviation= standard deviation
= 3.14159= 3.14159
ee = 2.71828 = 2.71828
where:where:
5 5 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
The distribution is The distribution is symmetricsymmetric; its skewness; its skewness measure is zero.measure is zero. The distribution is The distribution is symmetricsymmetric; its skewness; its skewness measure is zero.measure is zero.
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
xx
6 6 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
The entire family of normal probabilityThe entire family of normal probability distributions is defined by itsdistributions is defined by its meanmean and its and its standard deviationstandard deviation . .
The entire family of normal probabilityThe entire family of normal probability distributions is defined by itsdistributions is defined by its meanmean and its and its standard deviationstandard deviation . .
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
Standard Deviation Standard Deviation
Mean Mean xx
7 7 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
The The highest pointhighest point on the normal curve is at the on the normal curve is at the meanmean, which is also the , which is also the medianmedian and and modemode.. The The highest pointhighest point on the normal curve is at the on the normal curve is at the meanmean, which is also the , which is also the medianmedian and and modemode..
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
xx
8 8 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
-10-10 00 2020
The mean can be any numerical value: negative,The mean can be any numerical value: negative, zero, or positive.zero, or positive. The mean can be any numerical value: negative,The mean can be any numerical value: negative, zero, or positive.zero, or positive.
xx
9 9 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
= 15= 15
= 25= 25
The standard deviation determines the width of theThe standard deviation determines the width of thecurve: larger values result in wider, flatter curves.curve: larger values result in wider, flatter curves.The standard deviation determines the width of theThe standard deviation determines the width of thecurve: larger values result in wider, flatter curves.curve: larger values result in wider, flatter curves.
xx
10 10 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Probabilities for the normal random variable areProbabilities for the normal random variable are given by given by areas under the curveareas under the curve. The total area. The total area under the curve is 1 (.5 to the left of the mean andunder the curve is 1 (.5 to the left of the mean and .5 to the right)..5 to the right).
Probabilities for the normal random variable areProbabilities for the normal random variable are given by given by areas under the curveareas under the curve. The total area. The total area under the curve is 1 (.5 to the left of the mean andunder the curve is 1 (.5 to the left of the mean and .5 to the right)..5 to the right).
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
.5.5 .5.5
xx
11 11 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.68.26%68.26%68.26%68.26%
+/- 1 standard deviation+/- 1 standard deviation+/- 1 standard deviation+/- 1 standard deviation
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.95.44%95.44%95.44%95.44%
+/- 2 standard deviations+/- 2 standard deviations+/- 2 standard deviations+/- 2 standard deviations
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.
of values of a normal random variableof values of a normal random variable are within of its mean.are within of its mean.99.72%99.72%99.72%99.72%
+/- 3 standard deviations+/- 3 standard deviations+/- 3 standard deviations+/- 3 standard deviations
12 12 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Normal Probability DistributionNormal Probability Distribution
CharacteristicsCharacteristics
xx – – 33 – – 11
– – 22 + 1+ 1
+ 2+ 2 + 3+ 3
68.26%68.26%95.44%95.44%99.72%99.72%
13 13 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Standard Normal Probability DistributionStandard Normal Probability Distribution
A random variable having a normal distributionA random variable having a normal distribution with a mean of 0 and a standard deviation of 1 iswith a mean of 0 and a standard deviation of 1 is said to have a said to have a standard normal probabilitystandard normal probability distributiondistribution..
A random variable having a normal distributionA random variable having a normal distribution with a mean of 0 and a standard deviation of 1 iswith a mean of 0 and a standard deviation of 1 is said to have a said to have a standard normal probabilitystandard normal probability distributiondistribution..
14 14 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
00zz
The letter The letter z z is used to designate the standardis used to designate the standard normal random variable.normal random variable. The letter The letter z z is used to designate the standardis used to designate the standard normal random variable.normal random variable.
Standard Normal Probability DistributionStandard Normal Probability Distribution
15 15 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Converting to the Standard Normal Converting to the Standard Normal DistributionDistribution
Standard Normal Probability DistributionStandard Normal Probability Distribution
zx
zx
We can think of We can think of zz as a measure of the number of as a measure of the number ofstandard deviations standard deviations xx is from is from ..
16 16 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Standard Normal Probability DistributionStandard Normal Probability Distribution
Example: Pep ZoneExample: Pep Zone
Pep Zone sells auto parts and supplies Pep Zone sells auto parts and supplies includingincluding
a popular multi-grade motor oil. When thea popular multi-grade motor oil. When the
stock of this oil drops to 20 gallons, astock of this oil drops to 20 gallons, a
replenishment order is placed.replenishment order is placed. PepZone5w-20Motor Oil
17 17 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
The store manager is concerned that sales The store manager is concerned that sales are beingare being
lost due to stockouts while waiting for an order.lost due to stockouts while waiting for an order.
It has been determined that demand duringIt has been determined that demand during
replenishment lead-time is normallyreplenishment lead-time is normally
distributed with a mean of 15 gallons anddistributed with a mean of 15 gallons and
a standard deviation of 6 gallons. a standard deviation of 6 gallons.
The manager would like to know theThe manager would like to know the
probability of a stockout, probability of a stockout, PP((xx > 20). > 20).
Standard Normal Probability DistributionStandard Normal Probability Distribution
PepZone5w-20Motor Oil
Example: Pep ZoneExample: Pep Zone
18 18 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
zz = ( = (xx - - )/)/ = (20 - 15)/6= (20 - 15)/6 = .83= .83
zz = ( = (xx - - )/)/ = (20 - 15)/6= (20 - 15)/6 = .83= .83
Solving for the Stockout ProbabilitySolving for the Stockout Probability
Step 1: Convert Step 1: Convert xx to the standard normal distribution. to the standard normal distribution.Step 1: Convert Step 1: Convert xx to the standard normal distribution. to the standard normal distribution.
PepZone5w-20
Motor Oil
Step 2: Find the area under the standard normalStep 2: Find the area under the standard normal curve to the right of curve to the right of zz = .83. = .83.Step 2: Find the area under the standard normalStep 2: Find the area under the standard normal curve to the right of curve to the right of zz = .83. = .83.
see next slidesee next slide see next slidesee next slide
Standard Normal Probability DistributionStandard Normal Probability Distribution
19 19 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Cumulative Probability Table for Cumulative Probability Table for the Standard Normal Distributionthe Standard Normal Distribution
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
.5 .3085 .3050 .3015 .2981 .2946 .2912 .2877 .2843 .2810 .2776
.6 .2743 .2709 .2676 .2643 .2611 .2578 .2546 .2514 .2483 .2451
.7 .2420 .2389 .2358 .2327 .2296 .2266 .2236 .2206 .2177 .2148
.8 .2119 .2090 .2061 .2033 .2005 .1977 .1949 .1922 .1894 .1867
.9 .1841 .1814 .1788 .1762 .1736 .1711 .1685 .1660 .1635 .1611
. . . . . . . . . . .
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
.5 .3085 .3050 .3015 .2981 .2946 .2912 .2877 .2843 .2810 .2776
.6 .2743 .2709 .2676 .2643 .2611 .2578 .2546 .2514 .2483 .2451
.7 .2420 .2389 .2358 .2327 .2296 .2266 .2236 .2206 .2177 .2148
.8 .2119 .2090 .2061 .2033 .2005 .1977 .1949 .1922 .1894 .1867
.9 .1841 .1814 .1788 .1762 .1736 .1711 .1685 .1660 .1635 .1611
. . . . . . . . . . .
PepZone5w-20
Motor Oil
PP((zz >> .83) .83)
Standard Normal Probability DistributionStandard Normal Probability Distribution
20 20 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
PP((z z > .83) =.2033 > .83) =.2033 PP((z z > .83) =.2033 > .83) =.2033
Solving for the Stockout ProbabilitySolving for the Stockout Probability
Step 3: Compute the area under the standard normalStep 3: Compute the area under the standard normal curve to the right of curve to the right of zz = .83. = .83.Step 3: Compute the area under the standard normalStep 3: Compute the area under the standard normal curve to the right of curve to the right of zz = .83. = .83.
PepZone5w-20
Motor Oil
ProbabilityProbability of a of a
stockoutstockoutPP((xx > > 20)20)
Standard Normal Probability DistributionStandard Normal Probability Distribution
21 21 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Solving for the Stockout ProbabilitySolving for the Stockout Probability
00 .83.83
Area = .7967Area = .7967Area = .2033Area = .2033
zz
PepZone5w-20
Motor Oil
Standard Normal Probability DistributionStandard Normal Probability Distribution
22 22 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Standard Normal Probability DistributionStandard Normal Probability Distribution
If the manager of Pep Zone wants the If the manager of Pep Zone wants the probability of a stockout to be no more probability of a stockout to be no more than .05, what should the reorder point be?than .05, what should the reorder point be?
PepZone5w-20
Motor Oil
Standard Normal Probability DistributionStandard Normal Probability Distribution
23 23 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Solving for the Reorder PointSolving for the Reorder Point
PepZone5w-20
Motor Oil
00
Area = .9500Area = .9500
Area = .0500Area = .0500
zzzz.05.05
Standard Normal Probability DistributionStandard Normal Probability Distribution
24 24 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Solving for the Reorder PointSolving for the Reorder Point
PepZone5w-20
Motor Oil
Step 1: Find the Step 1: Find the zz-value that cuts off an area of .05-value that cuts off an area of .05 in the right tail of the standard normalin the right tail of the standard normal distribution.distribution.
Step 1: Find the Step 1: Find the zz-value that cuts off an area of .05-value that cuts off an area of .05 in the right tail of the standard normalin the right tail of the standard normal distribution.distribution.
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .0668 .0655 .0643 .0630 .0618 .0606 .0594 .0582 .0571 .0559
1.6 .0548 .0537 .0526 .0516 .0505 .0495 .0485 .0475 .0465 .0455
1.7 .0446 .0436 .0427 .0418 .0409 .0401 .0392 .0384 .0375 .0367
1.8 .0359 .0351 .0344 .0336 .0329 .0322 .0314 .0307 .0301 .0294
1.9 .0287 .0281 .0274 .0268 .0262 .0267 .0250 .0244 .0239 .0233
. . . . . . . . . . .
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .0668 .0655 .0643 .0630 .0618 .0606 .0594 .0582 .0571 .0559
1.6 .0548 .0537 .0526 .0516 .0505 .0495 .0485 .0475 .0465 .0455
1.7 .0446 .0436 .0427 .0418 .0409 .0401 .0392 .0384 .0375 .0367
1.8 .0359 .0351 .0344 .0336 .0329 .0322 .0314 .0307 .0301 .0294
1.9 .0287 .0281 .0274 .0268 .0262 .0267 .0250 .0244 .0239 .0233
. . . . . . . . . . .We look up the tail We look up the tail
area .05 area .05
Standard Normal Probability DistributionStandard Normal Probability Distribution
25 25 Slide
Slide
MA4704MA4704 Gerry GoldingGerry Golding
Solving for the Reorder PointSolving for the Reorder Point
PepZone5w-20
Motor Oil
Step 2: Convert Step 2: Convert zz.05.05 to the corresponding value of to the corresponding value of xx..Step 2: Convert Step 2: Convert zz.05.05 to the corresponding value of to the corresponding value of xx..
xx - - / /zz.05.05
xx = = + +zz.05.05
= 15 + 1.645(6)= 15 + 1.645(6)
= 24.87 or 25= 24.87 or 25
xx - - / /zz.05.05
xx = = + +zz.05.05
= 15 + 1.645(6)= 15 + 1.645(6)
= 24.87 or 25= 24.87 or 25
A reorder point of 25 gallons will place the probabilityA reorder point of 25 gallons will place the probability of a stockout during leadtime at (slightly less than) .05.of a stockout during leadtime at (slightly less than) .05.
Standard Normal Probability DistributionStandard Normal Probability Distribution