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Chapter 5 Continuous Random Variables
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Table of Contents
5.1 Continuous Probability Distributions
5.2 The Uniform Distribution
5.3 The Normal Distribution
5.4 The Exponential Distribution (optional)
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5.1 Continuous Probability DistributionsRecall: A continuous random variable may assume any numerical value in one or more intervals
Use a continuous probability distribution to assign probabilities to intervals of values
The curve f(x) is the continuous probability distribution of the continuous random variable x if the probability that x will be in a specified interval of numbers is the area under the curve f(x) corresponding to the interval
•Other names for a continuous probability distribution:•probability curve, or•probability density function
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Properties of Continuous Probability Distributions
Properties of f(x): f(x) is a continuous function such that1. f(x) 0 for all x2. The total area under the curve of f(x) is equal to 1
Essential point: An area under a continuous probability distribution is a probability.
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Area and Probability The blue-colored area under the probability curve f(x)
from the value x = a to x = b is the probability that x could take any value in the range a to b Symbolized as P(a x b)
Or as P(a < x < b), because each of the interval endpoints has a probability of 0
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Continuous Probability Distributions For a continuous random variable its probability density
function gives a complete information about the variable.
The most useful density functions are Normal distribution (正态分布 ), uniform distribution (均匀分布 ) and Exponetial distribution (指数分布 )
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Distribution Shapes Symmetrical and rectangular
The uniform distribution Section 5.2
Symmetrical and bell-shaped The normal distribution
Section 5.3
Skewed Skewed either left or right
Section 5.4 for the right-skewed exponential distribution
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5.2 The Uniform Distribution
dx c cd=xf
otherwise0
for1
If c and d are numbers on the real line (c < d), the probability curve describing the uniform distribution is
The probability that x is any value between the given values a and b (a < b) is
cd
abbxaP
Note: The number ordering is c < a < b < d.
f(x)
xc d
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The Uniform Probability Curve
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5.2 The Uniform Distribution
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2
cd
dc
X
X
The mean X and standard deviation X of a uniform random variable x are
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Notes on the Uniform Distribution The uniform distribution is symmetrical
Symmetrical about its center X
X is the median
The uniform distribution is rectangular For endpoints c and d (c < d and c ≠ d) the width of
the distribution is d – c and the height is 1/(d – c) The area under the entire uniform distribution is 1
Because width height = (d – c) [1/(d – c)] = 1
So P(c x d) = 1
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Example 5.1: Uniform Waiting Time #1 The amount of time, x, that a randomly selected
hotel patron spends waiting for the elevator at dinnertime.
Record suggests x is uniformly distributed between zero and four minutes So c = 0 and d = 4,
x =x
otherwise0
40for4
1
04
1
f
404
ababbxaP
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Example 5.1: Uniform Waiting Time #2 What is the probability that a randomly selected hotel
patron waits at least 2.5 minutes for the elevator?
The probability is the area under the uniform distribution in the interval [2.5, 4] minutes
The probability is the area of a rectangle with height ¼ and base 4 – 2.5 = 1.5
P(x ≥ 2.5) = P(2.5 ≤ x ≤ 4) = ¼ 1.5 = 0.375
What is the probability that a randomly selected hotel patron waits less than one minutes for the elevator? P(x ≤ 1) = P(0 ≤ x ≤ 1) = ¼ 1 = 0.25
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Example 5.1: Uniform Waiting Time #4 Expect to wait the mean time X
with a standard deviation X of
minutes 22
40
X
minutes 1.154712
04
X
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5.3 The Normal Distribution
The normal probability distribution is defined by the equation
for all values x on the real number line, where
is the mean and is the standard deviation, = 3.14159,e = 2.71828 is the base of natural logarithms
2
1=)f(
2
2
1
eπσ
x
x
xx
ff((xx))
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The normal curve is symmetrical and bell-shaped• The normal is symmetrical
about its meanμ• The mean is in the
middle under the curve• So is also the median
• The normal is tallest over its mean
• The area under the entire normal curve is 1• The area under either
half of the curve is 0.5
5.3 The Normal Distribution
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Properties of the Normal Distribution There is an infinite number of possible normal curves
The particular shape of any individual normal depends on its specific mean and standard deviation
The tails of the normal extend to infinity in both directions The tails get closer to the horizontal axis but never touch
it mean = median = mode
The left and right halves of the curve are mirror images of each other
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The Position and Shape of the Normal Curve
(a) The mean positions the peak of the normal curve over the real axis
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(b) The variance 2 measures the width or spread of the normal curve
The Position and Shape of the Normal Curve
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Normal ProbabilitiesSuppose x is a normally distributed random variable with mean and standard deviation
The probability that x could take any value in the range between two given values a and b (a < b) is P(a ≤ x ≤ b)
P(a ≤ x ≤ b) is the area colored in blue under the normal curve and between the valuesx = a and x = b
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Three Important Areas under the Normal Curve
1. P ( – ≤ x ≤ + ) = 0.6826 So 68.26% of all possible observed values of x are
within (plus or minus) one standard deviation of
2. P ( – 2 ≤ x ≤ + 2) = 0.9544 So 95.44% of all possible observed values of x are
within (plus or minus) two standard deviations of
3. P ( – 3 ≤ x ≤ + 3) = 0.9973 So 99.73% of all possible observed values of x are
within (plus or minus) three standard deviations of
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Three Important Areasunder the Normal Curve (Visually)
The Empirical Rule for Normal Populations
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The Standard Normal Distribution
If x is normally distributed with mean and standard deviation , then the random variable z
is normally distributed with mean 0 and standard deviation 1; this normal is called the standard normal distribution.
x
z
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The Standard Normal Distribution z measures the number of standard deviations that x is from the mean • The algebraic sign on z indicates on which side of m is x• z is positive if x > m (x is to the right of m on the number line)• z is negative if x < m (x is to the left of m on the number line)
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The Standard Normal Table The standard normal table is a table that
lists the area under the standard normal curve to the right of the mean (z = 0) up to the z value of interest See Table 5.1 (p.203) Also see Table A.3 (p.824) in Appendix A and
the table on the back of the front cover This table is so important that it is repeated 3
times in the textbook! Always look at the accompanying figure for
guidance on how to use the table
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The Standard Normal Table The values of z (accurate to the nearest
tenth) in the table range from 0.00 to 3.09 in increments of 0.01
The areas under the normal curve to the right of the mean up to any value of z are given in the body of the table
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The Standardized Normal Table The Standardized Normal table in the textbook gives the probability from 0 to Z
P(0<Z < 2.00) = 0.4772, P(0<Z<1.96)=0.4750
Z0 2.00
0.4772
.4772
The column shows the value of Z to the first decimal point
The row gives the value of Z to the second decimal point
2.0
.
.1.9.
Z 0.00 0.01 0.02 …
0.0
0.1
0.06
0.4750
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The Standard Normal Table Example Find P (0 ≤ z ≤ 2)
Find the area listed in the table corresponding to a z value of 2.00
Starting from the top of the far left column, go down to “2.0”
Read across the row z = 2.0 until under the column headed by “.00”
The area is in the cell that is the intersection of this row with this column
As listed in the table, the area is 0.4772, so
P (0 ≤ z ≤ 2) = 0.4772
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Some Areas under the Standard Normal Curve
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Calculating P (-2.53 ≤ z ≤ 2.53) First, find P(0 ≤ z ≤ 2.53)
Go to the table of areas under the standard normal curve
Go down left-most column for z = 2.5 Go across the row 2.5 to the column headed
by .03 The area to the right of the mean up to a value of
z = 2.53 is the value contained in the cell that is the intersection of the 2.5 row and the .03 column
The table value for the area is 0.4943
Continued
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Calculating P (-2.53 ≤ z ≤ 2.53) From last slide, P (0 ≤ z ≤ 2.53)=0.4943 By symmetry of the normal curve, this is also
the area to the LEFT of the mean down to a value of z = –2.53 Then P (-2.53 ≤ z ≤ 2.53) = 0.4943 + 0.4943 = 0.9886
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Calculating P (z -1)An example of finding the area under the standard normal curve to the right of a negative z value• Shown is finding the under the standard normal
for z ≥ -1
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Calculating P(z 1)
An example of finding tail
areas• Shown is finding the right-
hand tail area for z ≥ 1.00• Equivalent to the left-
hand tail area for z ≤ -
1.00
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Finding Normal ProbabilitiesGeneral procedure:
1. Formulate the problem in terms of x values
2. Calculate the corresponding z values, and restate the problem in terms of these z values
3. Find the required areas under the standard normal curve by using the table
Note: It is always useful to draw a picture showing the required areas before using the normal table
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Example 5.2: The Car Mileage Case #1
Want the probability that the mileage of a randomly selected midsize car will be between 32 and 35 mpg
• Let x be the random variable of mileage of midsize cars, in mpg
• Want P (32 ≤ x ≤ 35 mpg)
Given: x is normally distributed
= 33 mpg
= 0.7 mpg
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Example 5.2: The Car Mileage Case #2
Procedure (from previous slide):
1. Formulate the problem in terms of x (as above)
2. Restate in terms of corresponding z values (see next slide)
3. Find the indicated area under the standard normal curve using the normaltable (see the slide after that)
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Example 5.2: The Car Mileage Case #3
43107
1
70
3332.
..
xz
For x = 32 mpg, the corresponding z value is
(so the mileage of 32 mpg is 1.43 standard deviations below (to the left of) the mean = 32 mpg)
For x = 35 mpg, the corresponding z value is
(so the mileage of 35 mpg is 2.86 standard deviations above (to the right of) the mean = 32 mpg)
Then P(32 ≤ x ≤ 35 mpg) = P(-1.43 ≤ z ≤ 2.86)
86207
2
70
3335.
..
xz
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Example 5.2: The Car Mileage Case #4
Want: the area under the normal curve between 32 and 35 mpg
Will find: the area under the standard normal curve between -1.43 and 2.86 Refer to Figure 5.16 on the second slide
Continued
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Example 5.2: The Car Mileage Case #5 Break this into two pieces, around the mean
The area to the left of between -1.43 and 0 By symmetry, this is the same as the area
between 0 and 1.43 From the standard normal table, this area is
0.4236 The area to the right of between 0 and 2.86
From the standard normal table, this area is 0.4979
The total area of both pieces is 0.4236 + 0.4979 = 0.9215
Then, P(-1.43 ≤ z ≤ 2.86) = 0.9215 Returning to x, P(32 ≤ x ≤ 35 mpg) = 0.9215
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Finding Z Points ona Standard Normal Curve
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z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .4332 .4345 .4357 .4370 .4382 .4394 .4406 .4418 .4429 .4441
1.6 .4452 .4463 .4474 .4484 .4495 .4505 .4515 .4525 .4535 .4545
1.7 .4554 .4564 .4573 .4582 .4591 .4599 .4608 .4616 .4625 .4633
1.8 .4641 .4649 .4656 .4664 .4671 .4678 .4686 .4693 .4699 .4706
1.9 .4713 .4719 .4726 .4732 .4738 .4744 .4750 .4756 .4761 .4767
. . . . . . . . . . .
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .4332 .4345 .4357 .4370 .4382 .4394 .4406 .4418 .4429 .4441
1.6 .4452 .4463 .4474 .4484 .4495 .4505 .4515 .4525 .4535 .4545
1.7 .4554 .4564 .4573 .4582 .4591 .4599 .4608 .4616 .4625 .4633
1.8 .4641 .4649 .4656 .4664 .4671 .4678 .4686 .4693 .4699 .4706
1.9 .4713 .4719 .4726 .4732 .4738 .4744 .4750 .4756 .4761 .4767
. . . . . . . . . . .
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Finding Z Points on a Normal CurveExample 5.5 Stocking out of inventory
A large discount store sells blank VHS tapes want to know how many blank VHS tapes to stock (at the beginning of the week) so that there is only a 5 percent chance of stocking out during the week
• Let x be the random variable of weekly demand
• Let s be the number of tapes so that there is only a 5% probability that weekly demand will exceed s
• Want the value of s so that P(x ≥ s) = 0.05
Given: x is normally distributed
= 100 tapes
= 10 tapes
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Example 5.5 #1
• Refer to Figure 5.20 in the textbook
• In panel (a), s is located on the horizontal axis under the right-tail of the normal curve having mean = 100 and standard deviation = 10
• The z value corresponding to s is
• In panel (b), the right-tail area is 0.05, so the area under the standard normal curve to the right of the mean z = 0 is 0.5 – 0.05 = 0.45
10
100
stst
z
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Example 5.5 #2 Use the standard normal table to find the z value
associated with a table entry of 0.45 But do not find 0.45; instead find values that bracket 0.45 For a table entry of 0.4495, z = 1.64 For a table entry of 0.4505, z = 1.65 For an area of 0.45, use the z value midway between these So z = 1.645
645110
100.
st
Solving for s gives s = 100 + (1.645 10) = 116.45Rounding up, 117 tapes should be stocked so that the probability of running out will not be more than 5 percent
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z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .4332 .4345 .4357 .4370 .4382 .4394 .4406 .4418 .4429 .4441
1.6 .4452 .4463 .4474 .4484 .4495 .4505 .4515 .4525 .4535 .4545
1.7 .4554 .4564 .4573 .4582 .4591 .4599 .4608 .4616 .4625 .4633
1.8 .4641 .4649 .4656 .4664 .4671 .4678 .4686 .4693 .4699 .4706
1.9 .4713 .4719 .4726 .4732 .4738 .4744 .4750 .4756 .4761 .4767
. . . . . . . . . . .
z .00 .01 .02 .03 .04 .05 .06 .07 .08 .09
. . . . . . . . . . .
1.5 .4332 .4345 .4357 .4370 .4382 .4394 .4406 .4418 .4429 .4441
1.6 .4452 .4463 .4474 .4484 .4495 .4505 .4515 .4525 .4535 .4545
1.7 .4554 .4564 .4573 .4582 .4591 .4599 .4608 .4616 .4625 .4633
1.8 .4641 .4649 .4656 .4664 .4671 .4678 .4686 .4693 .4699 .4706
1.9 .4713 .4719 .4726 .4732 .4738 .4744 .4750 .4756 .4761 .4767
. . . . . . . . . . .
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Finding Z Points on a Normal Curve
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Finding a Tolerance IntervalFinding a tolerance interval [ k] that contains 99% of the measurements in a normal population
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Normal Approximation to the Binomial
• The figure below shows several binomial distributions
• Can see that as n gets larger and as p gets closer to 0.5, the graph of the binomial distribution tends to have the symmetrical, bell-shaped, form of the normal curve
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Normal Approximation to the Binomial
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• Generalize observation from last slide for large p
• Suppose x is a binomial random variable, where n is the number of trials, each having a probability of success p
• Then the probability of failure is 1 – p
• If n and p are such that np 5 and n(1 – p) 5, then x is approximately normal with
pnpnp 1 and
Normal Approximation to the Binomial Continued
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• Suppose there is a binomial variable x with n = 50 and p = 0.5
• Want the probability of x = 23 successes in the n = 50 trials
• Want P(x = 23)
• Approximating by using the normal curve with
53553500500501
2550050
...pnp
.np
Example 5.8:Normal Approximation to a Binomial #1
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Example 5.8:Normal Approximation to a Binomial #2
• With continuity correction, find the normal probability P(22.5 ≤ x ≤ 23.5)
• See figure below
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For x = 22.5, the corresponding z value is
For x = 23.5, the corresponding z value is
Then P(22.5 ≤ x ≤ 23.5) = P(-0.71 ≤ z ≤ -0.42) = 0.2611 – 0.1628 = 0.0983
Therefore the estimate of the binomial probability P(x = 23) is 0.0983
71053553
25522.
.
.xz
42053553
25523.
.
.xz
Example 5.8: Normal Approximation to a Binomial #3