Mathematical Statistics Lecture 01 Prof. Dr. M. Junaid Mughal.
STATISTICS and...
Transcript of STATISTICS and...
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Atatürk University
Introduction to Statistics
Prof. Dr. İrfan KAYMAZ
STATISTICS and PROBABILITY
Atatürk UniversityEngineering Faculty
Department of Mechanical Engineering
LECTURE: JOINT PROBABILITY DISTRIBUTIONS
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Joint Probability
Use joint probability mass functions and joint probability density functions to calculate probabilities.
Calculate marginal and conditional probability distributions from joint probability distributions.
Interpret and calculate covariances and correlations between random variables.
objectives of this lecture
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Joint Probability
Some random variables are not independent of each other, i.e., they tend to be related. Urban atmospheric ozone and airborne particulate matter
tend to vary together. Urban vehicle speeds and fuel consumption rates tend to
vary inversely.
The length (X) of a injection-molded part might not be independent of the width (Y). Individual parts will vary due to random variation in materials and pressure.
A joint probability distribution will describe the behavior of several random variables, say, X and Y. The graph of the distribution is 3-dimensional: x, y, and f(x,y).
objectives of this lecture
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Joint ProbabilityExample: Signal BarsYou use your cell phone to check your airline reservation. The airline system
requires that you speak the name of your departure city to the voice recognition system.
• Let Y denote the number of times that you have to state your departure city.
• Let X denote the number of bars of signal strength on you cell phone.
Figure : Joint probability distribution of X and Y. The table cells are the probabilities. Observe that more bars relate to less repeating.
Once
Twice3 Times
4 Times
0.00
0.05
0.10
0.15
0.20
0.25
12
3
Pro
bab
ility
Cell Phone Bars
Bar Chart of Number of Repeats vs. Cell
Phone Bars1 2 3
1 0.01 0.02 0.25
2 0.02 0.03 0.20
3 0.02 0.10 0.05
4 0.15 0.10 0.05
x = number of bars
of signal strength
y = number of
times city
name is stated
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Joint ProbabilityJoint Probability Density Function Defined
Figure: Joint probability density function for the random variables Xand Y. Probability that (X, Y) is in the region R is determined by the volume of fXY(x,y) over the region R.
The joint probability density function for the continuous random variables X and Y, denotes as fXY(x,y), satisfies the following properties:
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Joint ProbabilityJoint Probability Mass Function Graph
Figure :Joint probability density function for the continuous random variables X and Y of different dimensions of an injection-molded part. Note the asymmetric, narrow ridge shape of the PDF – indicating that small values in the X dimension are more likely to occur when small values in the Y dimension occur.
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Joint ProbabilityExample: Server Access Time-1
Let the random variable X denote the time (msec’s) until a computerserver connects to your machine. Let Y denote the time until theserver authorizes you as a valid user. X and Y measure the wait from acommon starting point (x < y).
Figure: The joint probability density function of X and Y is nonzero over the shaded region where x < y.
0.001 0.002 6, for 0 and 6 10x y
XYf x y ke x y k
Compute the probability that X<1000 and Y<2000
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Joint ProbabilityExample: Server Access Time-2
We verify that it integrates to 1 as follows:
0.001 0.002 0.002 0.001
0 0
0.0020.001 0.003
0 0
,
0.0030.002
10.003 1
0.003
x y y x
XY
x x
xx x
f x y dxdy ke dy dx k e dy e dx
ek e dx e dx
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Joint ProbabilityExample: Server Access Time-3
Now calculate a probability:
Figure:Region of integration for the probability that X < 1000 and Y < 2000 is darkly shaded.
1000 2000
1000 2000
0.002 0.001
0
1000 0.002 40.001
0
1000
0.003 4 0.001
0
3 14
1000, 2000 ,
0.002
0.003
1 10.003
0.003 0.001
XY
x
y x
x
xx
x x
P X Y f x y dxdy
k e dy e dx
e ek e dx
e e e dx
e ee
0.003 316.738 11.578 0.915
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Joint ProbabilityMarginal Probability Distributions (continuous)
The marginal PDFs are used to makeprobability statements about one variable.
If the joint probability density function ofrandom variables X and Y is fXY(x,y), themarginal probability density functions of Xand Y are:
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Joint ProbabilityExample: a simple function
Find the marginal distribution function for X and Y
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Joint ProbabilityExample: a simple function
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Joint ProbabilityExample: Server Access Time-1
For the random variables times in the previousexample, find the probability that Y exceeds 2000.
Integrate the joint PDF directly using the picture todetermine the limits.
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Joint ProbabilityExample: Server Access Time-2
2000
0 2000 2000
2000 , ,
Dark region left dark region right dark region
XY XY
x
P Y f x y dy dx f x y dy dx
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Joint ProbabilityExample: Server Access Time-3
Alternatively, find the marginal PDF and then integrate that to find the desired probability.
0.001 0.002
0
0.002 0.001
0
0.0010.002
0
0.0010.002
3 0.002 0.001
0.001
1
0.001
6 10 1 for 0
y
x y
Y
y
y x
yx
y
yy
y y
f y ke
ke e dx
eke
eke
e e y
2000
3 0.002 0.001
2000
0.002 0.0033
2000 2000
4 63
2000
6 10 1
6 100.002 0.003
6 10 0.050.002 0.003
Y
y y
y y
P Y f y dy
e e dy
e e
e e
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Joint ProbabilityConditional Probability Density Function Defined
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Joint ProbabilityExample: a simple function
Find the conditional distribution function X given Y
Find the probability that X<1 given that y=1/2
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Joint ProbabilityAnswer to a simple function
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Joint ProbabilityExample: a simple function
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Joint ProbabilityExample: Conditional Probability-1
From Example 5-2, determine the conditional PDF for Y given X=x.
0.001 0.002
0.0020.001
0.0020.001
0.003
0.001 0.002
0.003
0.002 0.002
0.002
0.002
0.003 for 0
,
0.003
0.002 for 0
x y
X
x
yx
x
x
x
x yXY
Y x x
X
x y
f x k e dy
eke
eke
e x
f x y kef y
ef x
e x y
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Joint ProbabilityExample 5-6: Conditional Probability-2
Now find the probability that Y exceeds 2000 given that X=1500:
1500
2000
0.002 1500 0.002
2000
0.0023
2000
43 1
2000 1500
0.002
0.0020.002
0.002 0.3680.002
Y
y
y
P Y X
f y dy
e
ee
ee e
Figure : The conditional PDF is nonzero on the solid line in the shaded region.
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Joint ProbabilityMean & Variance of Conditional Random Variables
The conditional mean of Y given X = x, denoted as E(Y|x) or μY|x is:
The conditional variance of Y given X = x, denoted as V(Y|x) or σ2
Y|x is:
2
2 2
Y x Y x Y x Y x
y y
V Y x y f y dy y f y
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Joint ProbabilityExample: Conditional Mean & Variance
From Example 5-2 & 6, what is the conditional mean for Y given that x = 1500? Integrate by parts.
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Joint ProbabilityCovariance
Covariance is a measure of the relationship between two random variables.
First, we need to describe the expected value of a function of two random variables. Let h(X, Y) denote the function of interest.
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Joint ProbabilityCovariance Defined
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Joint ProbabilityCovariance Defined
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Joint ProbabilityExample
Find the covariance of X and Y
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Joint ProbabilityAnswer to Example
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Joint ProbabilityCovariance and Scatter Patterns
Figure: Joint probability distributions and the sign of cov(X, Y). Note that covariance is a measure of linear relationship. Variables with non-zero covariance are correlated.
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Joint ProbabilityCorrelation (ρ = rho)
The between random variables X and Y,
denoted as , is
cov , (5-15)
Since 0 and 0,
and cov , have the same sign.
We say that
correlation
XY
XYXY
X Y
X Y
XY
XY
X Y
V X V Y
X Y
is normalized, so 1 1 (5-16)
Note that is dimensionless.
Variables with non-zero correlation are correlated.
XY
XY
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Joint ProbabilityIndependence Implies ρ = 0
If X and Y are independent random variables,
σXY = ρXY = 0
ρXY = 0 is necessary, but not a sufficient condition for independence.
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Joint ProbabilityNext Lecture
Point Estimation….