Chapter 6 Expected Value - PowerPoint PPT Presentation
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Chapter 6 Expected Value
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If X and Y are two independent variables, then E(XY)=E(X)E(Y) ... Example 6.5. Let the random variable X represent the number of defective parts for a machine when 3 parts are ... – PowerPoint PPT presentation
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Title: Chapter 6 Expected Value
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Chapter 6 Expected Value (???)
- The expected value, or mean, of a random variable
is a measure of the central location for the
random variable. - Let X be a random variable with probability
distribution f(x). The mean or expected value of
X is
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Example 6.1
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Example 6.2
- Find the expected value of the density function
- Solution
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Definition
- Let X be a random variable with probability
distribution f(x). The mean or expected value of
the random variable g(X) is
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Note
- E(XY)E(X) E(Y)
- E(aXb)aE(X)b, where a,b is a constant.
- E(aX)aE(X)
- E(b)b
- If X and Y are two independent variables, then
E(XY)E(X)E(Y)
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Example 6.3
- Suppose that the number of cars, X, that pass
through a car wash between 400pm and 500pm on
any sunny Friday has the following probability
distribution - Let g(x)2x-1 represent the amount of money paid
to the attendant. Find the expected earning of
the attendant.
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Solution 6.3
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Definition
- Let X and Y be the random variables with joint
probability distribution f(x,y). The mean or
expected value of the random variable g(X,Y) is
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Example 6.4
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Note
- If g(X,Y)X, then we have
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Note
- Similarly g(X,Y)Y, we have
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Variance and Covariance
- When g(X)(x-m)2, the expected value Eg(X) is
referred to as the variance of the random
variable X. Is denote by Var(X) or s 2. - The positive square root of the variance, s, is
called standard deviation of X.
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Definition
- Let X be a random variable with probability
distribution f(x) and mean m. The variance of X
is
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Example 6.5
- Let the random variable X represent the number of
defective parts for a machine when 3 parts are
sampled from a production line and tested. The
probability distribution is - Find s2.
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Solution 6.5
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Theorem
- The variance of a random variable X is given by
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Example 6.6
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Note
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Definition
- Let X and Y be the random variables with joint
probability distribution f(x,y). The covariance
of X and Y is
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Theorem
- The covariance of two random variables X and Y
with means mX and mY, respectively, is given by
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Proof
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Example 6.7
- The fraction X of male and the fraction Y of
female numbers who complete marathon is described
by the joint density function - Find the covariance of X and Y.
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Solution 6.7
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Note
