Show that if X has density function f. then E [ g ( X ) ] = ∫ − ∞ ∞ g ( x ) f ( x ) d x Hint: Using Theoretical Exercise 5.2, start with E [ g ( X ) ] = ∫ 0 ∞ P { g ( x ) > y } d y − ∫ 0 ∞ P { g ( x ) < − y } d y and then proceed as in the proof given in the text when g ( x ) > 0 .
Show that if X has density function f. then E [ g ( X ) ] = ∫ − ∞ ∞ g ( x ) f ( x ) d x Hint: Using Theoretical Exercise 5.2, start with E [ g ( X ) ] = ∫ 0 ∞ P { g ( x ) > y } d y − ∫ 0 ∞ P { g ( x ) < − y } d y and then proceed as in the proof given in the text when g ( x ) > 0 .
Solution Summary: The author explains that E[g(X)] can be written as follows.
Show that if X has density function f. then
E
[
g
(
X
)
]
=
∫
−
∞
∞
g
(
x
)
f
(
x
)
d
x
Hint: Using Theoretical Exercise 5.2, start with
E
[
g
(
X
)
]
=
∫
0
∞
P
{
g
(
x
)
>
y
}
d
y
−
∫
0
∞
P
{
g
(
x
)
<
−
y
}
d
y
and then proceed as in the proof given in the text when
g
(
x
)
>
0
.
Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.
Q prove or disprove: If Ely/x) = x = c(dipy
=BCCo
(BVC)
ECxly)=y, and E(X2), Ely)
In a small office, there are m = 5 typists who need to use a single typewriter to complete their reports. Assume the time
each typist takes to prepare a report follows an exponential distribution with an average of 20 minutes per preparation
(A = 3 reports/hour), and the service time for the typewriter to type out a report also follows an exponential distribution,
averaging 30 minutes to complete a report (μ 2 reports/hour). Given that the number of typists is finite and all typists
=
share one typewriter, they will form a waiting queue.
(1). Describe this queuing system and explain how it fits the characteristics of the M/M/1/∞0/m model.
(2). Calculate the probability that any typist is using the typewriter at steady-state.
(3). Calculate the average number of typists waiting in the queue at steady-state.
(4). Considering the need to reduce waiting time, if an additional typewriter is introduced (turning into a two-server
system, or M/M/2/∞0/m model), analyze the expected impact,…
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