In: Math
Let x represent the dollar amount spent on supermarket impulse buying in a 10-minute (unplanned) shopping interval. Based on a certain article, the mean of the x distribution is about $49 and the estimated standard deviation is about $8.
(a) Consider a random sample of n = 60 customers, each of whom has 10 minutes of unplanned shopping time in a supermarket. From the central limit theorem, what can you say about the probability distribution of x, the average amount spent by these customers due to impulse buying? What are the mean and standard deviation of the x distribution?
The sampling distribution of x is not normal.
The sampling distribution of x is approximately normal
with mean μx = 49 and standard error
σx = $8.
The sampling distribution of x is approximately normal
with mean μx = 49 and standard error
σx = $0.13.
The sampling distribution of x is approximately normal
with mean μx = 49 and standard error
σx = $1.03.
Is it necessary to make any assumption about the x
distribution? Explain your answer.
It is not necessary to make any assumption about the x
distribution because μ is large.
It is necessary to assume that x has an approximately
normal distribution.
It is not necessary to make any assumption about the x
distribution because n is large.
It is necessary to assume that x has a large
distribution.
(b) What is the probability that x is between $47 and $51?
(Round your answer to four decimal places.)
(c) Let us assume that x has a distribution that is
approximately normal. What is the probability that x is
between $47 and $51? (Round your answer to four decimal
places.)
(d) In part (b), we used x, the average amount
spent, computed for 60 customers. In part (c), we used x,
the amount spent by only one customer. The answers to
parts (b) and (c) are very different. Why would this happen?
The sample size is smaller for the x distribution than
it is for the x distribution.
The standard deviation is smaller for the x distribution
than it is for the x
distribution.
The x distribution is approximately normal while the
x distribution is not normal.
The mean is larger for the x distribution than it is for
the x distribution.
The standard deviation is larger for the x distribution
than it is for the x distribution.
In this example, x is a much more predictable or reliable
statistic than x. Consider that almost all marketing
strategies and sales pitches are designed for the average
customer and not the individual customer. How does the
central limit theorem tell us that the average customer is much
more predictable than the individual customer?
The central limit theorem tells us that small sample sizes have
small standard deviations on average. Thus, the average customer is
more predictable than the individual customer.
The central limit theorem tells us that the standard deviation of
the sample mean is much smaller than the population standard
deviation. Thus, the average customer is more predictable than the
individual customer.
Answer:
Given data
Sample size(n)=60
mean=49
standard deviation()=8
(a) standard error σx = /n
=8/60
=1.03
μx = 49
The sampling distribution of x is approximately normal with mean μx = 49 and standard error σx = $1.03.
Therefore the "option-d" is the correct answer.
Is it necessary to make any assumption about the x distribution?
Answer: It is not necessary to make any assumption about the x distribution because n is large.
(B) ,(c) To find the probability that x is between $47 and $51:
P(47<X<51) = P((47-49)/8)<(X-mean)/ <(51-49)/8)
=P(-2/8<Z<2/8)
= p(-0.25<z<0.25)
=P ( Z<0.25 )−P (Z<−0.25 )
=0.5987−[1−P ( Z<0.25 )]
=0.5987−[1−0.5987]
= 0.5987−0.4013
=0.1974
Therefore the the probability that x is between $47 and $51 is 0.1974
(d) The standard deviation is smaller for the x distribution than it is for the x distribution.
Therefore the "option-b" is the correct answer.
In this example, x is a much more predictable or reliable statistic than x. Consider that almost all marketing strategies and sales pitches are designed for the average customer and not the individual customer. How does the central limit theorem tell us that the average customer is much more predictable than the individual customer?
Answer:
The central limit theorem tells us that the standard deviation of the sample mean is much smaller than the population standard deviation. Thus, the average customer is more predictable than the individual customer.
Therefore the "option-2" is the correct answer.