Ch 7 Q1 In the last quarter of 2007, a group of 64 mutual funds had a mean return of 2.4% with a standard deviation of...
Ch 7 Q1
In the last quarter of 2007, a group of 64 mutual funds had a mean return of 2.4% with a standard deviation of 5.5%. If a normal model can be used to model them, what percent of the funds would you expect to be in each region? Use the 68-95-99.7 rule to approximate the probabilities rather than using technology to find the values more precisely. Be sure to draw a picture first.
|
a) Returns of −14.1% or less |
b) Returns of 2.4% or more |
|
c) Returns between −3.1% and 7.9% |
d) Returns of more than 13.4% |
a) The expected percentage of returns that are −14.1% or less is _________________
(Type an integer or a decimal.)
b) The expected percentage of returns that are 2.4% or more is __________________
(Type an integer or a decimal.)
c) The expected percentage of returns that are between −3.1% and 7.9% is ______________
(Type an integer or a decimal.)
d) The expected percentage of returns that are 13.4% or more is ___________________
(Type an integer or a decimal.)
Please show all of the math. It won't help me if you don't show the work.
Thank you!
Homework Answers
Answer)
According to 68-95-99.7 rule
Approximately, 68% of the data lies within 1 standard deviation.
And 95% of the data lies with in 2 standard deviation.
And 99.7% of the data lies with in 3 standard deviation.
Mean = 2.4%
Standard deviation = 5.5%
So, 68% lies between (2.4-5.5) and (2.4+5.5)
Between -3.1 and 7.9
95% lies in between (2.4 - (2*5.5)) and (2.4+(2*5.5))
Between -8.6 and 13.4
99.7% lies in between (2.4 - (3*5.5)) and (2.4+(3*5.5))
Between -14.1 and 18.9
A)
P(14% or less)
99.7% lies in between -14.1 and 18.8
And 0.03 left
Out of which 0.015 lies on both sides, above 18.8 and below -14.1
Therefore
P(14% or less) = 0.015%
B)
P(2.4% or more) = as the normal model is symmetrical in nature
Therefore on both the sides of the mean, there would be 50%
So, above 2.4%, there is 50%
So, P(2.4% or more) = 50%
C)
Between (-3.1 and 7.9)
= 68% (explaned aboved)
D) 13.4% or more
95% of the data lies in between -8.6 and 13.4
Therefore, above 13.4%
There would be 0.025%
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