Key to "1. Going forward, let’s define as the average..."

BenoguigoliB

Answered question

2021-02-06

1. Going forward, let’s define as the average number of dots after forty rolls.
What is the expected value of x?
The standard deviation of x is 2.197. What is the standard error of x?
2. What is the probability of obtaining an average that is less than 4.25?

n = 40

σ = 2.197

Answer & Explanation

SoosteethicU

Skilled2021-02-07Added 102 answers

For ques 2, mean is not given so we could not find the probability. I have provided the formula. You need to put the mean and find the probability of P(Z<z) using Normal Distrbution table.
Expected value of average
$E (\overset{―}{X}) = E (\sum \frac{X_{i}}{n}) = \frac{1}{n} \times n \times E (X) = E (X)$
$V (\overset{―}{X}) = V (\sum \frac{X_{i}}{n}) = \frac{1}{n^{2}} \times n \times V (X) = V \frac{X}{n}$
Standart error of x
$σ_{x} = \sqrt{V} \frac{X}{n} = \frac{σ_{x}}{\sqrt{n}}$
$σ_{x} = \frac{2.197}{\sqrt{40}} = 0.347$
Probability of obtaining an average that is less than 4.25
Z-score is
$Z = \overset{―}{x} - \frac{μ}{σ} / \sqrt{n} = 4.25 - \frac{μ}{2.197} / \sqrt{40}$

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