
Let
The expected value (Mean) of
is given by

Hence 
The variance of
is

Given that
The mean of
is

The variance of
is

The standard deviation of
is

Using CLT, we know that
has a normal distribution with mean
and standard deviation
The probability using CLT, without using the correction factor is

The probability using CLT, with correction factor is

Each of Xs have 1 success, and hence can see that there are 16
successes in
. That is
is the number of trials required to get 16 successes, with
probability of success on any given trial p=0.5.
We can say that
has negative binomial distribution with parameters, number of
successes =16 and the probability of success p=0.5
The pmf of
is

The exact probability is

The CLT estimate with the correction is 0.0918 and without the correction is 0.0793.
Hence we can say that the CLT underestimates the exact probability.
Find the mean of S16. Find the standard deviation of S16. (Round it to one decimal...
Find the mean of S16.
Find the standard deviation of S16. (Round it to one
decimal place)
Find P(S16 > 40) using CLT, without correction
factor. (Round it to 4 decimal places)
Find P(S16 > 40) using CLT, with correction
factor. (Round it to 4 decimal places
FIND p0=exact = P(S16 > 40). Note This is
negative binomial with number of successes = n. Do not use
Mathematica. It gives different answer because its definition of
Negative Binomial is slightly...
Find exact value p0 = P(S16 = 16). (round
your answer to four decimal places).
Use CLT to approximate p0. Assume the answer is
equal to p1 (round your answer to four decimal
places).
Is p1 an over estimate or underestimate or equal up to 4
decimal places?
Let S16-Σ Xi where {X1, X2, , X16} iid Poisson each with mean 1
Let S16-Σ Xi where {X1, X2, , X16} iid Poisson each with mean 1
S16 = sigma Xi where (X1,X2 ... X16) iid geometric each with mean 2 Find mean of S16: Find standard deviation of S16: Find P(S16 > 40) using Central Limit Theorem, without correction factor: Find P(S16 > 40) using Central Limit Theorem, with correction factor: Find p0 = exact = P(S16 > 40)
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Assume that x has a normal distribution with the specified mean and standard deviation. Find the indicated probability. (Round your answer to four decimal places.) μ = 49; σ = 15 P(40 ≤ x ≤ 47) =
X has a normal distribution with the given mean and standard deviation. Find the indicated probability. (Round your answer to four decimal places.) μ = 40, σ = 20, find P(32 ≤ X ≤ 42)
1. X has a normal distribution with the given mean and standard deviation. Find the indicated probability. (Round your answer to four decimal places.) μ = 41, σ = 20, find P(35 ≤ X ≤ 42) 2. Find the probability that a normal variable takes on values within 0.9 standard deviations of its mean. (Round your decimal to four decimal places.) 3. Suppose X is a normal random variable with mean μ = 100 and standard deviation σ = 10....
Consider a normal distribution with mean 25 and standard
deviation 5. What is the probability a value selected at random
from this distribution is greater than 25? (Round your answer to
two decimal places.)
Assume that x has a normal distribution with the specified
mean and standard deviation. Find the indicated probability. (Round
your answer to four decimal places.)
μ = 14.9; σ = 3.5
P(10 ≤ x ≤ 26) =
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Assume that x has a...
Let X be normally distributed with mean μ = 2.4 and standard deviation σ = 1.6. a. Find P(X > 6.5). (Round "z" value to 2 decimal places and final answer to 4 decimal places. b. Find P(5.5 ≤ X ≤ 7.5). (Round "z" value to 2 decimal places and final answer to 4 decimal places.) c. Find x such that P(X > x) = 0.0869. (Round "z" value and final answer to 3 decimal places.) d. Find x such...
Let μ=E(X), σ=stanard deviation of X. Find the probability P(μ-σ ≤ X ≤ μ+σ) if X has... (Round all your answers to 4 decimal places.) a. ... a Binomial distribution with n=23 and p=1/10 b. ... a Geometric distribution with p = 0.19. c. ... a Poisson distribution with λ = 6.8.