Let the random variable X follow a normal distribution with a mean of μ and a...
Let the random variable X follow a normal distribution with a mean of μ and a standard deviation of σ. Let X 1 be the mean of a sample of 36 observations randomly chosen from this population, and X 2 be the mean of a sample of 25 observations randomly chosen from the same population.
a) How are X 1 and X 2 distributed? Write down the form of the density function and the corresponding parameters.
b) Evaluate the statement:
P(μ - 0.2σ <X 1 < μ + 0.2σ) < P(μ - 0.2σ <X 2 < μ + 0.2σ) as to whether it is true or false.
Homework Answers
1)X1 follows normal distribution with mean 
and standard deviation of 
X2 follows normal distribution with mean
and standard deviation of 
2)The statement is false because the probability is greater for X1 than for X2.
The first probability reduces to
P(-1.2<Z<1.2)=P(Z<1.2)-P(Z<-1.2)=P(Z<1.2)-{1-P(Z<1.2)}=0.7699
Similarly, the second one reduces to
P(-1<Z<1) and preceding the same way as before we get the probability as 0.6827
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