Statistics in math?

2 ANSWERS

1. 
   

   for any discrete random variable the expectation is:
   
   E(X) = μ = ∑x * P(X = x)
   
   the variance of a discrete random variable is:
   
   Var(X) = σ² = ∑(x - μ)² * P(X = x) = {∑x² * P(X = x) }- μ²
   
   the standard deviation is just the square root of the variance.
   
   Let X be the investment worth.  The mean is:
   
   E(X) = 1000 * 0.25 + 2000 * 0.60 + 5000 * 0.15 = 2200
   
   the variance is:
   
   Var(X) = 1000^2 * 0.25 + 2000^2 * 0.60 + 5000^2 * 0.15 - 2200^2
   
   Var(X) = 1560000

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2. 
   

   Let X be a random variable denoting the value of the investment at the end of the year.
   
   E[X]=1000(.25) + 2000(.60) + 5000(.15)
   
   =2,200
   
   E[X^2]=(1000^2)(.25) + (2000^2)(.60) + (5000^2)(.15)
   
   =6,400,000
   
   Var[X]=E[X^2]-E[X]^2
   
   =6,400,000 -2,200^2
   
   =1,560,000
   
   Thus the mean is $2200 and the variance is 1,560,000

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