Question

In: Math

Let ? ∈ {1, 2} and ? ∈ {3, 4} be independent random variables with PMF-s:...

Let ? ∈ {1, 2} and ? ∈ {3, 4} be independent random variables with PMF-s: ??(1)= 1/2 ??(2)= 1/2 ??(3)= 1/3 ??(4)= 2/3

Answer the following questions

(a) Write down the joint PMF

(b) Calculate?(?+?≤5)and?(? −?≥2) 2 ?2+1

(c) Calculate ?(?? ), ?(? ? ), E ? −2
(d) Calculate the C??(?, ? ), C??(1 − ?, 3? + 2) and V??(2? − ? )

(?*) Calculate C??(??, ?), C??(??, ? + ? ) and V?? ?

Solutions

Expert Solution

milcah answered 1 year ago
Next > < Previous

Related Solutions

Let ? ∈ {1, 2} and ? ∈ {3, 4} be independent random variables with PMF-s:...
Let ? ∈ {1, 2} and ? ∈ {3, 4} be independent random variables with PMF-s: ?x(1)= 1/2 ?x(2)= 1/2 ?Y(3)= 1/3 ?Y(4)= 2/3 (a) Write down the joint PMF (b) Calculate ?(? + ? ≤ 5) and ? (? − ? ≥ 2) (c) Calculate ?(?? ), ?(?2? ),Calculate E((X2+1)/(Y-2)) (d) Calculate the C??(?, ? ), C??(1 − ?, 3? + 2) and V??(2? − ? ) (e) Calculate C??(??, ?), C??(??, ? + ? ) and V?? (?/Y)
Let X ∈{1,2} and Y ∈{3,4} be independent random variables with PMF-s: fX(1) = 1 2...
Let X ∈{1,2} and Y ∈{3,4} be independent random variables with PMF-s: fX(1) = 1 2 fX(2) = 1 2 fY (3) = 1 3 fY (4) = 2 3 Answer the following questions (a) Write down the joint PMF (b) Calculate P(X + Y 6 5) and P(Y −X > 2) (c) Calculate E(XY ), E(X2Y ), E(︁X2+1 Y−2)︁ (d) Calculate the Cov(X,Y ), Cov(1−X,3Y + 2) and Var(2X −Y ) ( e*) Calculate Cov(XY,X), Cov(XY,X + Y )...
Let X1 and X2 be independent identically distributed random variables with pmf p(0) = 1/4, p(1)...
Let X1 and X2 be independent identically distributed random variables with pmf p(0) = 1/4, p(1) = 1/2, p(2) = 1/4 (a) What is the probability mass function (pmf) of X1 + X2? (b) What is the probability mass function (pmf) of X(2) = max{X1, X2}? (c) What is the MGF of X1? (d) What is the MGF of X1 + X2
Let X1 and X2 be independent identically distributed random variables with pmf p(0) = 1/4, p(1)...
Let X1 and X2 be independent identically distributed random variables with pmf p(0) = 1/4, p(1) = 1/2, p(2) = 1/4 (a) What is the probability mass function (pmf) of X1 + X2? (b) What is the probability mass function (pmf) of X(2) = max{X1, X2}? (c) What is the MGF of X1? (d) What is the MGF of X1 + X2? (Note: The formulas we did were for the continuous case, so they don’t directly apply here, but you...
Let ?1, ?2, ?3 be 3 independent random variables with uniform distribution on [0, 1]. Let...
Let ?1, ?2, ?3 be 3 independent random variables with uniform distribution on [0, 1]. Let ?? be the ?-th smallest among {?1, ?2, ?3}. Find the variance of ?2, and the covariance between the median ?2 and the sample mean ? = 1 3 (?1 + ?2 + ?3).
2. Let ?1, ?2, ?3 be 3 independent random variables with uniform distribution on [0, 1]....
2. Let ?1, ?2, ?3 be 3 independent random variables with uniform distribution on [0, 1]. Let ?? be the ?-th smallest among {?1, ?2, ?3}. Find the variance of ?2, and the covariance between the median ?2 and the sample mean ? = 1 3 (?1 + ?2 + ?3).
Let X and Y be independent geometric random variables with parameter p. Find the pmf of...
Let X and Y be independent geometric random variables with parameter p. Find the pmf of X + Y
Let ?1 and ?2 be independent normal random variables with ?1~ ?(µ, ? 2 ) and...
Let ?1 and ?2 be independent normal random variables with ?1~ ?(µ, ? 2 ) and ?2~ ?(µ, ? 2 ). Let ?1 = ?1 and ?2 = 2?2 − ?1. a) Find ??1,?2 (?1,?2). b) What are the means, variances, and correlation coefficient for ?1 and ?2? c) Find ?2(?2).
Let ?1 , ?2 , ... , ?? be independent, identically distributed random variables with p.d.f....
Let ?1 , ?2 , ... , ?? be independent, identically distributed random variables with p.d.f. ?(?) = ???−1, 0 ≤ ? ≤ 1 . c) Show that the maximum likelihood estimator for ? is biased, and find a function of the mle that is unbiased. (Hint: Show that the random variable −ln (??) is exponential, the sum of exponentials is Gamma, and the mean of 1/X for a gamma with parameters ? and ? is 1⁄(?(? − 1)).) d)...
1. Let X and Y be independent random variables with μX= 5, σX= 4, μY= 2,...
1. Let X and Y be independent random variables with μX= 5, σX= 4, μY= 2, and σY= 3. Find the mean and variance of X + Y. Find the mean and variance of X – Y. 2. Porcelain figurines are sold for $10 if flawless, and for $3 if there are minor cosmetic flaws. Of the figurines made by a certain company, 75% are flawless and 25% have minor cosmetic flaws. In a sample of 100 figurines that are...
ADVERTISEMENT
Subjects
ADVERTISEMENT
Latest Questions
ADVERTISEMENT