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6. Suppose that a random variable X can take each of the five values -2, -1,...
1. Suppose that X and Y are random variables that can only take values in the intervals 0 X 2 and...
1. Suppose that X and Y are random variables that can only take values in the intervals 0 X 2 and 0 Y 3 2. Suppose also that the joint cumulative distribution function (cdf) of X and Y, for 0 < 2 and 03 y 3 2, is as follows: Fy). 16 [5] (a) Determine the marginal cdf Fx(x) of X and the marginal cdf Fy () of Y [5] (b) Determine the joint probability density function (pdf) f(x, y)...
X is a Discrete Random Variable that can take five values Given The five possible values...
X is a Discrete Random Variable that can take five values Given The five possible values are: x1 = 4 (Units not given) X2 = 6 (Units not given) X3 = 9 (Units not given) X4 = 12 (Units not given) X5 = 15 (Units not given) The associated probabilities are: p(x1) = 0.14 (Unitless) p(x2) = 0.11 (Unitless) p(x3) = 0.10 (Unitless) p(xx) = 0.25 (Unitless) Question(s) 1. If the five values are collectively exhaustive, what is p(x5)? (Unitless)...
Problem 1. (6pt) A discrete random variable X can take one of three different values z1,...
Problem 1. (6pt) A discrete random variable X can take one of three different values z1, z and z probabilities ¼, ½ and ¼ respectively, and another random variable Y can 1. 32 and ys, also with probabilities 4V2 and /4, respectively, as shown in the the relative frequency with which some of those values are jointly taken is also shown in the following table with take one of three distinct values P2 P14 (a) (Spt) From the data given...
1) 2) 3) 4) 5) Suppose that X is a uniform random variable on the interval...
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Suppose that X is a uniform random variable on the interval (0, 1) and let Y = 1/X. a. Give the smallest interval in which Y is guaranteed to be. Enter -Inf or Inf for – or o. Interval:( b. Compute the probability density function of Y on this interval. fy(y) = Suppose that X ~ Bin(4, 1/3). Find the probability mass function of Y = (X – 2)2. a. List all possible values that...
TOPIC: Random variables with bounded range Suppose a random variable X can take any value in...
TOPIC: Random variables with bounded range Suppose a random variable X can take any value in the interval [−1,2] and a random variable Y can take any value in the interval [−2,3]. QUESTION 1: The random variable X−Y can take any value in an interval [a,b]. Find the values of a and b: a= b= QUESTION 2 (Yes or No): Can the expected value of X+Y be equal to 6?
A Suppose X and Y are random variables that only take on the values 0, 1,...
A Suppose X and Y are random variables that only take on the values 0, 1, and 2. (That is, for both of their probability mass functions, p(z) = 0 for xメ0.1.2.) Suppose E(X-Ely and E X2 EY]. Prove that EEY (Write your answer in complete sentences, as this requires a proof.)
(1) Suppose the pdf of a random variable X is 0, otherwise. (a) Find P(2 <...
(1) Suppose the pdf of a random variable X is 0, otherwise. (a) Find P(2 < X < 3). (b) Find P(X < 1). (e) Find t such that P(X <t) = (d) After the value of X has been observed, let y be the integer closest to X. Find the PMF of the random variable y U (2) Suppose for constants n E R and c > 0, we have the function cr" ifa > 1 0, otherwise (a)...
3x+1 # 6 Given that f(x) is a probability distribution for a random variable that can...
3x+1 # 6 Given that f(x) is a probability distribution for a random variable that can take on 50 the values x = 1,2,3,4,5, find an expression for the cumulative distribution function F(x) of the random variable. 15
Consider a pair of random variables X and Y, each of which take on values on...
Consider a pair of random variables X and Y, each of which take on values on the set A (1.2,3,4,5). The joint distribution of X and Y is a constant: Pxyx,y)-1/25 for all(x.y) pairs coming from the set A above. Let the random variable Z be given as the minimum of X and Y. Find the probability that Z is equal to 5.
Let X take on values −2, −1, 1, 2 each with probability 0.25. Let Y =...
Let X take on values −2, −1, 1, 2 each with probability 0.25. Let Y = X^2 , so that Y takes on values 1, 4 each with probability 0.5. Clearly, since Y is defined in terms of X, then Y is dependent on X. You can show quickly that Cov(X, Y ) = 0, and as a consequence, that ρ = 0. These random variables are uncorrelated, yet dependent.
1. Suppose that X and Y are random variables that can only take values in the intervals 0 X 2 and 0 Y 3 2. Suppose also that the joint cumulative distribution function (cdf) of X and Y, for 0 < 2 and 03 y 3 2, is as follows: Fy). 16 [5] (a) Determine the marginal cdf Fx(x) of X and the marginal cdf Fy () of Y [5] (b) Determine the joint probability density function (pdf) f(x, y)...
X is a Discrete Random Variable that can take five values Given The five possible values are: x1 = 4 (Units not given) X2 = 6 (Units not given) X3 = 9 (Units not given) X4 = 12 (Units not given) X5 = 15 (Units not given) The associated probabilities are: p(x1) = 0.14 (Unitless) p(x2) = 0.11 (Unitless) p(x3) = 0.10 (Unitless) p(xx) = 0.25 (Unitless) Question(s) 1. If the five values are collectively exhaustive, what is p(x5)? (Unitless)...
Problem 1. (6pt) A discrete random variable X can take one of three different values z1, z and z probabilities ¼, ½ and ¼ respectively, and another random variable Y can 1. 32 and ys, also with probabilities 4V2 and /4, respectively, as shown in the the relative frequency with which some of those values are jointly taken is also shown in the following table with take one of three distinct values P2 P14 (a) (Spt) From the data given...
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Suppose that X is a uniform random variable on the interval (0, 1) and let Y = 1/X. a. Give the smallest interval in which Y is guaranteed to be. Enter -Inf or Inf for – or o. Interval:( b. Compute the probability density function of Y on this interval. fy(y) = Suppose that X ~ Bin(4, 1/3). Find the probability mass function of Y = (X – 2)2. a. List all possible values that...
A Suppose X and Y are random variables that only take on the values 0, 1, and 2. (That is, for both of their probability mass functions, p(z) = 0 for xメ0.1.2.) Suppose E(X-Ely and E X2 EY]. Prove that EEY (Write your answer in complete sentences, as this requires a proof.)
(1) Suppose the pdf of a random variable X is 0, otherwise. (a) Find P(2 < X < 3). (b) Find P(X < 1). (e) Find t such that P(X <t) = (d) After the value of X has been observed, let y be the integer closest to X. Find the PMF of the random variable y U (2) Suppose for constants n E R and c > 0, we have the function cr" ifa > 1 0, otherwise (a)...
3x+1 # 6 Given that f(x) is a probability distribution for a random variable that can take on 50 the values x = 1,2,3,4,5, find an expression for the cumulative distribution function F(x) of the random variable. 15
Consider a pair of random variables X and Y, each of which take on values on the set A (1.2,3,4,5). The joint distribution of X and Y is a constant: Pxyx,y)-1/25 for all(x.y) pairs coming from the set A above. Let the random variable Z be given as the minimum of X and Y. Find the probability that Z is equal to 5.
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