For a random variable X, if  V( X ) = 0.1, then the probability of the event:...

For a random variable X, if  V( X ) = 0.1, then the probability of the event:...

For a random variable X, if  V( X ) = 0.1, then the probability of the event: (X - E(X) )2 > 10, A. cannot be greater than 0. B. cannot be greater than 0.01 C. cannot be greater than 0.001 D. none of the above.

For a random variable X, if  V( X ) = 0.1, then the probability of the event:...

For a random variable X, if  V( X ) = 0.1, then the probability of the event: (X - E(X) )2 > 10, A. cannot be greater than 0. B. cannot be greater than 0.01 C. cannot be greater than 0.001 D. none of the above.

For a random variable X, if  V( X ) = 0.1, then the probability of the event:...

For a random variable X, if  V( X ) = 0.1, then the probability of the event: (X - E(X) )2 > 10, A) Cannot be greater than 0. B) Cannot be greater than 0.01 C) Cannot be greater than 0.001 D) None of the above

For a discrete random variable, the probability of the random variable takes a value within a...

For a discrete random variable, the probability of the random variable takes a value within a very small interval must be A. zero. B. very small. C. close to 1. D. none of the above. QUESTION 10 The area under the density function in a certain interval of a continuous random variable represents A. randomness. B. the area of one rectangle. C. the probability of the interval. D. none of the above. QUESTION 11 For any random variable, X, E(X)...

X/Y 1 2 3 4 -1 0 0 0.1 0.2 0 0.1 0.1 0 0.1 1...

X/Y 1 2 3 4 -1 0 0 0.1 0.2 0 0.1 0.1 0 0.1 1 0.2 0 0.1 0.1 let the joint probability mass function of the discrete random variable X and Y give as above Find E(3x+1) and E(3x+4y) cov( X,Y)

If the probability density of a random variable is given by f(x) = Find the value...

If the probability density of a random variable is given by f(x) = Find the value of k and the probabilities that a random variable having this probability density will take on a value (a) between 0.1 and 0.2                      (b) greater than 0.5.

1. Given a discrete random variable, X , where the discrete probability distribution for X is...

1. Given a discrete random variable, X , where the discrete probability distribution for X is given on right, calculate E(X) X P(X) 0 0.1 1 0.1 2 0.1 3 0.4 4 0.1 5 0.2 2. Given a discrete random variable, X , where the discrete probability distribution for X is given on right, calculate the variance of X X P(X) 0 0.1 1 0.1 2 0.1 3 0.4 4 0.1 5 0.2 3. Given a discrete random variable, X...

The cumulative distribution function for a random variable X is F(x)= 0 if x less than...

The cumulative distribution function for a random variable X is F(x)= 0 if x less than or equal 0, or F(x)=sinx if 0 is less than x is less than or equal to pi/2 , or F(x)= 1, if x is greater than pi/2 . (a) find P(0.1 less than X less than 0.2. (b) find E(x)

A random variable X has a probability function f(x) = Ax, 0 ≤ x ≤ 1,...

A random variable X has a probability function f(x) = Ax, 0 ≤ x ≤ 1, 0, otherwise. a. What is the value of A? (Hint: intigral -inf to inf f(x)dx= 1.) b. Compute P(0less than x less than 1/3) c. Compute the cdf. of X. d. Compute E(X). e. Compute V(X).

1. There is a random variable X. It has the probability distribution of f(x) = 0.55...

1. There is a random variable X. It has the probability distribution of f(x) = 0.55 - .075X, for 2 < x < 6. What is E(X)? 2. Continuing with the random variable X from question 1 (It has the probability distribution of f(x) = 0.55 - .075X, for   2 < x < 6): What is V(X)? 3. Let R and S be two independent and identically distributed random variables. E(R) = E(S) = 4. V(R) = V(S) = 3....