2. You are given that the force of mortality µx = (0.04, 30 ≤ x <...

(A, B, & C ) Given the following table: Probability X Y 30% 25% 30% 50%...

(A, B, & C ) Given the following table: Probability X Y 30% 25% 30% 50% 15% 18% 20% 30% 20% Calculate A) the covariance of X and Y, and b&C) the next question. Select one: a. 18% b. 38% c. 74% d. 25% e. 22% 2. 2. (A, B, & C) Given the following table: Probability X Y 30% 25% 30% 50% 15% 18% 20% 30% 20% Calculate B) the correlation coefficient, C) the next question. Select one: a....

given the discrete probability distribution below: x 10 20 30 40 50 P(x) 0.3 0.05 0.1...

given the discrete probability distribution below: x 10 20 30 40 50 P(x) 0.3 0.05 0.1 0.05 0.2 calculate: a. E(x) b. Var(x) c. σx

Exercise 10.45. Suppose that the joint distribution of X,Y is bivariate normal with parameters σX,σY,ρ,µX,µY as...

Exercise 10.45. Suppose that the joint distribution of X,Y is bivariate normal with parameters σX,σY,ρ,µX,µY as described in Section 8.5. (a) Compute the conditional probability density of X given Y =y. (b) Find E[X|Y].

CDF of random variable X is given by: FX(x) = 0 x < -3 (x/2 +...

CDF of random variable X is given by: FX(x) = 0 x < -3 (x/2 + 3/2)   -3 < x < -2 (x/8 + ¾)      -2 < x < 2 1                      x > 2 Find the possible range of values that the random variable can take. Find E(X) = µX, the expected value Find P(X ≥ 1)

Consider joint Probability distribution of two random variables X and Y given as following f(x,y)   X...

Consider joint Probability distribution of two random variables X and Y given as following f(x,y)   X        2   4   6 Y   1   0.1   0.15   0.06    3   0.17   0.1   0.18    5   0.04   0.07   0.13 (a)   Find expected value of g(X,Y) = XY2 (b)   Find Covariance of Cov(x,y)

Consider the following proportions regarding age and type of offence. Type of Offence Age (Years) Violent...

Consider the following proportions regarding age and type of offence. Type of Offence Age (Years) Violent Property Drug 10 – 19 0.02 0.02 0.08 20 – 29 0.05 0.04 0.11 30 – 39 0.04 0.02 0.08 40 – 49 0.03 0.04 0.09 50 – 59 0.04 0.06 0.05 60 – 69 0.01 0.06 0.04 70 – 79 0.01 0.03 0.03 80 – 89 0.00 0.03 0.02 What is the probability of being aged 20 to 29 years? What is the...

2. The following table gives the joint PDF of random variables X and Y, where X...

2. The following table gives the joint PDF of random variables X and Y, where X is the first-year rate of return (%) from investment A, and Y is the first-year rate of return (%) from investment B.    X (%)    Y (%)    -10 0 20 30    0 0.27    0.08 0.16    0.00 45 0.00    0.04 0.10    0.35 A. Calculate the expected rate of return from investment A. B. What is the expected rate...

2. State the labels on the y axis and x axis of dose response mortality curves

2. State the labels on the y axis and x axis of dose response mortality curves

Let {X1, X2, . . . , X36}, where µX = 0 and σ2X = 1/36,...

Let {X1, X2, . . . , X36}, where µX = 0 and σ2X = 1/36, be a random sample with mean X(bar) and variance S2 . Define Y = X1 + X2 + · · · + X36, and calculate or approximate (indicate which) the following probabilities: a. P(Y > 1) b. P(Y2 > 2) c. P(Y > 3S) Please give details on answers

Use excel to find the following please thank you! The probability distribution of X, the number...

Use excel to find the following please thank you! The probability distribution of X, the number of defective tires on a randomly selected automobile checked at a certain station is given by the table. X 0 1 2 3 4 p(X) 0.54 0.16 0.06 0.04 0.2 Table 4: Distribution for defective tires Find: a. E(X) b. E(X2) C. σX (8) A sample of 600 Scholastic Aptitude Test (SAT) results has mean of 500 and standard deviation of 100.