b. 76,000 c. 83,000 d. 12,000 1. 1 points QUESTION 8 A production company wants to...
QUESTION 11 1. If a company produces Product 1, then it must produce at least 150 units of Product 1. Which of the following constraints enforce this condition? a. X, is greater than or equal to 150 + Y b. X1Y is less than or equal to 150 c. X1 - 150Y, is greater than or equal to 0 d. Xi is less than or equal to 150Y 2 points QUESTION 12 1. If a company selects Project 1 then...
JS: QUESTION 1 A company must invest in project 1 in order to invest in project 2. Which of the following constraints ensures that project 1 will be chosen if project 2 is invested in? a. X1 - X2 is greater than or equal to 0 b.X1 - X2 is less than or equal to 0 c. X1 + X2 is equal to 1 d. X1 + X2 is equal to 0 QUESTION 2 A company wants to select no...
Problem 4: A firm has the following production function: Xi , X2)=X1 , X2 A) Does this firm's technology exhibit constant, increasing, or decreasing returns to scale? B) What is the firm's Technical Rate of Substitution? What is the optimality condition that determines the firm's optimal level of inputs? C) Is the marginal product of input 1 increasing, constant, or decreasing in x1. Is the marginal product of input 2 increasing, constant, or decreasing in x2? D) Suppose the firm...
1) Foreach of the production functions below, draw the isoquant passing througb the point z^(4,1). Label at least two points on the isoquant. Also determine whether the technology exhibits CRS,IRS or DRS. a. f(x)- 2x2 b. f(x)-x1/2+X2 c. f(x)- max(xiX2) d. f(x)-xiX22 2) Eoreach of the production functions below, find the cost function and conditional factor demands if w1-2 and w2-4. What is the amount of x1 and x2 that minimizes the cost of producing 4 units of output? a....
Suppose that Xi are IID normal random variables with mean 2 and variance 1, for i = 1, 2, ..., n. (a) Calculate P(X1 < 2.6), i.e., the probability that the first value collected is less than 2.6. (b) Suppose we collect a sample of size 2, X1 and X2. What is the probability that their sample mean is greater than 3? (c) Again, suppose we collect two samples (n=2), X1 and X2. What is the probability that their sum...
9 Let Xi, X2, ..., Xn be an independent trials process with normal density of mean 1 and variance 2. Find the moment generating function for (a) X (b) S2 =X1 + X2 . (c) Sn=X1+X2 + . . . + Xn. (d) An -Sn/n
9 Let Xi, X2, ..., Xn be an independent trials process with normal density of mean 1 and variance 2. Find the moment generating function for (a) X (b) S2 =X1 + X2 . (c)...
Given production function: y=f(x1,x2)=(α⋅x(σ−1)/σ1+(1−α)⋅x(σ−1)/σ2)σ/(σ−1) consider, α = 0.2 and σ = 0.7. The first factor is currently used in the amount x1 = 9, and the second factor is used in the amount x2 = 3. a) When (x1,x2) = (9,3), how much output is being produced? Output: b) When (x1,x2) = (9,3), what is the marginal product of factor 1? Marginal product: c) When (x1,x2) = (9,3), what is the average product of factor 1? Average product: d) When...
1. 1. (Absolute Geometry) Assume points A, D, C, B satisfy A-D-C
and B is not on the line determined by A, D, C. Prove Internal
Angle Sum of triangle ACB is less than or equal to Internal Angle
Sum of triangle ADB. (NOTE: This is not Euclidean Geometry. Prove
this in Absolute Geometry.)
need to check my work. Just
need B and C
Problem 2. Recall that a discrete random variable X has Poisson distribution with parameter λ if the probability mass function of X is fx (x) = e-λ- XE(0, 1,2, ) ar! This distribution is often used to model the number of events which will occur in a given time span, given that λ such events occur on average a Prove by direct cornputation that the mean of a Poisson randoln...
Suppose a manufacturing firm has two factories (Factory 1 and Factory 2), and a single production process (Process A) that is used in both factories. A new process (Process B) is developed that potentially reduces production costs. To test whether Process B is less costly than Process A, an experiment is designed where: Within each Factory, products are assigned randomly to Process A or Process B. Production costs for each product are recorded. Note that resources (i.e. materials, workers, equipment)...