Container 1 has 8 items, 3 of which are defective. Container 2 has 5 items, 2 of which are defective. If one item is drawn from each container, what is the probability that only one of the items is defective?

1.  Discuss your understanding of ANOVA

2.  Present at least 2 examples on how you will use ANOVA based in your area of study.

Use the table above to answer the following questions. Assume the table above describes the costs for a typical firm in a perfect competition industry and the market equilibrium price is $9.

A) How many units should this firm produce ?

B) What are the firm’s profits ? You must explain how you determined your answer.

C)What is the long run equilibrium price ?

D) If 2024 units are being sold in the market in the long run, how many identical firms are there in the marketing the long run..

Could I get some step by step help on this please? Thank you in advance. :)

(2.) 2 pages text and 1 page graphs/equations maximum for your answer. Suppose Denver Metro is a government agency responsible for supplying drinking water to the city of Denver, Colorado. Use Course Concepts to address the following questions. (A) Denver is a large metropolitan city anticipating continuous future growth. What categories of costs must Denver Metro cover to provide residents with adequate quantities of water? Identify 4 (number them) and explain thoroughly. (B) Due to the use patterns by the residents, Denver Metro has decided to implement declining block pricing. What are the advantages and the problems associated with this pricing approach?

Problem 2

Consider an economy described by the production function: Y = F(K,L) = K 1/2 L 1/2

a. What is the per- worker production function?

b. Assuming no population growth or technological progress, find the steady- state capital stock per worker, output per worker, and consumption per worker as a function of the saving rate and the depreciation rate.

c. Assume that the depreciation rate is 10 percent per year. Make a table showing steady-state capital per worker, output per worker, and consumption per worker for saving rates of 0 percent, 10 percent, 20 percent, 30 percent, and so on. (You will need a calculator with an exponent key or Excel for this.) What saving rate maximizes output per worker? What saving rate maximizes consumption per worker?

d. Use calculus to find the marginal product of capital. Add to your table from part (c) the marginal product of capital net of depreciation for each of the saving rates. What does your table show about the relationship between the net marginal product of capital and steady-state consumption?

Problem 2

Company paid dividends each year.

Required:

1. Prepare Cash Flow Statement for Year 2
2. Prepare Tax Provision AJE for both years. Note Year 1 was the first year of operations.

Tax Provision JEs on next page.

Consider the reaction:

2 CO_2(g) + Heat = 2 CO_(g) + O_2(g)

1.  Predict the effect on the equilibrium system if the reaction temperature is decreased. (You may wish to write the equilibrium constant expression for the reaction first).

a) The equilibrium will shift to the right favoring the products.

b) The equilibrium will shift to the side that the light side of the force is on.

c) There will be no effect.

d) The equilibrium will shift to the left favoring the reactants.

2. Looking at the same equilibrium system, predict the effect if the CO2 gas concentration is increased.

a) The equilibrium will shift to the right favoring the products.  

b) There will be no effect.

c) There will be a Tyndall effect.

d) The equilibrium will shift to the left favoring the reactants.

3. Referencing the same equilibrium system as in Questions 1 and 2, how would the relative amounts of O2 and CO2 change after the removal of some CO gas from the equilibrium reaction?

a) The relative amount of carbon dioxide would decrease and the relative amount of oxygen would decrease.

b) The relative amount of carbon dioxide would increase and the relative amount of oxygen would increase.

c) The relative amount of carbon dioxide would increase and the relative amount of oxygen will decrease.

d) The relative amount of carbon dioxide would decrease and the relative amount of oxygen would increase.

3. Consider this system at equilibrium: (Brown) 2 NO_2(g) = N₂O_4(g) (Colorless). Predict the color of the reaction mixture at -15 degrees Celsius.

a) Purple  

b) Aqua  

c) Colorless  

d) Brown

6) Given: (a) f (x) = (2x^2)/(x^2 −1) - Calculate f ′(x) and f ″(x) - Determine any symmetry - Find the x- and y-intercepts - Use lim f (x) x→−∞ and lim f (x) x→+∞ to determine the end behavior - Locate any vertical asymptotes - Locate any horizontal asymptotes - Find all intervals where f (x) is increasing and decreasing - Find the open intervals where f (x) is concave up or concave down

Part-A

1. discuss the features of Activity-based costing system in detail.
2. Identify 2 specific Australian organisations that Activity-based costing system is suitable for, and explain why in detail.
3. Discuss the potential uses of the cost information for decision-making, to the managers in each of the 2 organisations selected in 2 above in detail.

(a) Find the limit of {(1/(n^(3/2)))-(3/n)+2} and use an epsilon, N argument to show that this is indeed the correct limit.

(b) Use an epsilon, N argument to show that {1/(n^(1/2))} converges to 0.

(c) Let k be a positive integer. Use an epsilon, N argument to show that {a/(n^(1/k))} converges to 0.

(d) Show that if {Xn} converges to x, then the sequence {Xn^3} converges to x^3. This has to be an epsilon, N argument [Hint: Use the difference of powers formula].