Answer:
D. ceteris paribus condition
Explanation:
The Latin words “Ceteris paribus”, means “all other things remain the same”. It is an assumption usually included when by economists when stating laws or concepts such as demand and supply. Because, actually in the real word, it is feasible to eliminate other variables that might influence an outcome, aside the variables under study. So therefore, we assume all other variables remain constant, when stating the relationship between two variables. For example, when constructing a demand curve showing the relationship between price and quantity demanded, we assume that all other variables that can influence demand other than price, remain the same, which in reality might be difficult to isolate.
Answer:
LetFM = number of fronts madeSM = number of seats madeWM = number of wheels madeFP = number of fronts purchasedSP = number of seats purchasedWP = number of wheels purchasedMin8FM + 6SM + 1WM + 12FP + 9SP + 3WPs.t.3FM + 4SM + .5WM 5000010FM + 6SM + 2WM 1600002FM + 2SM + .1WM 30000FM + FP 12000SM + SP 12000WM + WP 24000FM, SM, WM, FP, SP, WP 0
The answer to the question is a form
Answer:
b. Liability, $9,000,000; expense, $0.
Explanation:
An asset retirement obligation (ARO) refers to an obligation with respect to the acquisition , construction, development, etc. The liability should be recognized the liability at the present value that should be expected to be paid for settling the obligations
Here the $9,000,000 million represents the liability
Also the journal entry is
Asset Dr
To liability
(Being the asset placed is recorded)
There is no expense should be recorded in the income statement
Answer:
P0 = $66.6429 rounded off to $66.64
Option c is the correct answer
Explanation:
Using the two stage growth model of dividend discount model, we can calculate the price of the stock today. The DDM values a stock based on the present value of the expected future dividends from the stock. The formula to calculate the price of the stock today is,
P0 = D0 * (1+g1) / (1+r) + D0 * (1+g1)^2 / (1+r)^2 + ... + D0 * (1+g1)^n / (1+r)^n + [(D0 * (1+g1)^n * (1+g2) / (r - g2)) / (1+r)^n]
Where,
- g1 is the initial growth rate
- g2 is the constant growth rate
- r is the required rate of return
P0 = 2* (1+0.2) / (1+0.1) + 2 * (1+0.2)^2 / (1+0.1)^2 + 2 * (1+0.2)^3 / (1+0.1)^3
+ 2 * (1+0.2)^4 / (1+0.1)^4 + 2 * (1+0.2)^5 / (1+0.1)^5 +
[(2 * (1+0.2)^5 * (1+0.04) / (0.1 - 0.04)) / (1+0.1)^5]
P0 = $66.6429 rounded off to $66.64
