Answer:
Explanation:
find the attached solution below
Answer:
Inventory $200,000
Cash $50,000
Notes payable $150,000
Explanation:
Data provided in the question:
Cost of the inventory purchased = $200,000
Amount paid in cash = one-fourth
= one-fourth of $200,000
= $50,000
For the remaining balance signed a note i.e = $200,000 - $50,000
= $150,000
Now,
This transaction will be recorded as:
Inventory $200,000
Cash $50,000
Notes payable $150,000
Answer: Inventories and cost of goods sold.
Explanation:
Standard costing is used in accounting and it simply has to do with the substitution of the cost that's expected for a product with an actual cost when preparing financial statements.
The difference that's then between the actual costs and expected costs are then recorded as variance. It should also be noted that when a company prepares financial statements using standard costing, the items that are reported at standard cost will be Inventories and the cost of goods sold.
Answer:
For Countries (per capita) United States of America (per capita)
<u> Ethiopia: </u>
$380 $48,468
<u>Mexico: </u>
$9,271 $48,468
<u>India:</u>
$1,358 $48,468
<u>Japan:</u>
$44,508 $48,468
Explanation:
Ratio per Capita also known as Gross Domestic Product per Capita (GDP Capita) is the monetary measure of the market value of all the final goods and services produced in a specific time period within the country in view. <em>It is useful for comparing national economies of different countries on the international market.</em>
Answer:
Alpha for A is 1.40%; Alpha for B is -0.2%.
Explanation:
First, we use the CAPM to calculate the required returns of the two portfolios A and B given the risks of the two portfolios( beta), the risk-free return rate ( T-bill rate) and the Market return rate (S&P 500) are given.
Required Return for A: Risk-free return rate + Beta for A x ( Market return rate - Risk-free return rate) = 5% + 0.7 x (13% - 5%) = 10.6%;
Required Return for A: Risk-free return rate + Beta for B x ( Market return rate - Risk-free return rate) = 5% + 1.4 x (13% - 5%) = 16.2%;
Second, we compute the alphas for the two portfolios:
Portfolio A: Expected return of A - Required return of A = 12% - 10.6% = 1.4%;
Portfolio B: Expected return of B - Required return of B = 16% - 16.2% = -0.2%.