Answer:
The correct answer is letter "B": Identification of cost pools, identification of cost drivers, calculation of pool rates, assignment of cost to products.
Explanation:
Activity-Based Costing or ABC is a managerial accounting method that assigns certain indirect costs to the products incurring the bulk of those costs. ABC is primarily used in the manufacturing sector to make a better calculation of the true cost of production per unit. For that purpose, ABC follows this sequence:
1) Identification of the activities for the creation of the product
2) Divide the activities into cost pools
3) Assign each cost pool to a cost driver
4) Calculation of the cost driver rates
5) Assignment of cost to products
<span>If the comp sold for $199,000 but includes a $3000 porch and the subject has no porch, then we subtract the value of the porch to yield a base for the comparable of $196,000. Then, since the comparable has no pool or chimney, we add these values - $8,000 and $2,000, respectively - to that base value to yield an adjusted value of $196,000 + $8,000 + $2,000 = $206,000.</span>
Answer: According to Ian Redpath and Greg Urban, the threshold amount required for conclusively stating whether a substantial basis adjustment is mandatory is $250,000. The amount required is $250,000 in order for one to know whether they are in need for a substantial basis reduction or maybe not. It's required when the amount indeed exceeds $250,000.
Answer: Option (C) is correct.
Explanation:
Given that,
Old market price of stock = $15
New market price of stock = $18
Here, we assume that EPS be $5.
So,
Price-earning ratio at old price = 
= 
= 3
Price-earning ratio at New price = 
= 
= 3.6
Hence, price-earnings ratio increases.
Answer:
Monthly deposit= $164.24
Explanation:
Giving the following information:
Future value= $1,000,000
Interest rate= 0.118/12= 0.00983
Number of periods= 35*12= 420 months
<u>To calculate the monthly deposit, we need to use the following formula:</u>
FV= {A*[(1+i)^n-1]}/i
A= monthly deposit
Isolating A:
A= (FV*i)/{[(1+i)^n]-1}
A= (1,000,000*0.00983) / [(1.00983^420) - 1]
A= $164.24