Answer:
the $500,000 that the old production line costed must be treated as a sunk cost. Sunk costs are costs that have already been incurred and the firm cannot recover them no matter what they do. in this case, since ankle-length skirts are out of fashion, the production is useless and is worth $0.
Explanation:
Answer:
d. $8,300.
Explanation:
Direct Materials
Beginning 8,200
Purchases *16,800
Requisitions 18,400
Ending 6,600
We solve for purchases:
6,600 + 18,400 - 8,200 = 16,800
WIP Inventory
Beginning 7,700
Materials 18,400
Labor 13,700
Overhead 8,200
Transferred Out <u> 39,700*</u>
Ending 8,300
The transferred-out from WIP inventory is the transferred-in for Finished Goods
Answer:
enough to earn some money but not too much to jeopardize your grades
Explanation:
Since your scarce resource is time you need to create a balance between all the tasks, so much so that you are able to benefit from all of the tasks but not substitute one for another. Therefore in this situation, you will work enough to earn some money but not too much to jeopardize your grades. That way you are able to make money to pay for most (if not all) of your expenses but at the same time, you are still making sure you are benefiting from school and not wasting your time in school by not being able to graduate.
Answer:
$1,060.75
Explanation:
the yield to maturity of the second bond is to 4% semiannual or 8.16% effective annual rate.
so we have to calculate the quarterly interest rate that yields an effective annual rate of 8.16%:
0.0816 = (1 + i)⁴ - 1
1.0816 = (1 + i)⁴
⁴√1.0816 = ⁴√(1 + i)⁴
1.0198 = 1 + i
i = 0.019804 = 1.9804%
now we must discount the first bond using that effective interest rate:
PV of face value = $1,000 / (1 + 4%)²⁰ = $456.39
PV of first 20 coupon payments = $20 x 16.38304 (PV annuity factor, 1.9804%, 20 periods) = $327.66
now we must find the value of the last 20 coupon payments but at the end of year 5 = $25 x 16.38304 = $409.58. Then we calculate the PV = $409.58 / (1 + 4%)¹⁰ = $276.70
the bond's current market value = $456.39 + $327.66 + $276.70 = $1,060.75