Answer:
The correct answer to the following question is $36,000.
Explanation:
Given information -
Units anticipated to be produced - 300,000 units
Variable cost - $150,000
Fixed cost - $600,000
Beginning inventory - 5000 units
Ending inventory - 7000 units
Income under absorption costing - $40,000
Now under the absorption costing, rate of fixed overhead cost per unit -
Fixed cost / Number of units produced
= $600,000 / 300,000
= $2
In April ( under absorption costing ), the amount of fixed manufacturing overhead cost that was still embedded in ending inventory but were not expense -
Fixed overhead rate per unit x number of units produced but not sold
= $2 x 2000 ( 7000 units - 5000 units )
= $4000
So when we calculate the operating cost under variable costing this fixed overhead cost wold be subtracted from total income -
$40,000 - $4000
= $36,000 .
Economic theory and the data in the table show that the average total cost curve and the marginal cost curve are related in that the MC curve passes through the minimum point of the ATC curve.
<h3>What is the relationship between the MC and ATC curves?</h3><h3 />
The data given by the table (which is accurately filled up) shows that the MC curve will intersect the ATC curve at its lowest point.
We see this from the fact that before the lowest ATC of 0.107, the marginal cost was less than the ATC. After the lowest ATC however, the marginal cost becomes higher than the ATC.
This shows that the MC curve intersected the ATC at its lowest point of 0.107 and then kept rising above it.
Find out more on the MC curve at brainly.com/question/9335427.
Answer:
At year-end, factory overhead is $21,000
Explanation:
Predetermined overhead rate = (Estimated overhead costs/Estimated direct labor costs)
Predetermined overhead rate = ($404000 / $2020000) = 20%*Direct labor costs
Hence, Applied overhead costs= (20% * $1,810,000)
Applied overhead costs=$362000.
Hence balance in factory overhead account at year end = $383,000 - $362,000
=$21,000.
Answer:
The answer is $750 millions
Explanation:
After recapitalization, the Weight of Debts of Nichols Corporation is 25%. Hence, its Weight of Equity Capital is: 100% - 25% = 75%.
The formula of Value of Operations as follows:
Value of Operations = Weight of Debts x Value of Debts + Weight of Equity Capital x Value of Equity Capital
Because Nichols Corporation's value of operations is equal to $600 million after recapitalization, we have the following equation with S as the value of equity after the recap:
600 = 25% x 150 + 75% x S
=> S = (600 - 25% x 150) / 75% = 750
If materials listed, perhaps the chemicals in them, safety precautions, etc.
