Question
The question is incomplete, hence the tutor added a piece of information
The Corporation applies manufacturing overhead on the basis of machine-hours. The predetermined overhead rate is $14 per machine-hour. What amount would be
Assuming the actual machine hours worked is 3,500
<em>Note the actual machine was added by the tutor</em>
Answer:
Applied overhead =$49,000
Explanation:
<em>Overheads are charged to units produced by the means of an estimated overhead absorption rate. This rate is computed using budgeted overhead and budgeted activity level. </em>
<em>Pre-determined overhead absorption rate (POAR) = Budgeted overhead/Budgeted machine hours</em>
The POAR is given as $14 per machine hour
Applied (absorbed) overhead = POAR × Actual machine hours
Applied overhead = $14 × 3,500 =$49000
Applied overhead =$49,000
Answer:
2) perfectly vertical
Explanation:
When the price elasticity of demand is perfectly inelastic, the demand curve is perfectly vertical. This means that the quantity demanded will remain the same no matter what price.
In this scenario, the supply curve for oranges shifted to the left due to the early freeze, which results in a price increase at every level of quantity demanded. Since the demand is perfectly inelastic, the new equilibrium price will be determined by the how much the supply curve shifts.
Answer:
$0
Explanation:
Given that,
Total revenues = $4,000,000
Cost of goods sold = $3,500,000
Depreciation expense = $500,000
Interest expense = $120,000
Earnings before interest and taxes (EBIT):
= Total revenues - Cost of goods sold - Depreciation expense
= $4,000,000 - $3,500,000 - $500,000
= $0
Therefore, the EBIT for a firm is $0.
Answer:
-$475,000
Explanation:
Total revenue = Baskets of peaches × Price
= 100,000 × $3
= $300,000
Explicit cost:
= Rent equipment + wages
= $100,000 + $100,000
= $200,000
Implicit cost:
= Land × Interest + salesman earned
= $1,000,000 × 0.55 + $25,000
= $575,000
Total cost = Explicit cost: + Implicit cost
= $200,000 + $575,000
= $775,000
Economic profit = Total revenue - Total cost
= $300,000 - $775,000
= -$475,000