Answer:
$1,100
Explanation:
The amount which Rachel must include in her 2018 gross income would be computed by applying an equation which is shown below:
= Itemized deductions - standard deductions
= $6,900 - $5,800
= $1,100
The $1,100 would be included in the $1,900 refund which is presented in her 2018 gross income.
The excess amount between itemized deductions and standard deductions would indicate the extra refund amount which is already included in its $1,900 refund amount
Answer:
a. $197,600
b. $163,400
c. $108,600
Explanation:
a. Manufacturing margin = Sales - Variable cost of goods sold
= $380,000 - $182,000
= $197,600
b. Contribution margin = Manufacturing margin - Variable selling and administrative expenses
= $197,600 - $34,200
= $163,400
c. Income from operations = Contribution margin - Fixed manufacturing costs - Fixed selling and administrative expenses
= $163,400 - $57,000 - $2,800
= $108,600
Answer:
P = $75 per club
n= 75,000 clubs
Explanation:
The demand and supply functions are:
The equilibrium price is the price that yields a quantity demanded equal to the quantity supplied:
The number of units sold at that price is:
Answer:
By using the percentage-of-completion method the $64 million revenue should Parmac recognize in 2018
Explanation:
Percentage-of-completion method : Under this method,
First we have to calculate the percentage which is based on current period cost to total period cost.
After that, multiply the percentage with the revenue so that we get to know how much revenue is being recognized during an particular year.
In mathematically,
Estimated Cost percentage = current period cost ÷ total period cost
= $48 million ÷ $120 million
= 40%
Now,
Revenue recognized = Estimated cost percentage × Revenue
= 40% × $160 million
= $64 million
Hence, by using the percentage-of-completion method the $64 million revenue should Parmac recognize in 2018
Answer: Option (B) is correct.
Explanation:
Correct option: Decreasing marginal product.
Marginal product is the change in the level of output, when there will be an extra input employed in the production of a certain commodity.
So, Marginal Product = 
Where,
Q = Output
I = Input
Marginal product of 1st bag = 500
Marginal product of 2nd bag = 
= 300
Marginal product of 3rd bag = 
= 100
∴ From the above calculations, we can seen that as we employed one more bag of seeds as a result marginal product goes on diminishing.
Hence, Joan's production function exhibits decreasing marginal product.
