Business net income $130,000
Dividends $2,000
Long-term capital gain $5,000
Short-term capital loss $10,000
$130,000 + $2,000 + $5,000 = $137,000
$137,000 - $10,000 = $127,000
Based on my these figures, Barton’s taxable income is $127,000.
Answer:
E)are not productively efficient because they do not produce at minimum average total cost and they are not allocatively efficient because they produce where price is greater than marginal cost.
Explanation:
Monopolistic competition can be regarded as imperfect competition whereby many producers that are competing against each other exist in the market, though they are selling products which can be differentiated from one another. Monopolistically competitive firms do
maximize their profit if their production is at a level where marginal costs as well as its marginal revenues equals. Hence, monopolistically competitive firms are not productively efficient because they do not produce at minimum average total cost and they are not allocatively efficient because they produce where price is greater than marginal cost.
Answer:
Option A The impact of a change in the local currency on inflow and outflow variables can sometimes be indirect and therefore different from what is expected.
Explanation:
The reason is that the changes in the currency exchange rate in which the company receives the payment and is also not a home currency, such risk exposure is known as economic exposure. So the only option that correct here is option A.
Option B is incorrect because depreciation is non cash item and it is not exposed to currency fluctuations.
Option C and D are also incorrect because domestic firms don't face any economic exposure.
True,an untrusting client may not disclose important details to their treatment
Answer:
Annual deposit= $2,456.96
Explanation:
Giving the following information:
The number of years= 5 years
Final value= $15,000
Interest rate= 10%
We need to calculate the annual deposit to reach the objective. We will use the following formula:
FV= {A*[(1+i)^n-1]}/i
A= annual deposit
Isolating A:
A= (FV*i)/{[(1+i)^n]-1}
A= (15,000*0.1) / [(1.10^5)-1]
A= $2,456.96
