Answer:
B. The higher the price-earnings ratio, the more investors are paying for earnings.
Explanation:
When analyzing a price-earnings ratio the higher the price-earnings ratio, the more investors are paying for earnings.
Price-earning ratio: It is a ratio of stock´s price per share to the company´s earning per share. It is a measure the share price in relative to the total earning by the company per share. Higher price earning ratio shows the higher demand for the share in the market. The investor wants to invest in the company´s share even if they have to pay a higher price per share as they anticipate better earning per share in the future. This ratio also helps in evaluating the performance of the company before investing.
Formula; Price-earning ratio= 
Answer:
Tax on a case of cola is $4 per case.
The burden that falls on consumers is $1 per case.
The burden that falls on producers is $3 per case
False. This is due to the fact that producers already carry a greater share of the tax burden.
Explanation:
Tax on a case of cola = Amount that consumers pay after the tax has been charged - Amount producers receive = $7 - $3 = $4 per case
Burden on consumers = Amount consumers pay after the tax has been levied - Amount consumers pay before tax was levied = $7 - $5 = $1 per case
Burden on producers = Tax on a case of cola - Burden on consumers = $4 - $1 = $3 per case
False. This is due to the fact that producers already carry a greater share of the tax burden.
Answer:
the amount of increase in the common stock is $75,000
Explanation:
The computation of the amount of increase in the common stock is shown below;
= Number of shares of common stock sold × stated value per share
= 15,000 shares × $5 per share
= $75,000
Hence, the amount of increase in the common stock is $75,000
Answer:
Annual deposit= $2,803.09
Explanation:
<u>First, we need to calculate the monetary value at retirement:</u>
FV= {A*[(1+i)^n-1]}/i
A= annual payment
FV= {22,000*[(1.08^25) - 1]} / 0.08
FV= $1,608,330.68
Now, the annual deposit required to reach $1,608,330.68:
FV= {A*[(1+i)^n-1]}/i
A= annual deposit
Isolating A:
A= (FV*i)/{[(1+i)^n]-1}
A= (1,608,330.68*0.08) / [(1.08^50) - 1]
A= $2,803.09