Answer:
The answer is 17.67 years.
Explanation:
Present value is $2,500
Future value of the money to be double of the present value. This means the future value will be $5,000($2,500 x 2)
Interest rate is 4%
Number of years or periods to reach this $5,000 is unknown. So we are looking for this.
To compute this number of periods, lets use Financial calculator.
I/Y = 4; PV= -2,500; FV= 5,000; CPT N= 17.67 years.
Therefore, the number of years to accumulate to $5,000 is 17.67 years
Answer:
Lerner index for Botox = 0.9
Explanation:
The Lerner index measures market power in an industry. The formula for calculating the Lerner index is: L = (P - MC) / P
Lerner index for Botox = ($15 - $1.50) / $15 = 0.9
0.9 in the Lerner index means that a company has a very large market power. Under this situation, this is quite logical since Allergen has a monopoly on Botox, at least until the patent expires.
The Lerner index varies between 0 and 1, with 0 being a situation of perfect competition and 1 a monopolistic situation.
I think the answer is c.capitalize on interest but i'm not quite sure
<span>What is the subject of federal open market committee decisions? Level of interest rates and growth of the money supply. The federal open market committee makes decisions that they think will growth the supply of money within our economy and keep interest rates at an affordable level. This committee is part of the Federal Reserve Board that meets often to set the monetary policy and interest rates charged to banks. </span>
Answer:
In order to find the price of a stock which has different growth rate at different periods, we need to find the price at a time when the growth rate slows down after the initial burst of growth and is stable, in this case its in the 4th period.
Year 4 dividend = 2.07
Growth rate (G)= 8%
Required return (R)= 12%
DDM formula for stock price = D*(1+G)/R-G
2.07*(1+0.08)/0.04
=55.89
The maximum that you should be willing to pay for the stock 4 years from now is $55.89 but in order to find out what the maximum we should pay for the stock now, we need to discount this price 4 years back to the present value using the required return of 12 %
so 55.89/1.12^4=35.52
The maximum that you should be willing to pay for the stock now is $35.52
Explanation: