Answer:
2.8%
Explanation:
The formula to calculate value of a perpetuity is as follow:
V = Annuity payment in year 1 / (r-g)
V: Value of the perpetuity
r: Discount rate
g: Growth rate (missing value)
By inputting numbers into the formula, we have:
6225.81 = 386 / (0.09 - g)
--> g = 2.8%
Answer: Proceeds transaction
Explanation:
In a proceeds transaction, the broker is involved in two related transactions which are the selling of one stock and the buying of another.
Proceed transactions involve a customer asking their broker to sell their stock and then use the proceeds gained from that sale to buy another stock which is what the customer did when he directed his broker to sell ABCD stock and use the proceeds to buy XPDQ stock.
Answer:
positively.
Explanation:
The <u><em>correlation </em></u>between education and income is positive a more educated person will always have a better income than one that is not. But along the statistical distribution of this<u><em> correlation</em></u> there are people that <u><em>deviate </em></u>for the curve <u><em>(standar deviation)</em></u> and even though they are educated they do not earn as much money to others that have the same level of education.
Answer: Price of stock at year end =$53
Explanation:
we first compute the Expected rate of return using the CAPM FORMULAE that
Expected return =risk-free rate + Beta ( Market return - risk free rate)
Expected return=6% + 1.2 ( 16%-6%)
Expected return= 0.06 + 1.2 (10%)
Expected return=0.06+ 0.12
Expected return=0.18
Using the formulae Po= D1 / R-g to find the growth rate
Where Po= current price of stock at $50
D1= Dividend at $6 at end of year
R = Expected return = 0.18
50= 6/ 0.18-g
50(0.18-g) =6
9-50g=6
50g=9-6
g= 3/50
g=0.06 = 6%
Now that we have gotten the growth rate and expected return, we can now determine the price the investors are expected to sell the stock at the end of year.
Price of stock = D( 1-g) / R-g
= 6( 1+0.06)/ 0.18 -0.06
=6+0.36/0.12
=6.36/0.12= $53
