Answer:
$28.57
Explanation:
Dividend growth model can only be used in a situation where the firm pays a dividend which can tend to grow at constant rates reason been that the stock has been influenced by the growth rates which is involved in the dividends which means the firm can increase the dividends.
Therefore the Dividend that is to be paid next year will be:
$2Growth rates
5 %Rates of return
12% Return on Investment
Formular for the calculation of current price of the stock = D1/(r-g)
Where:
D1=2%
r=12%
g=6%
Hence:
2/ (0.12-0.05)= $ 33.33
=2/0.07
=$28.57
Therefore the amount I should be prepared to pay for the stock today will be $28.57
The number of births in a population in a certain amount of time is the birth rate
Answer:
Since Interest Rate and Period is not given; we would assume the spring term begins in 4 months and
Explanation:
First we will require to use the compound interest formula.
It is not mentioned the compounding period in the question. However, many of the bank accounts today offer monthly compounding, and this will be used as the basis.
i=interest rate=7.62% p.a => 7.62/12=0.635% per month
FV=PV(1+i)^n
FV=future value = 2200
PV=present value, to be found
i=interest rate per compounding period (month)=0.00635
n=number of periods=4
2200=PV(1+0.00635)^4
PV=2200/(1.00635^4)
PV=$2144.99
In case interest is not compounded, we could apply the simple interest formula:
FV=PV(1+ni)
PV=2200/(1+4*0.00635)
PV=$2145.504
Answer:
9.25 years
Explanation:
Price of the bond is the present value of all cash flows of the bond. These cash flows include the coupon payment and the maturity payment of the bond. Price of the bond is calculated by following formula:
According to given data
Assuming the Face value of the bond is $1,000
Coupon payment = C = $1,000 x 6.3 = $63 annually = $31.5 semiannually
Current Yield = r = 8.49% / 2 = 4.245% semiannually
Market value = $767.50
Market Value of the Bond = $31.5 x [ ( 1 - ( 1 + 4.425% )^-n ) / 4.425% ] + [ $1,000 / ( 1 + 4.425% )^n ]
Market Value of the Bond = $31.5 x [ ( 1 - ( 1 + 4.425% )^-n ) / 4.425% ] + [ $1,000 / ( 1 + 4.425% )^n ]
n = 18.53 / 2
n = 9.25 years
