Option 1: PV = $400,000
Option 2: Receive (FV) $432,000 in one year
PV = FV(1/(1+i)^n), where i= 8% = 0.08, n = 1 year
PV = 432,000(1/(1+0.08)^1) = $400,000
Option 3: Receive (A) $40,000 each year fro 20 years
PV= A{[1-(1+i)^-n]/i} where, n = 20 years
PV = 40,000{[1-(1+0.08)^-20]/0.08} = $392,725.90
Option 4: Receive (A) $36,000 each year from 30 years
PV = 36,000{[1-(1+0.08)^-30]/0.08} = $405,280.20
On the basis of present value computations above, option 4 is the best option for Kerry Blales. This option has the highest present value of $405,280.20
Answer:
22
Explanation:
A monopoly will maximize profit at MR = MC ( marginal revenue = marginal cost)72
MR =MC
40 -0.5 Q = 4
-0.5 Q = 4 - 40 = -36
Q = -36 / -0.5 = 72
The price of the her product
Q = 160 - 4P
4P = 160 - 72 = 88
P = 88 / 4 = 22
Answer:
A. Take $1 million now.
Explanation:
A. If we take $1 million now the present value of the money is $1 million.
B. If we choose to take $1.2 million paid out over 3 years then present value will at 10% will be;
$300,000 + $300,000 / 1.2 + $300,000/ 1.44 + $300,000 / 1.728
$300,000 + $250,000 + $208,000+ $173,611 = $931,944
The present value of option B is less than present value of option A. We should select option A and take $1 million now.
Answer:
The annualized rate of return to the Swiss investor is -7.93%.
Explanation:
This is an instance of foreign currency bond.
Using the exchange rate of $1 = 1.420, purchase price of the bond is calculated as $9,708.74 x 1.420 = 13,786.4108 Swiss Francs
Using the exchange rate of $1 = 1.324, maturity value is $10,000 x 1.324 = 13,240 Swiss Francs
Holding period is 6 months.
So, annualized rate of return is: (Maturity amount - Purchase price)/Purchase price x 12 / No of months
Annualized rate of return is: (13,240 - 13,786.4108)/13,786.4108 x 12/6 = -0.079268028.
Annualized rate of return is -7.93% approximately.
Answer:
Cash for $475 and Credit Card Expense for $25
Explanation:
Cash for $475 and Credit Card Expense for $25
