Answer:
Monthly payment = $769.27
Explanation:
First we have to determine the future value of the ordinary annuity:
Payment = $235.15
N = 20 * 12 = 240
Rate = 3.2% / 12 = 0.267%
Using a financial calculator and the FV function, the FV = $78,910.41
Again, using the financial calculator or Excel, you can determine the monthly payment:
N = 10 / 12 = 120
Rate = 0.267%
PV = $78,910.41
FV = $0
Monthly payment = $769.27
Answer:
A pay policy line <u>reflects the pay structure in the market, which always matches rates in the organization.</u>
Explanation:
A pay policy line is the salary level and organization chooses to pay its employees compared to the standard salary level in the market.
Organizations would prefer not to overpay or underpay their employees. Therefore they consider the standard pay structure of the market and match the amount they pay their employees to this structure.
Answer:
Visualize and organize your thoughts.
Explanation:
Answer:
Total PV= $26,176.63
Explanation:
Giving the following information:
Cash flow:
Cf1= $5,700
Cf2= $10,700
Cf3= $16,900
<u>To calculate the price of the investment now, we need to use the following formula on each cash flow:</u>
PV= Cf / (1+i)^n
PV1= 5,700/1.11= 5,135.14
PV2= 10,700/1.11^2= 8,684.36
PV3= 16,900/1.11^3= 12,357.13
Total PV= $26,176.63
Answer:
The answer is option D
Explanation:
The bond can be issued at par, at a discount or at a premium depending on the coupon rate and the market interest. The price of the bond which pays semi annual coupon can be calculated using the formula of bond price. The formula to calculate the price of the bond is attached.
First we need to determine the semi annual coupon payment, periods and YTM.
Semi annual coupon payments = 2000000 * 0.1 * 6/12 = 100000
Semi annual periods = 5 * 2 = 10
Semi annual YTM = 0.08 * 6/12 = 0.04
Bond Price = 100000 * [(1 - (1+0.04)^-10) / 0.04] + 2000000 / (1+0.04)^10
Bond Price = $2162217.916
The price of the bond is thus $2162290 approx. The difference in answers is due to rounding off.
