Homework Answers
11.
Compute the PVIFA at 8% and 20 years, using the equation as shown below:
PVIFA = {1 – (1 + Rate)-Number of periods}/ Rate
= {1 – (1 + 0.08)-20}/ 8%
= 9.81814740671
Hence, the PVIFA at 8% and 20 years is 9.81814740671.
Compute the annual payment of the loan, using the equation as shown below:
Annual payment = Loan value/ PVIFA8%, 20 years
= $165,000/ 9.81814740671
= $16,805.614457
Hence, the annual payment of the loan is $16,805.614457.
Compute the loan balance at the start of 2nd year, using the equation as shown below:
Loan balance = Loan amount + (Loan amount*Rate of interest) – Annual payment
= $165,000 + ($165,000*8%) - $16,805.614457
= $161,394.39
Hence, the loan balance at the start of 2nd year is $161,394.39.
12.
Compute the semi-annual discount rate, using the equation as shown below:
Semi-annual rate = Annual rate/ 2
= 6.8%/ 2
= 3.4%
Hence, the semi-annual rate is 3.4%.
Compute the PVIFA at 3.4% and 12 semi-annual payments, using the equation as shown below:
PVIFA = {1 – (1 + Rate)-Number of periods}/ Rate
= {1 – (1 + 0.034)-12}/ 3.4%
= 9.72045431848
Hence, the PVIFA at 3.4% and 12 half-years is 9.72045431848.
Compute the PVIF at 3.4% and 12 semi-annual payments, using the equation as shown below:
PVIF = 1/ (1 + Rate)Number of periods
= 1/ (1 + 0.034)12
= 1/ 1.49364182101
= 0.66950455312
Hence, the PVIF at 3.4% and 12 half-years is 0.66950455312.
Compute the price of 6 year bond, using the equation as shown below:
Price = (Interest*PVIFA3.4%, 12) + (Face value*PVIF3.4%, 12)
= ($40*9.72045431848) + ($1,000*0.66950455312)
= $1,058.32
Hence, the price of 6-year bond is $1,058.32.
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