Exam 4: Time Value of Money

A) Exactly 10% of the first monthly payment represents interest.
B) The monthly payments will increase over time.
C) A larger proportion of the first monthly payment will be interest, and a smaller proportion will be principal, than for the last monthly payment.
D) The total dollar amount of interest being paid off each month gets larger as the loan approaches maturity.
E) The amount representing interest in the first payment would be higher if the nominal interest rate were 7% rather than 10%.

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A) 8.24%
B) 8.45%
C) 8.66%
D) 8.88%
E) 9.10%

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A) 15.27%
B) 16.08%
C) 16.88%
D) 17.72%
E) 18.61%

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A) $5,493.71
B) $5,782.85
C) $6,087.21
D) $6,407.59
E) $6,744.83

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A) $271.74
B) $286.05
C) $301.10
D) $316.16
E) $331.96

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A) 3.82%
B) 4.25%
C) 4.72%
D) 5.24%
E) 5.77%

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A) 22
B) 23
C) 24
D) 25
E) 26

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A) The PV of the $1,000 lump sum has a higher present value than the PV of a 3-year, $333.33 ordinary annuity.
B) The periodic interest rate is greater than 3%.
C) The periodic rate is less than 3%.
D) The present value would be greater if the lump sum were discounted back for more periods.
E) The present value of the $1,000 would be smaller if interest were compounded monthly rather than semiannually.

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A) 39.60
B) 44.00
C) 48.40
D) 53.24
E) 58.57

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A) $16,576
B) $17,449
C) $18,367
D) $19,334
E) $20,352

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A) An investment that has a nominal rate of 6% with semiannual payments will have an effective rate that is smaller than 6%.
B) The present value of a 3-year, $150 ordinary annuity will exceed the present value of a 3-year, $150 annuity due.
C) If a loan has a nominal annual rate of 7%, then the effective rate will never be less than 7%.
D) If a loan or investment has annual payments, then the effective, periodic, and nominal rates of interest will all be different.
E) The proportion of the payment that goes toward interest on a fully amortized loan increases over time.

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A) If some cash flows occur at the beginning of the periods while others occur at the ends, then we have what the textbook defines as a variable annuity.
B) The cash flows for an ordinary (or deferred) annuity all occur at the beginning of the periods.
C) If a series of unequal cash flows occurs at regular intervals, such as once a year, then the series is by definition an annuity.
D) The cash flows for an annuity due must all occur at the ends of the periods.
E) The cash flows for an annuity must all be equal, and they must occur at regular intervals, such as once a year or once a month.

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A) 9.29
B) 10.33
C) 11.47
D) 12.75
E) 14.02

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A) $18,369
B) $19,287
C) $20,251
D) $21,264
E) $22,327

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A) The PV of the $1,000 lump sum has a smaller present value than the PV of a 3-year, $333.33 ordinary annuity.
B) The periodic interest rate is greater than 3%.
C) The periodic rate is less than 3%.
D) The present value would be greater if the lump sum were discounted back for more periods.
E) The present value of the $1,000 would be larger if interest were compounded monthly rather than semiannually.

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A) An account that pays 8% nominal interest with daily (365-day) compounding.
B) An account that pays 8% nominal interest with monthly compounding.
C) An account that pays 8% nominal interest with annual compounding.
D) An account that pays 7% nominal interest with daily (365-day) compounding.
E) An account that pays 7% nominal interest with monthly compounding.

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