Problem 1: Calculate the annual internal rates of return (IRR) for the following investments (time t is in years):
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At t = 0, the cost is $100. The cash flows are $100 at t = 1 and $250 at t = 3.
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At t = 0, the cost is $150. The cash flows are $100 at t = 1 and $250 at t = 3.
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At t = 0, the cost is $100. The cash flows are $100 at t = 1 and $250 at t = 2.
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At t = 0, the cost is $100. The cash flows are $250 at t = 1 and $100 at t = 3.
Which of these investments has the highest IRR? Why?
Problem 2: Consider a 10-year bond that pays a 5 percent coupon semi-annually with a face value of $1000.
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What is the price of this bond if the annualized yield to maturity of 4 percent (i.e., the stated rate is .04 compounded semi-annually)?
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What is the price of this bond if the annualized yield to maturity of 5 percent (i.e., the stated rate is .05 compounded semi-annually)?
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What is the price of this bond if the annualized yield to maturity of 6 percent (i.e., the stated rate is .06 compounded semi-annually)?
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What is the price of this bond if the annualized effective rate is 5 percent?
Problem 3: Consider the bond described in Problem 2 above but let the coupon be paid annually. Answer questions a through c in Problem 2 above for this annual coupon paying bond.
Problem 4: The price of a 10-year zero-coupon bond is $670 per $1000 in face value.
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What is its yield to maturity on this bond?
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If you buy this 10-year bond today (at t = 0) for $670, hold it for 5 years, and sell it then (when it is a 5-year zero) for $850, what is your holding period yield? If this happens, will the yield to maturity when you sell this bond be higher or lower than its current yield to maturity?
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What price would this bond current 10-year zero have to sell for in 5 years for the holding period yield to be its current yield to maturity?