Measures for Fixed-Rate Bonds and Floa ...
Yield Measures for Fixed-rate Bonds Fixed-rate bonds are those that pay the same... Read More
A forward rate is the interest rate on a loan beginning at some time in the future. A spot rate, on the other hand, is the interest rate on a loan beginning immediately. Therefore, the forward market rate is for future delivery after the usual settlement time in the cash market.
Forward rates on bonds or money market instruments are traded in forward markets. For instance, let’s assume that in a cash market, a 4-year zero-coupon bond is priced at 85 on a par value of 100. On a semi-annual bond basis, the yield-to-maturity is 4.105%.
$$85=\frac { 100 }{ (1+r)^{ 8 } } ;\quad r=2.052%×2=4.105\%$$
The most common market practice is to name forward rates by, for instance, “2y5y”, which means “2-year into 5-year rate”. The first number refers to the length of the forward period from today while the second number refers to the tenor or time-to-maturity of the underlying bond.
Implied forward rates (forward yields) are calculated from spot rates. The general formula for the relationship between the two spot rates and the implied forward rate is:
$$ (1+Z_A)^A×(1+IFR_{A,B-A} )^{B-A}=(1+Z_B )^B $$
Where IFRA,B-A is the implied forward rate between time A and time B.
Suppose the yields-to-maturity on a 3-year and 4-year zero coupon bonds are 3.5% and 4% on a semi-annual basis. The “3y1y” implies that the forward rate could be calculated as follows:
A = 6 periods
B = 8 periods
B − A = 2 periods
z6 = 0.035/2 = 0.0175
z8 = 0.04/2 = 0.02
$$ (1+0.0175)^6×(1+IFR_{6,2} )^2=(1+0.02)^8$$
=> IFR6,2 = 0.0275
The “3y1y” implies that the forward rate or forward yield is 5.50% (0.0275% × 2).
Question
Suppose the current forward curve for 1-year rates is 0y1y=2%, 1y1y=3%, and 2y1y=3.75%. The 2-year and 3-year implied spot rates are:
- 1% and 0.75%, respectively.
- 2.75% and 2%, respectively.
- 2.5% and 2.91%, respectively.
Solution
The correct answer is C.
The 2-year and 3-year implied spot rates are 2.5% and 2.91%, respectively.
(1.02 × 1.03) = (1+z2)2; z2= 0.0250
(1.02 × 1.03 × 1.0375) = (1+z3)3; z3= 0.0291