Calculate the Price of a Bond Using Sp ...
The price of a fixed-rate bond will fluctuate whenever the market discount rate changes. This relationship could be summarized as follows:
However, the percentage price change is greater in absolute value when the market discount rate goes down than when it is up due to the convexity effect. We will see why this is true when we learn to interpret and calculate convexity in the reading on Understanding Fixed-Income Risk and Return.
When a bond is redeemed at maturity, the bondholder receives the bond’s par value from the issuer. As a result, the price of the bond converges (moves closer) to the par value as the bond nears maturity. It is actually easy to see why this happens. As maturity nears, bondholders are almost assured of receiving the par amount and will not part ways with the bond unless offered a price closer to the par value. Buyers are also unwilling to pay much of a premium for a bond nearing maturity because they stand to receive only the par value when the bond is redeemed.
Generally, all factors constant, the price of a longer-term bond is more volatile than that of a shorter-term bond. Think of a company that has issued a 30-year bond. There are high chances that interest rates, and hence bond prices, will vary quite a bit throughout the 30-year period. The price of a bond that matures in a few months would show less price volatility as interest rates are unlikely to change a lot in such a short period of time. Besides, with a short-term bond, bondholders are almost assured of being paid off.
When the coupon rate is greater than the market discount rate, the bond is priced at a premium above par value. Conversely, when the coupon rate is less than the market discount rate, the bond is priced at a discount below par value.
All else equal, the price of a lower coupon bond is more volatile than that of a higher coupon bond. The smaller the coupon, the greater the interest rate risk
Question
A bond’s price is forecast to increase by 4% if the market discount rate decreases by 100 basis points. If the bond market’s discount rate increases by the same amount, the bond price will most likely change by:
- 4%.
- Less than 4%
- More than 4%
Solution
The correct answer is B.
The bond price is most likely to change by less than 4% as the relationship between the bond’s price and the market discount rate is not linear (convexity effect).