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Volatility and interest rate risk: Without regular interest payments to cushion price fluctuations, zero-coupon bonds are more volatile than short-term bonds. In general, the current value of any ...
A zero-coupon bond (also discount bond or deep discount bond) is a bond in which the face value is repaid at the time of maturity. [1] Unlike regular bonds, it does not make periodic interest payments or have so-called coupons , hence the term zero-coupon bond.
For example, if a zero-coupon bond with a $20,000 face value and a 20-year term pays 5.5% interest, the interest rate is knocked off the purchase price and the bond might sell for $7,000.
The coupon rate is recalculated periodically, typically every one or three months. Zero-coupon bonds (zeros) pay no regular interest. They are issued at a substantial discount to par value, so that the interest is effectively rolled up to maturity (and usually taxed as such). The bondholder receives the full principal amount on the redemption ...
The zero-coupon bond will have the highest sensitivity, changing at a rate of 9.76% per 100bp change in yield. This means that if yields go up from 5% to 5.01% (a rise of 1bp) the price should fall by roughly 0.0976% or a change in price from $61.0271 per $100 notional to roughly $60.968.
Zero-coupon bonds are those that pay no coupons and thus have a coupon rate of 0%. [ 6 ] [ 7 ] Such bonds make only one payment: the payment of the face value on the maturity date. Normally, to compensate the bondholder for the time value of money , the price of a zero-coupon bond will always be less than its face value on any date of purchase ...
The prevailing interest rate stays the same as the bond’s coupon rate. The par value is set at 100, which means that buyers will pay the full price for the bond. The prevailing interest rates ...
Given: 0.5-year spot rate, Z1 = 4%, and 1-year spot rate, Z2 = 4.3% (we can get these rates from T-Bills which are zero-coupon); and the par rate on a 1.5-year semi-annual coupon bond, R3 = 4.5%. We then use these rates to calculate the 1.5 year spot rate. We solve the 1.5 year spot rate, Z3, by the formula below: