Answers to Chapter 23 Questions
... increases and decreases. That is, if the FI loses value on the bond resulting from an interest rate increase, it enjoys a gain on the futures contract to offset this loss. If the FI gains value on the bond due to an interest rate decrease, a loss on the futures contract offsets this gain. By compari ...
... increases and decreases. That is, if the FI loses value on the bond resulting from an interest rate increase, it enjoys a gain on the futures contract to offset this loss. If the FI gains value on the bond due to an interest rate decrease, a loss on the futures contract offsets this gain. By compari ...
chapter overview
... The longer that it takes for the owner of a bond to receive interest and principal payments, the greater is the owner’s exposure to interest rate risk. This is true for two reasons. First, bonds with longer terms to maturity expose the owner to risk of capital losses stemming from unexpected interes ...
... The longer that it takes for the owner of a bond to receive interest and principal payments, the greater is the owner’s exposure to interest rate risk. This is true for two reasons. First, bonds with longer terms to maturity expose the owner to risk of capital losses stemming from unexpected interes ...
L4 bond1 - people.bath.ac.uk
... Treasury securities are issued with maturity 2, 3, 5, 7, 10 and 30 years Treasury bills. Short-term securities with a maturity period of up to one year. They do not pay coupons. Holders receive the face amount at maturity. Treasury notes: Medium-term securities that have a maturity between 2 and 10 ...
... Treasury securities are issued with maturity 2, 3, 5, 7, 10 and 30 years Treasury bills. Short-term securities with a maturity period of up to one year. They do not pay coupons. Holders receive the face amount at maturity. Treasury notes: Medium-term securities that have a maturity between 2 and 10 ...
Bond Prices and Yields Bond Characteristics Treasury Notes and
... PB = Price of the bond Ct = interest or coupon payments T = number of periods to maturity r = semisemi-annual discount rate or the semisemi-annual yield to maturity ...
... PB = Price of the bond Ct = interest or coupon payments T = number of periods to maturity r = semisemi-annual discount rate or the semisemi-annual yield to maturity ...
Chapter 10
... – Upward slope means that the market is expecting higher future short term rates – Downward slope means that the market is expecting lower future short term rates ...
... – Upward slope means that the market is expecting higher future short term rates – Downward slope means that the market is expecting lower future short term rates ...
Bond duration
In finance, the duration of a financial asset that consists of fixed cash flows, for example a bond, is the weighted average of the times until those fixed cash flows are received.When an asset is considered as a function of yield, duration also measures the price sensitivity to yield, the rate of change of price with respect to yield or the percentage change in price for a parallel shift in yields.The dual use of the word ""duration"", as both the weighted average time until repayment and as the percentage change in price, often causes confusion. Strictly speaking, Macaulay duration is the name given to the weighted average time until cash flows are received, and is measured in years. Modified duration is the name given to the price sensitivity and is the percentage change in price for a unit change in yield. Both measures are termed ""duration"" and have the same (or close to the same) numerical value, but it is important to keep in mind the conceptual distinctions between them. Macaulay duration is a time measure with units in years, and really makes sense only for an instrument with fixed cash flows. For a standard bond the Macaulay duration will be between 0 and the maturity of the bond. It is equal to the maturity if and only if the bond is a zero-coupon bond.Modified duration, on the other hand, is a derivative (rate of change) or price sensitivity and measures the percentage rate of change of price with respect to yield. (Price sensitivity with respect to yields can also be measured in absolute (dollar) terms, and the absolute sensitivity is often referred to as dollar duration, DV01, BPV, or delta (δ or Δ) risk). The concept of modified duration can be applied to interest-rate sensitive instruments with non-fixed cash flows, and can thus be applied to a wider range of instruments than can Macaulay duration. Modified duration is used more than Macaulay duration.For every-day use, the equality (or near-equality) of the values for Macaulay and modified duration can be a useful aid to intuition. For example a standard ten-year coupon bond will have Macaulay duration somewhat but not dramatically less than 10 years and from this we can infer that the modified duration (price sensitivity) will also be somewhat but not dramatically less than 10%. Similarly, a two-year coupon bond will have Macaulay duration somewhat below 2 years, and modified duration somewhat below 2%. (For example a ten-year 5% par bond has a modified duration of 7.8% while a two-year 5% par bond has a modified duration of 1.9%.)