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{{Financial markets}} | |||
'''Bond valuation''' is the determination of the [[fair price]] of a [[Bond (finance)|bond]]. As with any security or capital investment, the theoretical fair value of a bond is the [[present value]] of the stream of cash flows it is expected to generate. Hence, the value of a bond is obtained by discounting the bond's expected cash flows to the present using an appropriate [[discounted cash flow|discount rate]]. In practice, this discount rate is often determined by reference to similar instruments, provided that such instruments exist. Various related yield-measures are calculated for the given price. | |||
If the bond includes [[embedded option]]s, the valuation is more difficult and combines [[option pricing]] with discounting. Depending on the type of option, the [[option premium|option price]] as calculated is either added to or subtracted from the price of the "straight" portion. See [[Bond_option#Embedded_options|further]] under [[Bond option]]. This total is then the value of the bond. | |||
The | ==Bond valuation== | ||
<ref name ="Fabozzi"> Fabozzi, 1998</ref> | |||
As above, the fair price of a "straight bond" (a bond with no [[embedded option]]s; see [[Bond_(finance)#Features|Bond (finance)# Features]]) is usually determined by discounting its expected cash flows at the appropriate discount rate. The formula commonly applied is discussed initially. Although this present value relationship reflects the theoretical approach to determining the value of a bond, in practice its price is (usually) determined with reference to other, more [[liquidity|liquid]] instruments. The two main approaches here, Relative pricing and Arbitrage-free pricing, are discussed next. Finally, where it is important to recognise that future interest rates are uncertain and that the discount rate is not adequately represented by a single fixed number - for example [[Bond_option|when an option is written on the bond in question]] - stochastic calculus may be employed. | |||
Where the market price of bond is less than its face value (par value), the bond is selling at a '''discount'''. Conversely, if the market price of bond is greater than its face value, the bond is selling at a '''premium'''.<ref>http://www.investopedia.com/terms/a/amortizable-bond-premium.asp</ref> For this and other relationships between price and yield, see [[Bond_valuation#Yield_and_price_relationships|below]]. | |||
===Present value approach=== | |||
Below is the formula for calculating a bond's price, which uses the basic present value (PV) formula for a given discount rate:<ref>http://www.investopedia.com/university/advancedbond/advancedbond2.asp</ref> | |||
(This formula assumes that a coupon payment has just been made; see [[Bond_valuation#Clean_and_dirty_price|below]] for adjustments on other dates.) | |||
:<math>\begin{align}P | |||
&= \left(\frac{C}{1+i}+\frac{C}{(1+i)^2}+ ... +\frac{C}{(1+i)^N}\right) + \frac{M}{(1+i)^N}\\ | |||
&= \left(\sum_{n=1}^N\frac{C}{(1+i)^n}\right) + \frac{M}{(1+i)^N}\\ | |||
&= C\left(\frac{1-(1+i)^{-N}}{i}\right)+M(1+i)^{-N} | |||
\end{align} | |||
</math> | |||
:where: | |||
::F = face values | |||
::i<sub>F</sub> = contractual interest rate | |||
::C = F * i<sub>F</sub> = coupon payment (periodic interest payment) | |||
::N = number of payments | |||
::i = market interest rate, or required yield, or observed / appropriate [[yield to maturity]] (see [[Bond_valuation#Yield_to_Maturity|below]]) | |||
::M = value at maturity, usually equals face value | |||
::P = market price of bond. | |||
===Relative Price Approach=== | |||
Under this approach - an extension of the above - the bond will be priced relative to a benchmark, usually a [[Government bond|government security]]; see [[Relative valuation]]. Here, the yield to maturity on the bond is determined based on the bond's [[Credit rating]] relative to a government security with similar maturity or [[Bond duration|duration]]; see [[Credit spread (bond)]]. The better the quality of the bond, the smaller the spread between its required return and the YTM of the benchmark. This required return is then used to discount the bond cash flows, replacing <math>i</math> in the formula above, to obtain the price. | |||
===Arbitrage-free pricing approach=== | |||
:''See: [[Rational_pricing#Fixed_income_securities|Rational pricing: Fixed income securities]].'' | |||
As distinct from the two related approaches above, a bond may be thought of as a "package of cash flows" - coupon or face - with each cash flow viewed as a [[Zero-coupon bond|zero-coupon]] instrument maturing on the date it will be received. Thus, rather than using a single discount rate, one should use multiple discount rates, discounting each cash flow at its own rate.<ref name ="Fabozzi"/> Here, each cash flow is separately discounted at the same rate as a [[zero-coupon bond]] corresponding to the coupon date, and of equivalent credit worthiness (if possible, from the same issuer as the bond being valued, or if not, with the appropriate [[Credit spread (bond)|credit spread]]). | |||
Under this approach, the bond price should reflect its "[[arbitrage]]-free" price, as any deviation from this price will be exploited and the bond will then quickly reprice to its correct level. Here, we apply the [[rational pricing]] logic relating to [[Rational_pricing#Assets_with_identical_cash_flows|"Assets with identical cash flows"]]. In detail: (1) the bond's coupon dates and coupon amounts are known with certainty. Therefore (2) some multiple (or fraction) of zero-coupon bonds, each corresponding to the bond's coupon dates, can be specified so as to produce identical cash flows to the bond. Thus (3) the bond price today must be equal to the sum of each of its cash flows discounted at the discount rate implied by the value of the corresponding ZCB. Were this not the case, (4) the abitrageur could finance his purchase of whichever of the bond or the sum of the various ZCBs was cheaper, by [[short selling]] the other, and meeting his cash flow commitments using the coupons or maturing zeroes as appropriate. Then (5) his "risk free", arbitrage profit would be the difference between the two values. | |||
===Stochastic calculus approach=== | |||
When modelling a [[bond option]], or other [[interest rate derivative]] (IRD), it is important to recognize that future interest rates are uncertain, and therefore, the discount rate(s) referred to above, under all three cases - i.e. whether for all coupons or for each individual coupon - is not adequately represented by a fixed ([[deterministic]]) number. In such cases, [[stochastic calculus]] is employed. | |||
The following is a [[partial differential equation]] (PDE) in stochastic calculus which is satisfied by any zero-coupon bond. | |||
<math>\frac{1}{2}\sigma(r)^{2}\frac{\partial^2 P}{\partial r^2}+[a(r)+\sigma(r)+\varphi(r,t)]\frac{\partial P}{\partial r}+\frac{\partial P}{\partial t} - rP = 0</math> | |||
The solution to the PDE - given in <ref> [[John C. Cox]], [[Jonathan E. Ingersoll]] and [[Stephen A. Ross]] (1985). [http://www.javaquant.net/papers/CIR1985.pdf A Theory of the Term Structure of Interest Rates], ''[[Econometrica]]'' 53:2 </ref> - is: | |||
<math>P[t, T, r(t)] = E_t^{\ast}[e^{-R(t,T)}]</math> | |||
:where <math>E_t^{\ast}</math> is the expectation with respect to [[Risk-neutral measure|risk-neutral probabilities]], and <math>R(t,T)</math> is a random variable representing the discount rate; see also [[Martingale pricing]]. | |||
To actually determine the bond price, the analyst must choose the specific [[short rate model]] to be employed. The approaches commonly used are: | |||
*the [[CIR model]] | |||
*the [[Black-Derman-Toy model]] | |||
*the [[Hull-White model]] | |||
*the [[Heath–Jarrow–Morton framework|HJM framework]] | |||
*the [[Chen model]]. | |||
Note that depending on the model selected, a [[closed-form expression|closed-form solution]] may not be available, and a [[Lattice model (finance)|lattice-]] or [[Monte_Carlo_methods_in_finance#Overview|simulation-based]] implementation of the model in question is then employed. See also [[Jamshidian's trick]]. | |||
==Clean and dirty price== | |||
{{Main|Clean price|Dirty price}} | |||
When the bond is not valued precisely on a coupon date, the calculated price, using the methods above, will incorporate [[accrued interest]]: i.e. any interest due to the owner of the bond since the previous coupon date; see [[day count convention]]. The price of a bond which includes this accrued interest is known as the "[[dirty price]]" (or "full price" or "all in price" or "Cash price"). The "[[clean price]]" is the price excluding any interest that has accrued. Clean prices are generally more stable over time than dirty prices. This is because the dirty price will drop suddenly when the bond goes "ex interest" and the purchaser is no longer entitled to receive the next coupon payment. | |||
In many markets, it is market practice to quote bonds on a clean-price basis. When a purchase is settled, the accrued interest is added to the quoted clean price to arrive at the actual amount to be paid. | |||
==Yield and price relationships== | |||
Once the price or value has been calculated, various [[yield (finance)|yields]] relating the price of the bond to its coupons can then be determined. | |||
===Yield to Maturity=== | |||
The [[yield to maturity]] is the discount rate which returns the [[market price]] of a bond without embedded optionality; it is identical to <math>i</math> (required return) in the [[Bond_valuation#Present_value_approach|above equation]]. YTM is thus the [[internal rate of return]] of an investment in the bond made at the observed price. Since YTM can be used to price a bond, bond prices are often quoted in terms of YTM. | |||
To achieve a return equal to YTM, i.e. where it is the required return on the bond, the bond owner must: | |||
* buy the bond at price P<sub>0</sub>, | |||
* hold the bond until maturity, and | |||
* redeem the bond at par. | |||
===Coupon yield=== | |||
The [[Coupon (bond)|coupon yield]] is simply the coupon payment (<math>C</math>) as a percentage of the face value (<math>F</math>). | |||
:<math>Coupon yield = \frac{C}{F}</math> | |||
Coupon yield is also called [[nominal yield]]. | |||
===Current yield=== | |||
The [[current yield]] is simply the coupon payment (C) as a percentage of the (''current'') bond price (P). | |||
:Current yield = <math> C / P_0. </math> | |||
===Relationship=== | |||
The concept of current yield is closely related to other bond concepts, including yield to maturity, and coupon yield. The relationship between yield to maturity and the coupon rate is as follows: | |||
* When a bond sells at a discount, YTM > current yield > coupon yield. | |||
* When a bond sells at a premium, coupon yield > current yield > YTM. | |||
* When a bond sells at par, YTM = current yield = coupon yield | |||
==Price sensitivity== | |||
{{main|Bond duration|Bond convexity}} | |||
The [[Sensitivity analysis|sensitivity]] of a bond's market price to interest rate (i.e. yield) movements is measured by its [[Bond duration|duration]], and, additionally, by its [[Bond convexity|convexity]]. | |||
Duration is a [[linear|linear measure]] of how the price of a bond changes in response to interest rate changes. It is approximately equal to the percentage change in price for a given change in yield, and may be thought of as the [[Elasticity (economics)|elasticity]] of the bond's price with respect to discount rates. For example, for small interest rate changes, the duration is the approximate percentage by which the value of the bond will fall for a 1% per annum increase in market interest rate. So the market price of a 17-year bond with a duration of 7 would fall about 7% if the market interest rate (or more precisely the corresponding [[force of interest]]) increased by 1% per annum. | |||
Convexity is a measure of the "curvature" of price changes. It is needed because the price is not a linear function of the discount rate, but rather a [[convex function]] of the discount rate. Specifically, duration can be formulated as the [[first derivative]] of the price with respect to the interest rate, and convexity as the [[second derivative]] (see: [[Bond duration closed-form formula]]; [[Bond convexity closed-form formula]]). Continuing the above example, for a more accurate estimate of sensitivity, the convexity score would be multiplied by the square of the change in interest rate, and the result added to the value derived by the above linear formula. | |||
==Accounting treatment== | |||
In [[accounting]] for [[Long-term liabilities|liabilities]], any bond discount or premium must be [[Accrual|amortized]] over the life of the bond. A number of methods may be used for this depending on applicable accounting rules. One possibility is that amortization amount in each period is calculated from the following formula: | |||
<math>n\in\{0,1, ... ,N-1\}</math> | |||
<math>a_{n+1}</math> = amortization amount in period number "n+1" | |||
<math>a_{n+1}=|iP-C|{(1+i)}^n</math> | |||
Bond Discount or Bond Premium = <math>|F-P|</math> = <math>a_1+a_2+ ... + a_N</math> | |||
Bond Discount or Bond Premium = <math>F|i-i_F|(\frac{1-(1+i)^{-N}}{i})</math> | |||
==See also== | |||
*[[Bond duration]] | |||
*[[Bond convexity]] | |||
*[[Yield to maturity]] | |||
*[[coupon yield]] | |||
*[[current yield]] | |||
*[[Clean price]] | |||
*[[Dirty price]] | |||
*[[Bond option]] | |||
*[[Option-adjusted spread]] | |||
==References and external links== | |||
'''References''' | |||
<references/> | |||
'''Bibliography'''<!-- alphabetical by author --> | |||
*{{cite book | title = Bonds, a Step by Step Analysis with Excel, [http://www.amazon.com/Bonds-Analysis-Excel-Chapter-ebook/dp/B008D4PRIU Chapter 1: Pricing and Return] | author = Guillermo L. Dumrauf | publisher = Kindle Edition| year = 2012|}} | |||
*{{cite book | title = Valuation of fixed income securities and derivatives | author = [[Frank Fabozzi]] | publisher = [[John Wiley & Sons|John Wiley]]| year = 1998| edition = 3rd| isbn = 978-1-883249-25-0}} | |||
*{{cite book | title = Fixed Income Mathematics: Analytical & Statistical Techniques | author =Frank J. Fabozzi | publisher = John Wiley| year = 2005| edition = 4th| isbn = 978-0071460736}} | |||
*{{cite book | title = Bond Evaluation, Selection, and Management| author = R. Stafford Johnson| publisher = John Wiley| year = 2010| edition = 2nd| isbn = 0470478357}} | |||
*{{cite book | title = Bond Math: The Theory Behind the Formulas | author = Donald J. Smith | publisher = John Wiley|year = 2011| edition = | isbn = 1576603067}} | |||
*{{cite book | title = Fixed Income Securities: Tools for Today's Markets | author =Bruce Tuckman | publisher = John Wiley|year = 2011| edition = 3rd| isbn = 0470891696}} | |||
*{{cite book | title = Fixed Income Securities: Valuation, Risk, and Risk Management | author =Pietro Veronesi | publisher = John Wiley|year = 2010| edition = | isbn = 978-0470109106}} | |||
'''Discussion''' | |||
*[http://www.duke.edu/~charvey/Classes/ba350/bondval/bondval.htm Bond Valuation], Prof. Campbell R. Harvey, [[Duke University]] | |||
*[http://pages.stern.nyu.edu/~adamodar/New_Home_Page/PVPrimer/pvprimer.htm A Primer on the Time Value of Money], Prof. [[Aswath Damodaran]], [[Stern School of Business]] | |||
*[http://www.wfu.edu/~palmitar/Law&Valuation/chapter%204/4-2-2.htm Basic Bond Valuation] Prof. Alan R. Palmiter, [[Wake Forest University]] | |||
*[http://www.iassa.co.za/images/file/IASJournals/no501999Lwabona.pdf Bond Price Volatility] [[Investment Analysts Society of South Africa]] | |||
*[http://www.iassa.co.za/images/file/IASJournals/No512000Lwabona.pdf Duration and convexity] Investment Analysts Society of South Africa | |||
'''Calculators''' | |||
*[http://www.investinginbonds.com/calcs/tipscalculator/TipsCalcForm.aspx General-Purpose Bond Calculator], [[Securities Industry and Financial Markets Association]] | |||
*[http://www.wfu.edu/~palmitar/Law&Valuation/chapter%204/Attachments/Worksheet-BondPrices.xls Bond Price] [[Microsoft Excel|Excel]] [[spreadsheet]], Prof. Alan R. Palmiter, [[Wake Forest University]] | |||
*[http://www.mngt.waikato.ac.nz/kurt/frontpage/ModelsAcademic/ExcelModels/Bond%20Price%20with%20Excel%20Functions.xls Bond Pricing and Duration] Excel spreadsheet, Prof. Kurt Hess, Waikato Management School, [[University of Waikato]] | |||
{{Bond market}} | |||
{{DEFAULTSORT:Bond Valuation}} | |||
[[Category:Bonds (finance)]] | |||
[[Category:Fixed income analysis]] |
Revision as of 02:31, 20 October 2013
Template:Financial markets Bond valuation is the determination of the fair price of a bond. As with any security or capital investment, the theoretical fair value of a bond is the present value of the stream of cash flows it is expected to generate. Hence, the value of a bond is obtained by discounting the bond's expected cash flows to the present using an appropriate discount rate. In practice, this discount rate is often determined by reference to similar instruments, provided that such instruments exist. Various related yield-measures are calculated for the given price.
If the bond includes embedded options, the valuation is more difficult and combines option pricing with discounting. Depending on the type of option, the option price as calculated is either added to or subtracted from the price of the "straight" portion. See further under Bond option. This total is then the value of the bond.
Bond valuation
[1] As above, the fair price of a "straight bond" (a bond with no embedded options; see Bond (finance)# Features) is usually determined by discounting its expected cash flows at the appropriate discount rate. The formula commonly applied is discussed initially. Although this present value relationship reflects the theoretical approach to determining the value of a bond, in practice its price is (usually) determined with reference to other, more liquid instruments. The two main approaches here, Relative pricing and Arbitrage-free pricing, are discussed next. Finally, where it is important to recognise that future interest rates are uncertain and that the discount rate is not adequately represented by a single fixed number - for example when an option is written on the bond in question - stochastic calculus may be employed.
Where the market price of bond is less than its face value (par value), the bond is selling at a discount. Conversely, if the market price of bond is greater than its face value, the bond is selling at a premium.[2] For this and other relationships between price and yield, see below.
Present value approach
Below is the formula for calculating a bond's price, which uses the basic present value (PV) formula for a given discount rate:[3] (This formula assumes that a coupon payment has just been made; see below for adjustments on other dates.)
- where:
- F = face values
- iF = contractual interest rate
- C = F * iF = coupon payment (periodic interest payment)
- N = number of payments
- i = market interest rate, or required yield, or observed / appropriate yield to maturity (see below)
- M = value at maturity, usually equals face value
- P = market price of bond.
Relative Price Approach
Under this approach - an extension of the above - the bond will be priced relative to a benchmark, usually a government security; see Relative valuation. Here, the yield to maturity on the bond is determined based on the bond's Credit rating relative to a government security with similar maturity or duration; see Credit spread (bond). The better the quality of the bond, the smaller the spread between its required return and the YTM of the benchmark. This required return is then used to discount the bond cash flows, replacing in the formula above, to obtain the price.
Arbitrage-free pricing approach
As distinct from the two related approaches above, a bond may be thought of as a "package of cash flows" - coupon or face - with each cash flow viewed as a zero-coupon instrument maturing on the date it will be received. Thus, rather than using a single discount rate, one should use multiple discount rates, discounting each cash flow at its own rate.[1] Here, each cash flow is separately discounted at the same rate as a zero-coupon bond corresponding to the coupon date, and of equivalent credit worthiness (if possible, from the same issuer as the bond being valued, or if not, with the appropriate credit spread).
Under this approach, the bond price should reflect its "arbitrage-free" price, as any deviation from this price will be exploited and the bond will then quickly reprice to its correct level. Here, we apply the rational pricing logic relating to "Assets with identical cash flows". In detail: (1) the bond's coupon dates and coupon amounts are known with certainty. Therefore (2) some multiple (or fraction) of zero-coupon bonds, each corresponding to the bond's coupon dates, can be specified so as to produce identical cash flows to the bond. Thus (3) the bond price today must be equal to the sum of each of its cash flows discounted at the discount rate implied by the value of the corresponding ZCB. Were this not the case, (4) the abitrageur could finance his purchase of whichever of the bond or the sum of the various ZCBs was cheaper, by short selling the other, and meeting his cash flow commitments using the coupons or maturing zeroes as appropriate. Then (5) his "risk free", arbitrage profit would be the difference between the two values.
Stochastic calculus approach
When modelling a bond option, or other interest rate derivative (IRD), it is important to recognize that future interest rates are uncertain, and therefore, the discount rate(s) referred to above, under all three cases - i.e. whether for all coupons or for each individual coupon - is not adequately represented by a fixed (deterministic) number. In such cases, stochastic calculus is employed.
The following is a partial differential equation (PDE) in stochastic calculus which is satisfied by any zero-coupon bond.
The solution to the PDE - given in [4] - is:
- where is the expectation with respect to risk-neutral probabilities, and is a random variable representing the discount rate; see also Martingale pricing.
To actually determine the bond price, the analyst must choose the specific short rate model to be employed. The approaches commonly used are:
- the CIR model
- the Black-Derman-Toy model
- the Hull-White model
- the HJM framework
- the Chen model.
Note that depending on the model selected, a closed-form solution may not be available, and a lattice- or simulation-based implementation of the model in question is then employed. See also Jamshidian's trick.
Clean and dirty price
Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. When the bond is not valued precisely on a coupon date, the calculated price, using the methods above, will incorporate accrued interest: i.e. any interest due to the owner of the bond since the previous coupon date; see day count convention. The price of a bond which includes this accrued interest is known as the "dirty price" (or "full price" or "all in price" or "Cash price"). The "clean price" is the price excluding any interest that has accrued. Clean prices are generally more stable over time than dirty prices. This is because the dirty price will drop suddenly when the bond goes "ex interest" and the purchaser is no longer entitled to receive the next coupon payment. In many markets, it is market practice to quote bonds on a clean-price basis. When a purchase is settled, the accrued interest is added to the quoted clean price to arrive at the actual amount to be paid.
Yield and price relationships
Once the price or value has been calculated, various yields relating the price of the bond to its coupons can then be determined.
Yield to Maturity
The yield to maturity is the discount rate which returns the market price of a bond without embedded optionality; it is identical to (required return) in the above equation. YTM is thus the internal rate of return of an investment in the bond made at the observed price. Since YTM can be used to price a bond, bond prices are often quoted in terms of YTM.
To achieve a return equal to YTM, i.e. where it is the required return on the bond, the bond owner must:
- buy the bond at price P0,
- hold the bond until maturity, and
- redeem the bond at par.
Coupon yield
The coupon yield is simply the coupon payment () as a percentage of the face value ().
Coupon yield is also called nominal yield.
Current yield
The current yield is simply the coupon payment (C) as a percentage of the (current) bond price (P).
Relationship
The concept of current yield is closely related to other bond concepts, including yield to maturity, and coupon yield. The relationship between yield to maturity and the coupon rate is as follows:
- When a bond sells at a discount, YTM > current yield > coupon yield.
- When a bond sells at a premium, coupon yield > current yield > YTM.
- When a bond sells at par, YTM = current yield = coupon yield
Price sensitivity
Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. The sensitivity of a bond's market price to interest rate (i.e. yield) movements is measured by its duration, and, additionally, by its convexity.
Duration is a linear measure of how the price of a bond changes in response to interest rate changes. It is approximately equal to the percentage change in price for a given change in yield, and may be thought of as the elasticity of the bond's price with respect to discount rates. For example, for small interest rate changes, the duration is the approximate percentage by which the value of the bond will fall for a 1% per annum increase in market interest rate. So the market price of a 17-year bond with a duration of 7 would fall about 7% if the market interest rate (or more precisely the corresponding force of interest) increased by 1% per annum.
Convexity is a measure of the "curvature" of price changes. It is needed because the price is not a linear function of the discount rate, but rather a convex function of the discount rate. Specifically, duration can be formulated as the first derivative of the price with respect to the interest rate, and convexity as the second derivative (see: Bond duration closed-form formula; Bond convexity closed-form formula). Continuing the above example, for a more accurate estimate of sensitivity, the convexity score would be multiplied by the square of the change in interest rate, and the result added to the value derived by the above linear formula.
Accounting treatment
In accounting for liabilities, any bond discount or premium must be amortized over the life of the bond. A number of methods may be used for this depending on applicable accounting rules. One possibility is that amortization amount in each period is calculated from the following formula:
= amortization amount in period number "n+1"
Bond Discount or Bond Premium = =
Bond Discount or Bond Premium =
See also
- Bond duration
- Bond convexity
- Yield to maturity
- coupon yield
- current yield
- Clean price
- Dirty price
- Bond option
- Option-adjusted spread
References and external links
References
Bibliography
- 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534
Discussion
- Bond Valuation, Prof. Campbell R. Harvey, Duke University
- A Primer on the Time Value of Money, Prof. Aswath Damodaran, Stern School of Business
- Basic Bond Valuation Prof. Alan R. Palmiter, Wake Forest University
- Bond Price Volatility Investment Analysts Society of South Africa
- Duration and convexity Investment Analysts Society of South Africa
Calculators
- General-Purpose Bond Calculator, Securities Industry and Financial Markets Association
- Bond Price Excel spreadsheet, Prof. Alan R. Palmiter, Wake Forest University
- Bond Pricing and Duration Excel spreadsheet, Prof. Kurt Hess, Waikato Management School, University of Waikato