An Introduction to the Mathematics of Finance A Deterministic Approach Second Edition S. J. Garrett Published for the Institute and Faculty of Actuaries (RC000243) http://www.actuaries.org.uk Amsterdam (cid:1)Boston (cid:1) Heidelberg (cid:1)London New York (cid:1) Oxford (cid:1) Paris (cid:1) SanDiego SanFrancisco (cid:1) Singapore (cid:1) Sydney (cid:1) Tokyo Butterworth-HeinemannisanImprintofElsevier Butterworth-HeinemannisanimprintofElsevier TheBoulevard,LangfordLane,Kidlington,Oxford,OX51GB 225WymanStreet,Waltham,MA02451,USA Firstedition1989 Secondedition2013 Copyright(cid:1)2013InstituteandFacultyofActuaries(RC000243).PublishedbyElsevierLtd.Allrightsreserved. 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BritishLibraryCataloguinginPublicationData AcataloguerecordforthisbookisavailablefromtheBritishLibrary LibraryofCongressCataloguinginPublicationData AcatalogrecordforthisbookisavailablefromtheLibraryofCongress ISBN:978-0-08-098240-3 ForinformationonallButterworth-Heinemannpublications visitourwebsiteatstore.elsevier.com PrintedandboundintheUnitedKingdom 13141516 10987654321 Dedication DedicatedtoAdamandMatthewGarrett,mytwogreatest achievements. Preface This book is a revision of the original An Introduction to the Mathematics of FinancebyJ.J.McCutcheonandW.F.Scott.Thesubjectoffinancialmathematics hasexpandedimmenselysincethepublicationofthatfirsteditioninthe1980s, and the aim of this second edition is to update the content for the modern audience. Despite the recent advances in stochastic models within financial mathematics, the book remains concerned almost entirely with deterministic approaches.Thereasonforthisistwofold.Firstly,manyreaderswillfindasolid understanding of deterministic methods within the classical theory of compound interest entirely sufficient for their needs. This group of readers is likely to include economists, accountants, and general business practitioners. Secondly, readers intending to study towards an advanced understanding of financial mathematics need to start with the fundamental concept of compoundinterest.Suchreadersshouldtreatthisasanintroductorytext.Care hasbeentakentopointtowardsareaswherestochasticconceptswilllikelybe developedinlaterstudies;indeed,Chapters10,11,and12areintendedasan introduction to the fundamentals and application of modern financial math- ematics in the broader sense. The book is primarily aimed at readers who are preparing for university or professional examinations. The material presented here now covers the entire CT1syllabusoftheInstituteandFacultyofActuaries(asat2013)andalsosome materialrelevanttotheCT8andST5syllabuses.Thiscombinationofmaterial correspondstotheFM-FinancialMathematicssyllabusoftheSocietyofActuaries. Furthermore,studentsoftheCFAInstitutewillfindthisbookusefulinsupport ofvariousaspectsoftheirstudies.Withexampreparationinmind,thissecond editionincludesmanypastexaminationquestionsfromtheInstituteandFaculty of Actuaries andthe CFAInstitute, with worked solutions. The book is necessarily mathematical, but I hope not too mathematical. It is expectedthatreadershaveasolidunderstandingofcalculus,linearalgebra,and probability,buttoalevelnohigherthanwouldbeexpectedfromastrongfirst yearundergraduateinanumeratesubject.Thatisnottosaythematerialiseasy, xi xii Preface ratherthedifficultyarisesfromthesheerbreathofapplicationandtheperhaps unfamiliarreal-world contexts. Whereappropriate,additionalmaterialinthiseditionhasbeenbasedoncore readingmaterialfromtheInstituteandFacultyofActuaries,andIamgratefulto Dr.TrevorWatkinsforpermissiontousethis.IamalsogratefultoLauraClarke andSallyCalderoftheInstituteandFacultyofActuariesfortheirhelp,notleastin sourcing relevant past examination questions from their archives. I am also gratefultoKathleenPaoniandDr.J.ScottBentleyofElsevierforsupportingme inmyfirstventureintotheworldoftextbooks.Ialsowishtoacknowledgethe entertainingcompanyofmygoodfriendandcolleagueDr.AndrewMcMullan of the University of Leicester on the numerous coffee breaks between writing. Thiseditionhasbenefittedhugelyfromcommentsmadebyundergraduateand postgraduate students enrolled on my modules An Introduction to Actuarial MathematicsandTheoryofInterestattheUniversityofLeicesterin2012.Particular mention should be given to the eagle eyes of Fern Dyer, George Hodgson- Abbott, Hitesh Gohel, Prashray Khaire, Yueh-Chin Lin, Jian Li, and Jianjian Shao, who pointed out numerous typos in previous drafts. Any errors that remain are of course entirely my fault. Thislistofacknowledgementswouldnotbecompletewithoutspecialmention of my wife, Yvette, who puts up with my constant working and occasional grumpiness.Yvette is aconstant supporter ofeverything Ido, andI could not havedonethis, or indeed much else, without her. Dr.Stephen J.Garrett DepartmentofMathematics,UniversityofLeicester January2013 CHAPTER 1 Introduction 1.1 THE CONCEPT OF INTEREST CONTENTS Interestmayberegardedasarewardpaidbyonepersonororganization(the 1.1 TheConceptof Interest..........1 borrower) for the use of an asset, referred to as capital, belonging to another person or organization (the lender). The precise conditions of any 1.2 Simple transactionwillbemutuallyagreed.Forexample,afterastatedperiodoftime, Interest..........2 thecapitalmaybereturnedtothelenderwiththeinterestdue.Alternatively, 1.3 Compound severalinterestpaymentsmaybemadebeforetheborrowerfinallyreturnsthe Interest..........4 asset. 1.4 Some Practical Illustrations...6 Capitalandinterestneednotbemeasuredintermsofthesamecommodity,but throughoutthisbook,whichrelatesprimarilytoproblemsofafinancialnature, Summary..............9 weshallassumethatbotharemeasuredinthemonetaryunitsofagivencurrency. Whenexpressedinmonetaryterms,capitalisalsoreferredtoasprincipal. Ifthereissomeriskofdefault(i.e.,lossofcapitalornon-paymentofinterest), alenderwouldexpecttobepaidahigherrateofinterestthanwouldotherwise bethecase;thisadditionalinterestisknownastheriskpremium.Theadditional interest in such a situation may be considered as a further reward for the lender’s acceptance of the increased risk. For example, a person who uses his moneytofinancethedrillingforoilinapreviouslyunexplored regionwould expectarelativelyhighreturnonhisinvestmentifthedrillingissuccessful,but mighthavetoacceptthelossofhiscapitalifnooilweretobefound.Afurther factorthatmayinfluencetherateofinterestonanytransactionisanallowance for the possible depreciation or appreciation in the value of the currency in whichthetransactioniscarriedout.Thisfactorisobviouslyveryimportantin times of high inflation. Itisconvenienttodescribetheoperationofinterestwithinthefamiliarcontext of a savings account, held in a bank, building society, or other similar orga- nization.Aninvestorwhohadopenedsuchanaccountsometimeagowithan initial depositof£100,andwho hadmadeno otherpaymentstoor fromthe account,wouldexpecttowithdrawmorethan£100ifhewerenowtoclosethe account. Suppose, for example, that he receives £106 on closing his account. 1 AnIntroductiontotheMathematicsofFinance.http://dx.doi.org/10.1016/B978-0-08-098240-3.00001-1 (cid:1)2013InstituteandFacultyofActuaries(RC000243).PublishedbyElsevierLtd.Allrightsreserved. 2 CHAPTER 1: Introduction This sum may be regarded as consisting of £100 as the return of the initial depositand£6asinterest.Theinterestisapaymentbythebanktotheinvestor for the use ofhis capital over the durationof the account. The most elementary concept is that of simple interest. This naturally leads to the idea of compound interest, which is much more commonly found in practice in relation to all but short-term investments. Both concepts are easily described within the framework of a savings account, as described in the following sections. 1.2 SIMPLE INTEREST Supposethataninvestoropensasavingsaccount,whichpayssimpleinterestat the rate of 9% per annum, with a single deposit of £100. The account will be credited with £9 of interest for each complete year the money remains on deposit.Iftheaccountisclosedafter1year,theinvestorwillreceive£109;ifthe account is closed after 2 years, he will receive £118, and so on. This may be summarizedmore generallyas follows. IfanamountCisdepositedinanaccountthatpayssimpleinterestattherateof iperannumandtheaccountisclosedafternyears(therebeingnointervening paymentstoorfromtheaccount),thentheamountpaidtotheinvestorwhen the account is closed willbe Cð1þniÞ (1.2.1) ThispaymentconsistsofareturnoftheinitialdepositC,togetherwithinterest of amount niC (1.2.2) Inourdiscussionsofar,wehaveimplicitlyassumedthat,ineachoftheselast two expressions, n is an integer. However, the normal commercial practice in relationtofractionalperiodsofayearistopayinterestonaproratabasis,so that Eqs 1.2.1 and 1.2.2 may be considered as applying for all non-negative values ofn. Notethatiftheannualrateofinterestis12%,theni¼0.12perannum;ifthe annualrate ofinterest is 9%, then i¼0.09 per annum; andso on. Note that in the solution to Example1.2.1,wehaveassumedthat6months and 10 months are periods of 1/2 and 10/12 of 1 year, respectively. For accounts of duration less than 1 year, it is usual to allow for the actual numberofdaysanaccountisheld,so,forexample,two6-monthperiodsare not necessarily regarded as being of equal length. In this case Eq. 1.2.1 becomes 1.2 Simple Interest 3 EEEXXXAAAMMMPPPLLLEEE 111...222...111 Suppose that £860 is deposited in a savings account that 1 in Eq. 1.2.1 with C¼860 and i¼0.05375, we obtain the pays simple interest at the rate of 5:375% per annum. answers Assuming that there are no subsequent payments to or (a) £883.11, from the account,find the amountfinally withdrawn if the (b) £898.52, accountisclosedafter (c) £906.23. (a) 6months, Ineachcasewehavegiventheanswertotwodecimalplaces (b) 10months, of one pound, rounded down. This is quite common in (c) 1year. commercialpractice. Solution Theinterestrateisgivenasaperannumvalue;therefore,n mustbemeasuredinyears.Bylettingn¼6/12,10/12,and EEEXXXAAAMMMPPPLLLEEE 111...222...222 (cid:1) (cid:3) 30 Calculatethepriceofa30-day£2,000treasurybillissued £2;000 1(cid:2) (cid:3)0:05 ¼ £1;991:78 365 by the government at a simple rate of discount of 5% per annum. The investor has received interest of £8.22 under this Solution transaction. Byissuingthetreasurybill,thegovernmentisborrowingan amountequaltothepriceofthebill.Inreturn,itpays£2,000 after30days.Thepriceisgivenby (cid:1) (cid:3) mi C 1þ (1.2.3) 365 where misthe duration ofthe account, measuredin days, andiisthe annual rate of interest. Theessentialfeatureofsimpleinterest,asexpressedalgebraicallybyEq.1.2.1, isthatinterest,oncecreditedtoanaccount,doesnotitselfearnfurtherinterest. This leads to inconsistencies that are avoided by the application of compound interest theory, as discussed in Section 1.3. Asaresultoftheseinconsistencies,simpleinteresthaslimitedpracticaluse,and this book will, necessarily, focus on compound interest. However, an impor- tant commercial application of simple interest is simple discount, which is commonly used for short-term loan transactions, i.e., up to 1 year. Under 4 CHAPTER 1: Introduction simplediscount,theamountlentisdeterminedbysubtractingadiscountfrom theamountdueatthelaterdate.Ifalenderbaseshisshort-termtransactionson asimplerateofdiscountd,then,inreturnforarepaymentofXafteraperiodt (typically t<1), he will lend X(1(cid:2)td) at the start of the period. In this situa- tion,d is also knownas arate of commercial discount. 1.3 COMPOUND INTEREST Supposenowthatacertaintypeofsavingsaccountpayssimpleinterestatthe rate of i per annum. Suppose further that this rate is guaranteed to apply throughoutthenext2yearsandthataccountsmaybeopenedandclosedatany time. Consider an investor who opens an account at the present time (t¼0) with an initial deposit of C. The investor may close this account after 1 year (t¼1),atwhichtime hewillwithdraw C(1þi)(seeEq.1.2.1).Hemaythen placethissumondepositinanewaccountandclosethissecondaccountafter onefurtheryear(t¼2).Whenthislatteraccountisclosed,thesumwithdrawn (again see Eq. 1.2.1)willbe ½Cð1þiÞ(cid:4)(cid:3)ð1þiÞ ¼ Cð1þiÞ2 ¼ Cð1þ2iþi2Þ If,however,theinvestorchoosesnottoswitchaccountsafter1yearandleaveshis moneyintheoriginalaccount,onclosingthisaccountafter2years,hewillreceive C(1 þ 2i). Therefore, simply by switching accounts in the middle of the 2-year period, the investor will receive an additional amount i2C at the end of the period.Thisextrapaymentis,ofcourse,equaltoi(iC)andarisesasinterestpaid (att¼2)ontheinterestcreditedtotheoriginalaccountattheendofthefirstyear. From a practical viewpoint, it would be difficult to prevent an investor switching accounts in the manner described here (or with even greater frequency). Furthermore, the investor, having closed his second account after 1year,couldthendeposittheentireamountwithdrawninyetanotheraccount. Any bank would find it administratively very inconvenient to have to keep opening and closing accounts in the manner just described. Moreover, on closingoneaccount,theinvestormightchoosetodeposithismoneyelsewhere. Therefore, partly to encourage long-term investment and partly for other practical reasons, it is common commercial practice (at least in relation to investments of duration greater than 1 year) to pay compound interest on savings accounts. Moreover, the concepts of compound interest are used in the assessment and evaluation of investments as discussed throughout this book. Theessentialfeatureofcompoundinterestisthatinterestitselfearnsinterest.The operation of compound interest may be described as follows: consider a savings account, which pays compound interest at rate i per annum, into 1.3 Compound Interest 5 whichisplacedaninitialdepositCattimet¼0.(Weassumethatthereareno furtherpayments to or from the account.) If the account is closed after 1 year (t¼1)theinvestorwillreceiveC(1þi).Moregenerally,letA betheamount n thatwillbereceivedbytheinvestorifheclosestheaccountafternyears(t¼n). ItisclearthatA ¼C(1þi).Bydefinition,theamountreceivedbythe investor 1 onclosingtheaccountattheendofanyyearisequaltotheamounthewould havereceivedifhehadclosedtheaccount1yearpreviouslyplusfurtherinterest ofitimesthisamount.Theinterestcreditedtotheaccountuptothestartofthe finalyearitselfearnsinterest(atrateiperannum)overthefinalyear.Expressed algebraically, this definition becomes Anþ1 ¼ AnþiAn or Anþ1 ¼ ð1þiÞAn n(cid:5)1 (1.3.1) Since, by definition, A ¼C(1þi),Eq.1.3.1 implies that,for n¼1, 2, . . ., 1 A ¼ Cð1þiÞn (1.3.2) n Therefore, if the investorcloses the account after nyears, he willreceive Cð1þiÞn (1.3.3) This payment consists of a return of the initial deposit C, together with accu- mulatedinterest(i.e.,interestwhich,ifn>1,hasitselfearnedfurtherinterest) ofamount C½ð1þiÞn(cid:2)1(cid:4) (1.3.4) Inourdiscussionsofar,wehaveassumedthatinboththeselastexpressionsnis aninteger.However,inChapter2wewillwidenthediscussionandshowthat, under very general conditions, Eqs 1.3.3 and 1.3.4 remain valid for all non- negativevaluesof n. Since ½Cð1þiÞt1(cid:4)ð1þiÞt2 ¼ Cð1þiÞt1þt2 an investor who is able to switch his money between two accounts, both of which pay compound interest at the same rate, is not able to profit by such action.Thisisincontrastwiththesomewhatanomaloussituation,describedat the beginning ofthis section, which may occur if simple interest is paid. Equations 1.3.3 and 1.3.4 should be compared with the corresponding expressionsundertheoperationofsimpleinterest(i.e.,Eqs1.2.1and1.2.2).If interestcompounds(i.e.,earnsfurtherinterest),theeffectontheaccumulationof anaccountcan be verysignificant,especially if the duration of the account or
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