Solutions FINAL EXAM 2002 SPRING Sridhar Seshadri B
|
|
- Claribel Bailey
- 5 years ago
- Views:
Transcription
1 Solutions FINAL EXAM 22 SPRING Sridhar Seshadri B Answer all questions. Answer questions and 2 before attempting question 3. The exam is closed book and closed notes (except for 4 pages of notes). Please write clearly, be brief, and show all steps for calculations. If I have asked for an explation no credit will be given for that part unless the explation is correct. Question carries 65 points, question 2 has 35 points. Question 3 has bonus points.. Consider a binomial stock price model with parameters u =.3, d =.77, S =, and T = 3. (The figures for u and d are rounded; assume still that u = /d ). The interest rate is r =.2. a. Compute the price process of an American put option with strike price e = 9. What is the optimal exercising time? (2 pts.) Most students got this correct. If t= price incorrect took off 2 points. Stock Price Process t= t= t=2 t= American Put Price Process r.2 q u.3 u t= t= t=2 t= Early exercise optimal at time =, price = 7.7
2 b. Compute the price process of an up and out call option on the same stock as above with barrier k = and e = 3. This option is similar to a usual call option except that if the historical maximum price of the stock is larger than then the up and out call pays nothing at expiry. Give your result in a tree form. Verify that the time zero price can be written as the expected discounted value of a contingent claim at time 3 (in other words verify that the pricing formula, V = E Q [X/B 3 ] for some appropriate contingent claim X. (5 pts.) t= t= t=2 t= If did not get the out part correct took off 5 points. X = 4.7 w.p. 2 x q (-q)^2 and w.p. (-q)^3 Thus time zero price = (4.7 x 2 x.83 x x.7 3 )/(.2) 3 Many students lost one point because they used 3 q (-q)^2 but the option pays only on two paths, and is out on one of the three paths (at t=). b.is the American put option in part (a) attaible? If so compute the replicating trading strategy. Carefully show the value of the portfolio corresponding to this TS, the gain, the discounted value of the portfolio and the discounted gain all on a tree. What do you conclude from the tree of discounted gains? (2 pts.) Each TS was worth 5 points (there is one TS at t=, one at t=, and two at t=2). H Time = H Cost H H Cost.2553 Time= Stock Price = 3 H Time=2 H Stock Price = Cost
3 The gain calculations were worth 5 points. Gain Disctd Gain Based on above I believe that a risk averse person should sell the option at time and liquidate the portfolio too. 2. In this model we have a single risky security with prices (not discounted) shown below. The interest rate is assumed to be % for the first period, but % if S =8.8 and 9% if S =3.2. Consider the chooser option with t =, T = 2, and e =, i.e., at time the buyer can decide whether the option will be a call or a put option with expiry 2 and strike price
4 rnpm rnpm t= t= put q.5 q2.5.3 t= t=2 t= t= t= 2.74 chooser call a. What decision should the buyer make at time if S = 8.8? What should be the decision if S = 3.2? (5 pts.) Each rnpm carried 3 points. There are 3 rnpm calculations. Keep put if price falls else keep call. b. Compute the price process for the above chooser option (time, and 2 prices). Give your results in a tree form. Is this price process a Q-martingale, explain? (5 pts.) It (the discounted price) is a Q-MTG as the price process is that of a t=3 CC. c. Calculate and show the time zero, time one and time two future and forward price of the stock for delivery at time 2. Is any of the prices a Q-martingale (explain or show briefly why or why not)? (5 pts.) future forward Future price process is a Q-MTG. (one point) Forward price process is not a Q-MTG. (one point) 4
5 3. Short questions ( points) a. Use the tree for question 2. A firm is thinking about issuing a convertible bond. The bond will yield an interest rate equal to that period s interest rate. The interest is paid each period. The face value of the bond at time zero equals $. The holder of this bond has the option to either exchange it for one unit of the stock at time or not to exchange it (thus keep the bond until time period 2). What should be the fair price of the convertible bond at time zero? We keep bond if price = 8.8 else convert. Payoffs are: $ if stock price = 8.8 and $4.2 if stock price = $3.2. Discounted value at t= is: (.5* +.5*4.2)/. = $.45 This is just like a chooser pricing method. Keep the more valuable object! b. Use the tree for question 2. What is the fair time-zero price of the contingent claim that pays $ at time 2? What is the relationship between this price and the forward price for time-2 delivery of the stock at time zero? Explain. The t= price = $.5 + $.5 = Now $/ = $.998 which is the forward price. The reason this is so either one can buy the stock at t= or arrange for getting the forward price with probability one at t=3 (for which one pays the forward price multiplied by.83345) and exchange it for the stock at t=2. Both the strategies are equivalent and should have the same price. The explation was worth 2 points. Happy Summer!! 5
MULTIPLE CHOICE QUESTIONS
Name: M375T=M396D Introduction to Actuarial Financial Mathematics Spring 2013 University of Texas at Austin Sample In-Term Exam Two: Pretest Instructor: Milica Čudina Notes: This is a closed book and closed
More informationNotes: This is a closed book and closed notes exam. The maximal score on this exam is 100 points. Time: 75 minutes
M375T/M396C Introduction to Financial Mathematics for Actuarial Applications Spring 2013 University of Texas at Austin Sample In-Term Exam II - Solutions This problem set is aimed at making up the lost
More informationNotes: This is a closed book and closed notes exam. The maximal score on this exam is 100 points. Time: 75 minutes
M339D/M389D Introduction to Financial Mathematics for Actuarial Applications University of Texas at Austin Sample In-Term Exam II - Solutions Instructor: Milica Čudina Notes: This is a closed book and
More informationFIN 451 Exam Answers, November 8, 2007
FIN 45 Exam Answers, November 8, 007 Phil Dybvig This is a closed-book examination. Answer all questions as directed. Mark your answers directly on the examination. On the valuation question, make sure
More information1b. Write down the possible payoffs of each of the following instruments separately, and of the portfolio of all three:
Fi8000 Quiz #3 - Example Part I Open Questions 1. The current price of stock ABC is $25. 1a. Write down the possible payoffs of a long position in a European put option on ABC stock, which expires in one
More informationCorporate Finance, Module 21: Option Valuation. Practice Problems. (The attached PDF file has better formatting.) Updated: July 7, 2005
Corporate Finance, Module 21: Option Valuation Practice Problems (The attached PDF file has better formatting.) Updated: July 7, 2005 {This posting has more information than is needed for the corporate
More informationCash Flows on Options strike or exercise price
1 APPENDIX 4 OPTION PRICING In general, the value of any asset is the present value of the expected cash flows on that asset. In this section, we will consider an exception to that rule when we will look
More informationMartingale Pricing Theory in Discrete-Time and Discrete-Space Models
IEOR E4707: Foundations of Financial Engineering c 206 by Martin Haugh Martingale Pricing Theory in Discrete-Time and Discrete-Space Models These notes develop the theory of martingale pricing in a discrete-time,
More informationDerivative Securities Fall 2012 Final Exam Guidance Extended version includes full semester
Derivative Securities Fall 2012 Final Exam Guidance Extended version includes full semester Our exam is Wednesday, December 19, at the normal class place and time. You may bring two sheets of notes (8.5
More informationExotic Options. Chapter 19. Types of Exotics. Packages. Non-Standard American Options. Forward Start Options
Exotic Options Chapter 9 9. Package Nonstandard American options Forward start options Compound options Chooser options Barrier options Types of Exotics 9.2 Binary options Lookback options Shout options
More informationACT370H1S - TEST 2 - MARCH 25, 2009
ACT370H1S - TEST 2 - MARCH 25, 2009 Write name and student number on each page. Write your solution for each question in the space provided. Do all calculations to at least 6 significant figures. The only
More informationNotes: This is a closed book and closed notes exam. The maximal score on this exam is 100 points. Time: 75 minutes
M375T/M396C Introduction to Financial Mathematics for Actuarial Applications Spring 2013 University of Texas at Austin Sample In-Term Exam II Post-test Instructor: Milica Čudina Notes: This is a closed
More informationAppendix: Basics of Options and Option Pricing Option Payoffs
Appendix: Basics of Options and Option Pricing An option provides the holder with the right to buy or sell a specified quantity of an underlying asset at a fixed price (called a strike price or an exercise
More informationd St+ t u. With numbers e q = The price of the option in three months is
Exam in SF270 Financial Mathematics. Tuesday June 3 204 8.00-3.00. Answers and brief solutions.. (a) This exercise can be solved in two ways. i. Risk-neutral valuation. The martingale measure should satisfy
More informationBinomial Trees. Liuren Wu. Options Markets. Zicklin School of Business, Baruch College. Liuren Wu (Baruch ) Binomial Trees Options Markets 1 / 22
Binomial Trees Liuren Wu Zicklin School of Business, Baruch College Options Markets Liuren Wu (Baruch ) Binomial Trees Options Markets 1 / 22 A simple binomial model Observation: The current stock price
More informationMATH3075/3975 FINANCIAL MATHEMATICS TUTORIAL PROBLEMS
MATH307/37 FINANCIAL MATHEMATICS TUTORIAL PROBLEMS School of Mathematics and Statistics Semester, 04 Tutorial problems should be used to test your mathematical skills and understanding of the lecture material.
More informationInstitute of Actuaries of India. Subject. ST6 Finance and Investment B. For 2018 Examinationspecialist Technical B. Syllabus
Institute of Actuaries of India Subject ST6 Finance and Investment B For 2018 Examinationspecialist Technical B Syllabus Aim The aim of the second finance and investment technical subject is to instil
More informationECON FINANCIAL ECONOMICS
ECON 337901 FINANCIAL ECONOMICS Peter Ireland Boston College Fall 2017 These lecture notes by Peter Ireland are licensed under a Creative Commons Attribution-NonCommerical-ShareAlike 4.0 International
More informationPricing theory of financial derivatives
Pricing theory of financial derivatives One-period securities model S denotes the price process {S(t) : t = 0, 1}, where S(t) = (S 1 (t) S 2 (t) S M (t)). Here, M is the number of securities. At t = 1,
More informationMicroeconomic Theory II Spring 2016 Final Exam Solutions
Microeconomic Theory II Spring 206 Final Exam Solutions Warning: Brief, incomplete, and quite possibly incorrect. Mikhael Shor Question. Consider the following game. First, nature (player 0) selects t
More informationB.4 Solutions to Exam MFE/3F, Spring 2009
SOLUTIONS TO EXAM MFE/3F, SPRING 29, QUESTIONS 1 3 775 B.4 Solutions to Exam MFE/3F, Spring 29 The questions for this exam may be downloaded from http://www.soa.org/files/pdf/edu-29-5-mfe-exam.pdf 1. [Section
More information( 0) ,...,S N ,S 2 ( 0)... S N S 2. N and a portfolio is created that way, the value of the portfolio at time 0 is: (0) N S N ( 1, ) +...
No-Arbitrage Pricing Theory Single-Period odel There are N securities denoted ( S,S,...,S N ), they can be stocks, bonds, or any securities, we assume they are all traded, and have prices available. Ω
More informationCorrelations and Structured Products: Basket Derivatives and Certificates
Correlations and Structured Products: Basket Derivatives and Certificates Proff. Manuela Pedio 20541 Advanced Tools for Risk Management and Pricing Spring 2018 Multi-Underlyings Structured Products Until
More informationDynamic Portfolio Choice II
Dynamic Portfolio Choice II Dynamic Programming Leonid Kogan MIT, Sloan 15.450, Fall 2010 c Leonid Kogan ( MIT, Sloan ) Dynamic Portfolio Choice II 15.450, Fall 2010 1 / 35 Outline 1 Introduction to Dynamic
More informationErrata and updates for ASM Exam MFE/3F (Ninth Edition) sorted by page.
Errata for ASM Exam MFE/3F Study Manual (Ninth Edition) Sorted by Page 1 Errata and updates for ASM Exam MFE/3F (Ninth Edition) sorted by page. Note the corrections to Practice Exam 6:9 (page 613) and
More informationMathematics of Finance Final Preparation December 19. To be thoroughly prepared for the final exam, you should
Mathematics of Finance Final Preparation December 19 To be thoroughly prepared for the final exam, you should 1. know how to do the homework problems. 2. be able to provide (correct and complete!) definitions
More informationOptions and Derivatives
Options and Derivatives For 9.220, Term 1, 2002/03 02_Lecture17 & 18.ppt Student Version Outline 1. Introduction 2. Option Definitions 3. Option Payoffs 4. Intuitive Option Valuation 5. Put-Call Parity
More informationSolutions to Midterm Exam. ECON Financial Economics Boston College, Department of Economics Spring Tuesday, March 19, 10:30-11:45am
Solutions to Midterm Exam ECON 33790 - Financial Economics Peter Ireland Boston College, Department of Economics Spring 209 Tuesday, March 9, 0:30 - :5am. Profit Maximization With the production function
More informationHull, Options, Futures & Other Derivatives Exotic Options
P1.T3. Financial Markets & Products Hull, Options, Futures & Other Derivatives Exotic Options Bionic Turtle FRM Video Tutorials By David Harper, CFA FRM 1 Exotic Options Define and contrast exotic derivatives
More informationStats243 Introduction to Mathematical Finance
Stats243 Introduction to Mathematical Finance Haipeng Xing Department of Statistics Stanford University Summer 2006 Stats243, Xing, Summer 2007 1 Agenda Administrative, course description & reference,
More informationErrata and updates for ASM Exam MFE (Tenth Edition) sorted by page.
Errata for ASM Exam MFE Study Manual (Tenth Edition) Sorted by Page 1 Errata and updates for ASM Exam MFE (Tenth Edition) sorted by page. Practice Exam 9:18 and 10:26 are defective. [4/3/2017] On page
More informationECON FINANCIAL ECONOMICS
ECON 337901 FINANCIAL ECONOMICS Peter Ireland Boston College Spring 2018 These lecture notes by Peter Ireland are licensed under a Creative Commons Attribution-NonCommerical-ShareAlike 4.0 International
More informationINSTITUTE OF ACTUARIES OF INDIA
INSTITUTE OF ACTUARIES OF INDIA EXAMINATIONS 10 th November 2008 Subject CT8 Financial Economics Time allowed: Three Hours (14.30 17.30 Hrs) Total Marks: 100 INSTRUCTIONS TO THE CANDIDATES 1) Please read
More informationMASM006 UNIVERSITY OF EXETER SCHOOL OF ENGINEERING, COMPUTER SCIENCE AND MATHEMATICS MATHEMATICAL SCIENCES FINANCIAL MATHEMATICS.
MASM006 UNIVERSITY OF EXETER SCHOOL OF ENGINEERING, COMPUTER SCIENCE AND MATHEMATICS MATHEMATICAL SCIENCES FINANCIAL MATHEMATICS May/June 2006 Time allowed: 2 HOURS. Examiner: Dr N.P. Byott This is a CLOSED
More information1. 2 marks each True/False: briefly explain (no formal proofs/derivations are required for full mark).
The University of Toronto ACT460/STA2502 Stochastic Methods for Actuarial Science Fall 2016 Midterm Test You must show your steps or no marks will be awarded 1 Name Student # 1. 2 marks each True/False:
More informationPortfolio Management
Portfolio Management 010-011 1. Consider the following prices (calculated under the assumption of absence of arbitrage) corresponding to three sets of options on the Dow Jones index. Each point of the
More informationBinomial Trees. Liuren Wu. Zicklin School of Business, Baruch College. Options Markets
Binomial Trees Liuren Wu Zicklin School of Business, Baruch College Options Markets Binomial tree represents a simple and yet universal method to price options. I am still searching for a numerically efficient,
More informationP2.T5. Tuckman Chapter 7 The Science of Term Structure Models. Bionic Turtle FRM Video Tutorials. By: David Harper CFA, FRM, CIPM
P2.T5. Tuckman Chapter 7 The Science of Term Structure Models Bionic Turtle FRM Video Tutorials By: David Harper CFA, FRM, CIPM Note: This tutorial is for paid members only. You know who you are. Anybody
More informationFixed-Income Analysis. Assignment 7
FIN 684 Professor Robert B.H. Hauswald Fixed-Income Analysis Kogod School of Business, AU Assignment 7 Please be reminded that you are expected to use contemporary computer software to solve the following
More informationFNCE 302, Investments H Guy Williams, 2008
Sources http://finance.bi.no/~bernt/gcc_prog/recipes/recipes/node7.html It's all Greek to me, Chris McMahon Futures; Jun 2007; 36, 7 http://www.quantnotes.com Put Call Parity THIS IS THE CALL-PUT PARITY
More informationMATH4143: Scientific Computations for Finance Applications Final exam Time: 9:00 am - 12:00 noon, April 18, Student Name (print):
MATH4143 Page 1 of 17 Winter 2007 MATH4143: Scientific Computations for Finance Applications Final exam Time: 9:00 am - 12:00 noon, April 18, 2007 Student Name (print): Student Signature: Student ID: Question
More informationFINANCIAL MATHEMATICS WITH ADVANCED TOPICS MTHE7013A
UNIVERSITY OF EAST ANGLIA School of Mathematics Main Series UG Examination 2016 17 FINANCIAL MATHEMATICS WITH ADVANCED TOPICS MTHE7013A Time allowed: 3 Hours Attempt QUESTIONS 1 and 2, and THREE other
More informationMATH 361: Financial Mathematics for Actuaries I
MATH 361: Financial Mathematics for Actuaries I Albert Cohen Actuarial Sciences Program Department of Mathematics Department of Statistics and Probability C336 Wells Hall Michigan State University East
More informationAttempt QUESTIONS 1 and 2, and THREE other questions. Do not turn over until you are told to do so by the Invigilator.
UNIVERSITY OF EAST ANGLIA School of Mathematics Main Series UG Examination 2016 17 FINANCIAL MATHEMATICS MTHE6026A Time allowed: 3 Hours Attempt QUESTIONS 1 and 2, and THREE other questions. Notes are
More informationA NOVEL BINOMIAL TREE APPROACH TO CALCULATE COLLATERAL AMOUNT FOR AN OPTION WITH CREDIT RISK
A NOVEL BINOMIAL TREE APPROACH TO CALCULATE COLLATERAL AMOUNT FOR AN OPTION WITH CREDIT RISK SASTRY KR JAMMALAMADAKA 1. KVNM RAMESH 2, JVR MURTHY 2 Department of Electronics and Computer Engineering, Computer
More informationMFE/3F Questions Answer Key
MFE/3F Questions Download free full solutions from www.actuarialbrew.com, or purchase a hard copy from www.actexmadriver.com, or www.actuarialbookstore.com. Chapter 1 Put-Call Parity and Replication 1.01
More information1.15 (5) a b c d e. ?? (5) a b c d e. ?? (5) a b c d e. ?? (5) a b c d e FOR GRADER S USE ONLY: DEF T/F ?? M.C.
Name: M339W/389W Financial Mathematics for Actuarial Applications University of Texas at Austin The Prerequisite In-Term Exam Instructor: Milica Čudina Notes: This is a closed book and closed notes exam.
More informationCHAPTER 17 OPTIONS AND CORPORATE FINANCE
CHAPTER 17 OPTIONS AND CORPORATE FINANCE Answers to Concept Questions 1. A call option confers the right, without the obligation, to buy an asset at a given price on or before a given date. A put option
More informationFinance 651: PDEs and Stochastic Calculus Midterm Examination November 9, 2012
Finance 65: PDEs and Stochastic Calculus Midterm Examination November 9, 0 Instructor: Bjørn Kjos-anssen Student name Disclaimer: It is essential to write legibly and show your work. If your work is absent
More informationThe discounted portfolio value of a selffinancing strategy in discrete time was given by. δ tj 1 (s tj s tj 1 ) (9.1) j=1
Chapter 9 The isk Neutral Pricing Measure for the Black-Scholes Model The discounted portfolio value of a selffinancing strategy in discrete time was given by v tk = v 0 + k δ tj (s tj s tj ) (9.) where
More informationFinance 651: PDEs and Stochastic Calculus Midterm Examination November 9, 2012
Finance 651: PDEs and Stochastic Calculus Midterm Examination November 9, 2012 Instructor: Bjørn Kjos-anssen Student name Disclaimer: It is essential to write legibly and show your work. If your work is
More informationMFE/3F Questions Answer Key
MFE/3F Questions Download free full solutions from www.actuarialbrew.com, or purchase a hard copy from www.actexmadriver.com, or www.actuarialbookstore.com. Chapter 1 Put-Call Parity and Replication 1.01
More informationHomework Assignments
Homework Assignments Week 1 (p 57) #4.1, 4., 4.3 Week (pp 58-6) #4.5, 4.6, 4.8(a), 4.13, 4.0, 4.6(b), 4.8, 4.31, 4.34 Week 3 (pp 15-19) #1.9, 1.1, 1.13, 1.15, 1.18 (pp 9-31) #.,.6,.9 Week 4 (pp 36-37)
More informationIntroduction. Financial Economics Slides
Introduction. Financial Economics Slides Howard C. Mahler, FCAS, MAAA These are slides that I have presented at a seminar or weekly class. The whole syllabus of Exam MFE is covered. At the end is my section
More informationEcon 422 Eric Zivot Fall 2005 Final Exam
Econ 422 Eric Zivot Fall 2005 Final Exam This is a closed book exam. However, you are allowed one page of notes (double-sided). Answer all questions. For the numerical problems, if you make a computational
More informationExotic Derivatives & Structured Products. Zénó Farkas (MSCI)
Exotic Derivatives & Structured Products Zénó Farkas (MSCI) Part 1: Exotic Derivatives Over the counter products Generally more profitable (and more risky) than vanilla derivatives Why do they exist? Possible
More informationLecture 16: Delta Hedging
Lecture 16: Delta Hedging We are now going to look at the construction of binomial trees as a first technique for pricing options in an approximative way. These techniques were first proposed in: J.C.
More informationB8.3 Week 2 summary 2018
S p VT u = f(su ) S T = S u V t =? S t S t e r(t t) 1 p VT d = f(sd ) S T = S d t T time Figure 1: Underlying asset price in a one-step binomial model B8.3 Week 2 summary 2018 The simplesodel for a random
More information******************************* The multi-period binomial model generalizes the single-period binomial model we considered in Section 2.
Derivative Securities Multiperiod Binomial Trees. We turn to the valuation of derivative securities in a time-dependent setting. We focus for now on multi-period binomial models, i.e. binomial trees. This
More informationName: 2.2. MULTIPLE CHOICE QUESTIONS. Please, circle the correct answer on the front page of this exam.
Name: M339D=M389D Introduction to Actuarial Financial Mathematics University of Texas at Austin In-Term Exam II Extra problems Instructor: Milica Čudina Notes: This is a closed book and closed notes exam.
More informationBinomial Option Pricing
Binomial Option Pricing The wonderful Cox Ross Rubinstein model Nico van der Wijst 1 D. van der Wijst Finance for science and technology students 1 Introduction 2 3 4 2 D. van der Wijst Finance for science
More informationUniversity of North Carolina at Charlotte Mathematical Finance Program Comprehensive Exam. Spring, 2013
University of North Carolina at Charlotte Mathematical Finance Program Comprehensive Exam Spring, 2013 Directions: This exam consists of 8 questions. In order to pass the exam, you must answer each question.
More informationIn general, the value of any asset is the present value of the expected cash flows on
ch05_p087_110.qxp 11/30/11 2:00 PM Page 87 CHAPTER 5 Option Pricing Theory and Models In general, the value of any asset is the present value of the expected cash flows on that asset. This section will
More informationStatistics Class 15 3/21/2012
Statistics Class 15 3/21/2012 Quiz 1. Cans of regular Pepsi are labeled to indicate that they contain 12 oz. Data Set 17 in Appendix B lists measured amounts for a sample of Pepsi cans. The same statistics
More informationLecture 16. Options and option pricing. Lecture 16 1 / 22
Lecture 16 Options and option pricing Lecture 16 1 / 22 Introduction One of the most, perhaps the most, important family of derivatives are the options. Lecture 16 2 / 22 Introduction One of the most,
More informationThe Recovery Theorem* Steve Ross
2015 Award Ceremony and CFS Symposium: What Market Prices Tell Us 24 September 2015, Frankfurt am Main The Recovery Theorem* Steve Ross Franco Modigliani Professor of Financial Economics MIT Managing Partner
More informationSimon Fraser University Spring 2014
Simon Fraser University Spring 2014 Econ 302 D200 Final Exam Solution This brief solution guide does not have the explanations necessary for full marks. NE = Nash equilibrium, SPE = subgame perfect equilibrium,
More information= e S u S(0) From the other component of the call s replicating portfolio, we get. = e 0.015
Name: M339D=M389D Introduction to Actuarial Financial Mathematics University of Texas at Austin In-Term Exam II Extra problems Instructor: Milica Čudina Notes: This is a closed book and closed notes exam.
More informationLockbox Separation. William F. Sharpe June, 2007
Lockbox Separation William F. Sharpe June, 2007 Introduction This note develops the concept of lockbox separation for retirement financial strategies in a complete market. I show that in such a setting
More informationUniversity of North Carolina at Charlotte Mathematical Finance Program Comprehensive Exam. Spring, 2014
University of North Carolina at Charlotte Mathematical Finance Program Comprehensive Exam Spring, 2014 Directions: This exam consists of 8 questions. In order to pass the exam, you must answer each question.
More informationValuation of Options: Theory
Valuation of Options: Theory Valuation of Options:Theory Slide 1 of 49 Outline Payoffs from options Influences on value of options Value and volatility of asset ; time available Basic issues in valuation:
More informationB6302 B7302 Sample Placement Exam Answer Sheet (answers are indicated in bold)
B6302 B7302 Sample Placement Exam Answer Sheet (answers are indicated in bold) Part 1: Multiple Choice Question 1 Consider the following information on three mutual funds (all information is in annualized
More informationReview of Derivatives I. Matti Suominen, Aalto
Review of Derivatives I Matti Suominen, Aalto 25 SOME STATISTICS: World Financial Markets (trillion USD) 2 15 1 5 Securitized loans Corporate bonds Financial institutions' bonds Public debt Equity market
More informationM3F22/M4F22/M5F22 EXAMINATION SOLUTIONS
M3F22/M4F22/M5F22 EXAMINATION SOLUTIONS 2016-17 Q1: Limited liability; bankruptcy; moral hazard. Limited liability. All business transactions involve an exchange of goods or services between a willing
More informationLecture Quantitative Finance Spring Term 2015
and Lecture Quantitative Finance Spring Term 2015 Prof. Dr. Erich Walter Farkas Lecture 06: March 26, 2015 1 / 47 Remember and Previous chapters: introduction to the theory of options put-call parity fundamentals
More informationTwo Types of Options
FIN 673 Binomial Option Pricing Professor Robert B.H. Hauswald Kogod School of Business, AU Two Types of Options An option gives the holder the right, but not the obligation, to buy or sell a given quantity
More informationComputational Finance. Computational Finance p. 1
Computational Finance Computational Finance p. 1 Outline Binomial model: option pricing and optimal investment Monte Carlo techniques for pricing of options pricing of non-standard options improving accuracy
More informationUniversity of California, Los Angeles Department of Statistics. Final exam 07 June 2013
University of California, Los Angeles Department of Statistics Statistics C183/C283 Instructor: Nicolas Christou Final exam 07 June 2013 Name: Problem 1 (20 points) a. Suppose the variable X follows the
More informationStochastic Calculus for Finance
Stochastic Calculus for Finance Albert Cohen Actuarial Sciences Program Department of Mathematics Department of Statistics and Probability A336 Wells Hall Michigan State University East Lansing MI 48823
More informationDepartment of Economics ECO 204 Microeconomic Theory for Commerce Test 2
Department of Economics ECO 204 Microeconomic Theory for Commerce 2013-2014 Test 2 IMPORTANT NOTES: Proceed with this exam only after getting the go-ahead from the Instructor or the proctor Do not leave
More informationEconomic Risk and Decision Analysis for Oil and Gas Industry CE School of Engineering and Technology Asian Institute of Technology
Economic Risk and Decision Analysis for Oil and Gas Industry CE81.98 School of Engineering and Technology Asian Institute of Technology January Semester Presented by Dr. Thitisak Boonpramote Department
More informationM339W/389W Financial Mathematics for Actuarial Applications University of Texas at Austin Sample In-Term Exam I Instructor: Milica Čudina
Notes: This is a closed book and closed notes exam. Time: 50 minutes M339W/389W Financial Mathematics for Actuarial Applications University of Texas at Austin Sample In-Term Exam I Instructor: Milica Čudina
More informationMATH6911: Numerical Methods in Finance. Final exam Time: 2:00pm - 5:00pm, April 11, Student Name (print): Student Signature: Student ID:
MATH6911 Page 1 of 16 Winter 2007 MATH6911: Numerical Methods in Finance Final exam Time: 2:00pm - 5:00pm, April 11, 2007 Student Name (print): Student Signature: Student ID: Question Full Mark Mark 1
More informationCHAPTER 10 OPTION PRICING - II. Derivatives and Risk Management By Rajiv Srivastava. Copyright Oxford University Press
CHAPTER 10 OPTION PRICING - II Options Pricing II Intrinsic Value and Time Value Boundary Conditions for Option Pricing Arbitrage Based Relationship for Option Pricing Put Call Parity 2 Binomial Option
More information4. (10 pts) Portfolios A and B lie on the capital allocation line shown below. What is the risk-free rate X?
First Midterm Exam Fall 017 Econ 180-367 Closed Book. Formula Sheet Provided. Calculators OK. Time Allowed: 1 Hour 15 minutes All Questions Carry Equal Marks 1. (15 pts). Investors can choose to purchase
More informationEnergy Derivatives Final Exam Professor Pirrong Spring, 2011
Energy Derivatives Final Exam Professor Pirrong Spring, 2011 Answer all of the following questions. Show your work for partial credit; no credit will be given unless your answer provides supporting calculations
More informationFINANCIAL OPTION ANALYSIS HANDOUTS
FINANCIAL OPTION ANALYSIS HANDOUTS 1 2 FAIR PRICING There is a market for an object called S. The prevailing price today is S 0 = 100. At this price the object S can be bought or sold by anyone for any
More informationChapter 15: Jump Processes and Incomplete Markets. 1 Jumps as One Explanation of Incomplete Markets
Chapter 5: Jump Processes and Incomplete Markets Jumps as One Explanation of Incomplete Markets It is easy to argue that Brownian motion paths cannot model actual stock price movements properly in reality,
More informationAFTERNOON SESSION. Date: Wednesday, April 26, 2017 Time: 1:30 p.m. 3:45 p.m. INSTRUCTIONS TO CANDIDATES
SOCIETY OF ACTUARIES Exam QFICORE AFTERNOON SESSION Date: Wednesday, April 26, 2017 Time: 1:30 p.m. 3:45 p.m. INSTRUCTIONS TO CANDIDATES General Instructions 1. This afternoon session consists of 7 questions
More informationMicroeconomics Qualifying Exam
Summer 2018 Microeconomics Qualifying Exam There are 100 points possible on this exam, 50 points each for Prof. Lozada s questions and Prof. Dugar s questions. Each professor asks you to do two long questions
More informationExaminer s report F9 Financial Management June 2015
Examiner s report F9 Financial Management June 2015 General Comments The F9 examination paper consists of Section A, with 20 multiple-choice questions worth two marks each, and Section B containing three
More informationWriting a Percent as a Decimal
Writing a Percent as a Decimal To convert a Decimal to a Fraction, Divide by 100%. Write 15% as a decimal. To divide by 100, move the decimal point two 15% 100% places to the left. (hint: where is the
More informationBinomial model: numerical algorithm
Binomial model: numerical algorithm S / 0 C \ 0 S0 u / C \ 1,1 S0 d / S u 0 /, S u 3 0 / 3,3 C \ S0 u d /,1 S u 5 0 4 0 / C 5 5,5 max X S0 u,0 S u C \ 4 4,4 C \ 3 S u d / 0 3, C \ S u d 0 S u d 0 / C 4
More informationA&J Flashcards for Exam MFE/3F Spring Alvin Soh
A&J Flashcards for Exam MFE/3F Spring 2010 Alvin Soh Outline DM chapter 9 DM chapter 10&11 DM chapter 12 DM chapter 13 DM chapter 14&22 DM chapter 18 DM chapter 19 DM chapter 20&21 DM chapter 24 Parity
More informationMATH 425 EXERCISES G. BERKOLAIKO
MATH 425 EXERCISES G. BERKOLAIKO 1. Definitions and basic properties of options and other derivatives 1.1. Summary. Definition of European call and put options, American call and put option, forward (futures)
More informationIntroduction Random Walk One-Period Option Pricing Binomial Option Pricing Nice Math. Binomial Models. Christopher Ting.
Binomial Models Christopher Ting Christopher Ting http://www.mysmu.edu/faculty/christophert/ : christopherting@smu.edu.sg : 6828 0364 : LKCSB 5036 October 14, 2016 Christopher Ting QF 101 Week 9 October
More information1 Parameterization of Binomial Models and Derivation of the Black-Scholes PDE.
1 Parameterization of Binomial Models and Derivation of the Black-Scholes PDE. Previously we treated binomial models as a pure theoretical toy model for our complete economy. We turn to the issue of how
More informationEconomathematics. Problem Sheet 1. Zbigniew Palmowski. Ws 2 dw s = 1 t
Economathematics Problem Sheet 1 Zbigniew Palmowski 1. Calculate Ee X where X is a gaussian random variable with mean µ and volatility σ >.. Verify that where W is a Wiener process. Ws dw s = 1 3 W t 3
More informationAdvanced Quantitative Methods for Asset Pricing and Structuring
MSc. Finance/CLEFIN 2017/2018 Edition Advanced Quantitative Methods for Asset Pricing and Structuring May 2017 Exam for Non Attending Students Time Allowed: 95 minutes Family Name (Surname) First Name
More informationOption Pricing. Chapter Discrete Time
Chapter 7 Option Pricing 7.1 Discrete Time In the next section we will discuss the Black Scholes formula. To prepare for that, we will consider the much simpler problem of pricing options when there are
More information