04575cam a22003378a 45000010005000000030009000050050017000140080041000310100017000720200029000890350020001180400038001380410008001760500022001840820025002061000025002312450065002562500019003212600033003402630009003733000013003825040051003955052898004465200589033445260007039336500028039406500026039686500063039948560127040578560053041844604BD-DhEWU20180109122054.0160608s2014 enk g b 001 0 eng d a 2014027082 a9781118782460 (hardback) a(OCLC)894171688 aDLCbengcDLCerdadDLCdBD-DhEWU aeng00aHG8781b.P76 201400a368.01223bPEF 20151 aPromislow, S. David.10aFundamentals of actuarial mathematics /cS. David Promislow. aThird edition. aChichester : bWiley,c2015. a1501 apages cm aIncludes bibliographical references and index.8 aFundamentals of Actuarial Mathematics; Contents; Preface; Acknowledgements; About the companion website; Part I THE DETERMINISTIC LIFE CONTINGENCIES MODEL; 1 Introduction and motivation; 1.1 Risk and insurance; 1.2 Deterministic versus stochastic models; 1.3 Finance and investments; 1.4 Adequacy and equity; 1.5 Reassessment; 1.6 Conclusion; 2 The basic deterministic model; 2.1 Cash flows; 2.2 An analogy with currencies; 2.3 Discount functions; 2.4 Calculating the discount function; 2.5 Interest and discount rates; 2.6 Constant interest; 2.7 Values and actuarial equivalence. 2.8 Vector notation2.9 Regular pattern cash flows; 2.10 Balances and reserves; 2.10.1 Basic concepts; 2.10.2 Relation between balances and reserves; 2.10.3 Prospective versus retrospective methods; 2.10.4 Recursion formulas; 2.11 Time shifting and the splitting identity; *2.11 Change of discount function; 2.12 Internal rates of return; *2.13 Forward prices and term structure; 2.14 Standard notation and terminology; 2.14.1 Standard notation for cash flows discounted with interest; 2.14.2 New notation; 2.15 Spreadsheet calculations; Notes and references; Exercises; 3 The life table. 3.1 Basic definitions3.2 Probabilities; 3.3 Constructing the life table from the values of qx; 3.4 Life expectancy; 3.5 Choice of life tables; 3.6 Standard notation and terminology; 3.7 A sample table; Notes and references; Exercises; 4 Life annuities; 4.1 Introduction; 4.2 Calculating annuity premiums; 4.3 The interest and survivorship discount function; 4.3.1 The basic definition; 4.3.2 Relations between yx for various values of x; 4.4 Guaranteed payments; 4.5 Deferred annuities with annual premiums; 4.6 Some practical considerations; 4.6.1 Gross premiums; 4.6.2 Gender aspects. 4.7 Standard notation and terminology4.8 Spreadsheet calculations; Exercises; 5 Life insurance; 5.1 Introduction; 5.2 Calculating life insurance premiums; 5.3 Types of life insurance; 5.4 Combined insurance-annuity benefits; 5.5 Insurances viewed as annuities; 5.6 Summary of formulas; 5.7 A general insurance-annuity identity; 5.7.1 The general identity; 5.7.2 The endowment identity; 5.8 Standard notation and terminology; 5.8.1 Single-premium notation; 5.8.2 Annual-premium notation; 5.8.3 Identities; 5.9 Spreadsheet applications; Exercises; 6 Insurance and annuity reserves. 6.1 Introduction to reserves6.2 The general pattern of reserves; 6.3 Recursion; 6.4 Detailed analysis of an insurance or annuity contract; 6.4.1 Gains and losses; 6.4.2 The risk-savings decomposition; 6.5 Bases for reserves; 6.6 Nonforfeiture values; 6.7 Policies involving a return of the reserve; 6.8 Premium difference and paid-up formulas; 6.8.1 Premium difference formulas; 6.8.2 Paid-up formulas; 6.8.3 Level endowment reserves; 6.9 Standard notation and terminology; 6.10 Spreadsheet applications; Exercises; 7 Fractional durations; 7.1 Introduction. aProvides a comprehensive coverage of both the deterministic and stochastic models of life contingencies, risk theory, credibility theory, multi-state models, and an introduction to modern mathematical finance. New edition restructures the material to fit into modern computational methods and provides several spreadsheet examples throughout. Covers the syllabus for the Institute of Actuaries subject CT5, ContingenciesIncludes new chapters covering stochastic investments returns, universal life insurance. Elements of option pricing and the Black-Scholes formula will be introduced aAS 0aInsurancexMathematics. 0aBusiness mathematics. 7aMATHEMATICS / Probability & Statistics / General.2bisacsh423WorldCat detailsuhttp://www.worldcat.org/title/fundamentals-of-actuarial-mathematics/oclc/894171688&referer=brief_results403E-book Fulltextuhttp://lib.ewubd.edu/ebook/4604