FINANCIAL
MATHEMATICS BY
CLARENCE
H.
RICHARDSON,
PH.D.
Professor of Mathematics, Bucknell University
AND
ISAIAH ...
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FINANCIAL
MATHEMATICS BY
CLARENCE
H.
RICHARDSON,
PH.D.
Professor of Mathematics, Bucknell University
AND
ISAIAH LESLIE MILLER Late Professor of Mathematics, South Dakota State College of Agriculture and Mechanic Arts
D.
NEW YORK VAN NOSTRAND COMPANY, 250 FOURTH 1946
AVENUE
INC.
COPY RIGHT, 1946 BY D.
VAN NOSTHAND COMPANY,
INC.
All Rights Reserved
Thin book, or any parts thereof, may not be reproduced in any form without written permission from the authors and the publishers.
Based on Business \fathematics,
I.
L. Miller, copyright 1935; second edition copyright 1939;
and Commercial Algebra and Mathematics of Finance, I. L. Miller and C. H. Richardson, copyright 1939 by D. Van Nostrand Company, Inc.
PRINTED IN THE UNITED STATES OF AMERICA
PREFACE This text is designed for a three-hour, one-year course for students desire a knowledge of the mathematics of modern business and finance. While the vocational aspects of the subject should be especially
who
attractive to students of
commerce and business administration, yet an
understanding of the topics that are considered nuities,
bond valuation,
depreciation, insurance
interest, discount, an-
may
well be desirable
information for the educated layman.
To
live intelligently in this complex age requires more than a superknowledge of the topics to which we have just alluded, and it is palpably absurd to contend that the knowledge of interest, discount, bonds, and insurance that one acquires in school arithmetic is sufficient to understand modern finance. Try as one may, one cannot escape questions of ficial
finance.
The
real issue is: shall
we
deal with
them with understanding and
effectiveness or with superficiality and ineffectiveness? While this text presupposes a knowledge of elementary algebra, we have listed for the student's convenience, page x, a page of important
formulas from Miller and Richardson, Algebra: Commercial Statistical that should be adequate for the well-prepared student. Although we make frequent reference to this Algebra in this text on Financial Mathematics, the necessary formulas are found in this reference list.
In the writing of this text the general student and not the pure mathematician has been kept constantly in mind. The text includes those techniques and artifices that many years of experience in teaching the subject
have proved to be pedagogically fruitful. Some general features may be enumerated here: (1) The illustrative examples are numerous and are worked out in detail, many of them having been solved by more than one method in order that the student may compare the respective methods of attack. (2) Line diagrams, valuable in the analysis and presentation of problem material, have been given emphasis. (3) Summaries of important formulas occur at strategic points. (4) The exercises and problems are nufrierous, and they are purposely selected to show the applications of the theory to the many fields of activity. These exercises and problems are abundant, and no class will hope to do more than half of them. (5) Sets
Preface
iv
of review problems are
found at the ends of the chapters and the end of the
book.
A
few special features have also been included: (1) Interest and discount have been treated with unusual care, the similarities and differences having been pointed out with detail. (2) The treatment of annuities is pedagogical and logical. This treatment has been made purposely flexible so that, if it is desired, the applications may be made to depend upon two No new formulas are developed for the solution of general formulas. problems involving annuities due and deferred annuities, and these special annuities are analyzed in terms of ordinary annuities. (3) The discussion of probability and its application to insurance is more extended than that
found in many texts. In this edition we are including Answers to the exercises and problems. While we have exercised great care in the preparation of this book, it is
too
much
to expect that
tion of such errors,
we
it is
shall
entirely free
from
errors.
For the
notifica-
be truly grateful. C. H. RICHARDSON.
Buckneli University, Lewisburg, Pennsylvania, 1946.
CONTENTS CHAPTER
ART.
I,
SIMPLE INTEREST AND DISCOUNT
. PAGE
1.
Interest
2.
Simple Interest Relations Ordinary and Exact Interest Methods of Counting Time The Six Per Cent Method of Computing Ordinary Interest Present Value and True Discount Bank Discount Summary and Extension Comparison of Simple Interest and Simple Discount Hates Rates of Interest Corresponding to Certain Discount Rates in the Terms of Settlement
3.
4.
5. 6. 7.
8. 9.
10.
11. 12.
13.
1
Exchanging Debts To Find the Date When the Various Sums (Debts) Due at Different Times May Be Paid in One Sum To Find the Equated Date of an Account
CHAPTER
1
3 4 7 9 12 15 17
20 22 25 28
COMPOUND INTEREST AND COMPOUND
II,
DISCOUNT Compound Compound
16.
Nominal and Effective Rates
14.
35 36 38 42 45 48 50 53 54
Interest
15.
Interest
Formula of Interest
Present Value at Compound Interest 18. Other Problems Solved by the Compound Interest Formulas
17.
19.
20. 21. 22.
Equation of Value Equated Time
Compound Discount at a Discount Rate Summary of Interest and Discount CHAPTER
III,
ANNUITIES CERTAIN 57 58 63
23. Definitions 24.
25.
Amount
an Annuity Present Value of an Annuity
26. Relation
of
and
between 0rfl
66 8 n\
Formulas of an Ordinary Annuity of Annual Rent Annually for n Years 28. Other Derivations of a^i and 8*\ 27.
Summary.
v
R
Payable
67 67
Contents
vi
PAGE
AKT. 29.
Amount
of
an Annuity, Where the Annual Rent, R,
is
Payable in
p Equal 69
Installments
Value of an Annuity ments
30. Present
31.
Summary
in
Install-
p Equal
78 79
Ordinary Annuity Formulas
Due
32. Annuities 33.
of
Annual Rent, R, Payable
of
83
89
Deferred Annuities
Finding the Interest Rate of an Annuity 35. The Term of an Annuity 36. Finding the Periodic Payment 37. Perpetuities and Capitalized Cost
92 95 97
34.
38. Increasing
CHAPTER IV, SINKING 39. Sinking
100
and Decreasing Annuities
105
FUNDS AND AMORTIZATION
Funds
Ill
Amortization 41. Book Value
Ill
40.
113
114
44.
Amount in the Sinking Fund at Any Time Amount Remaining Due After the kth Payment lias Been Made The Amortization and Sinking Fund Methods Compared
45.
Retirement of a Bonded Debt
118
42.
43.
CHAPTER V,
113 116
DEPRECIATION 122
46. Definitions 47.
Methods
48.
The
123
of Treating Depreciation
Straight Line
Method
123
49. Fixed-Percentage-on-Decreasing- Value 50. 51.
125
The Sinking Fund Method The Unit Cost Method
52. Depreciation of 53.
Method
128
130 134
Mining Property
Composite Life of a Plant
CHAPTER
136
VI,
VALUATION OF BONDS
54. Definitions
141
Purchase Price 56. Premium and Discount 57. Amortization of Premium and Accumulation of Discount 58. Bonds Purchased Between Dividend Dates
141
55.
59.
Annuity Bonds Bonds Use of Bond Tables Determining the Investment Rate Given
144 147 150 152 153
60. Serial 61. 62.
154
When
the Purchase Price of a
Bond
is
155
Contents CHAPTER
VII,
vii
PROBABILITY AND ITS APPLICATION IN LIFE INSURANCE
ART. 63.
The History
64.
Meaning
of
161 162
of Probabilities
a
BA/SW PAGE
priori Probability
Empirical Probability
164
66. Permutations.
165
67.
Number of Permutations of Things All Different Combinations. Number of Combinations of Things All Different Some Elementary Theorems in Probability
167
Mathematical Expectation Repeated Trials Meaning of Mortality Table
172
65. Relative
68.
69. 70.
71.
Frequency.
169 173
176
178
72. Probabilities of Life
CHAPTER
VIII,
LIFE ANNUITIES
73.
Pure Endowments
182
74.
Whole
185
75.
76. 77. 78. 79.
80. 81.
Life
Annuity Present Value (Cost) of a Life Annuity Life Annuity Due Deferred Life Annuity Temporary Life Annuity Forborne Temporary Life Annuity Due Summary of Formulas of Life Annuities. Annuities Payable m Times a Year
185
186
186
187 189
Examples
CHAPTER IX, LIFE INSURANCE,
(SINGLE
1
90
193
NET PREMIUMS
AND ANNUAL)
82. Definitions
198
83.
Whole
199
84.
87.
Term Insurance Endowment Insurance Annual Premium Payable by m Equal Installment/a Summary of Formulas of Life Insurance Premiums
202 204 205 207
88.
Combined Insurance and Annuity
208
85.
86.
Life Policy
CHAPTER X, 89. 90. 91. 92. 93.
Policies
VALUATION OF POLICIES. RESERVES
Meaning of Reserves Computing Reserves, Numerical Illustration Fackler's Accumulation Formula Prospective Method of Valuation Retrospective Method of Valuation
212 213 214 216 218
OTHER METHODS OF VALUATION, POLICY OPTIONS AND PROVISIONS, SURPLUS AND DIVIDENDS
CHAPTER XI, GROSS PREMIUMS,
94.
Gross Premiums and Dividends
95. Surplus
221 222
Contents
viii
PAGE
ART.
223 223 224 225 227
96. Policy Options 97. Surrender or Loan Value
Extended Insurance Paid-up Insurance 100. Preliminary Term Valuation 101. Modified Preliminary Term Valuation 98. 99.
102. Concluding
231
Remarks
235
Review Problems Tables
237
T-I-1
T-XIII-77
Answers
245
Index
261
USEFUL FORMULAS
From I.
Miller and Richardson, Algebra: Commercial
PAGE
= N, logaN = x MN = log a M + log a N
M=
47
M - log N = N loga M loga M*
3. log a
4.
46
If a*
2. Iog
N
47
a
loga
47
Arithmetical Progression
=
+
a
1.
I
2.
Sn = -
(a
3.
Sn = -
[2a
-
(n
84
l)d
+
84
+
2 III.
*
Logarithms 1.
II.
Statistical
(n
-
84
Geometrical Progression = n ~L 1.
ar
i
a
ar
2. 1
a
-
when
4.
(a
+
n
b)
(8)
87
Article
60
(9)
87
r
1