450 46 2MB
English Pages [63] Year 1983
Table of contents :
Introduction
Alphabets
Basic Symbols
Algebra
Trigonometric and Hyperbolic Expressions
Logic and Set Theory
Elementary and Analytic Geometry
Statistics and Mathematics of Finance
Calculus and Analysis
Linear Algebra
Topology and Abstract Spaces
Diagrams and Graphs
UCAR10101
Handbook for Spoken Mathematics (Larry’s Speakeasy)
Lawrence A. Chang, Ph.D. With assistance from Carol M. White Lila Abrahamson
All Rights Reserved This work was produced under the sponsorship of the U.S. Department of Energy. The Government retains certain rights therein.
CONTENTS 1 1. Introduction . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . I1 . Alphabets . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 3 7 111. Basic Symbols . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . IV . Algebra . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 14 V . Trigonometric and Hyperbolic Expressions . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 22 VI . Logic and Set Theory . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 26 VI1. Elementary and Analytic Geometry . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 30 VI11. Statistics and Mathematics of Finance . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 32 IX . Calculus and Analysis . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 35 X . Linear Algebra . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 45 XI . Topology and Abstract Spaces . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 51 XI1. Diagrams and Graphs . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 53
...
111
Handbook for Spoken Mathematics SECTION I
 INTRODUCTIQN
This handbook answers some of the needs of the many people who have to deal with spoken mathematics, yet have insufficient background to know the correct verbal expression for the written symbolic one. Mathematical material is primarily presented visually, and when this material is presented orally, it can be ambiguous. While the parsing of a written expression is clear and welldefined, when it is spoken this clarity may disappear. For example, “One plus two over three plus OW" can represent the following four numbers, depending on the parsing of the expression: 3/7, 1 2/7, 5 , 5 2 j 3 . However, when the corresponding written expression is seen, there is little doubt which of the four numbers it represents. When reading mathematics orally, such problems are frequently encountered. Of course, the written expression may always be read symbol by symbol, but if the expression is long or there are a cluster of expressions, it can be very tedious and hard to understand. Thus, whenever possible, one wishes to have the written expression spoken in a way that is interest retaining and easy to understand. In an attempt to alleviate problems such as these, this handbook has been compiled to establish some consistent and welldefined ways of uttering mathematical expressions so that listeners will receive clear, unambiguous, and wellpronounced representations of the subject. Some of the people who will benefit from this handbook are: 1) those who read mathernatics orally and have insufficient background in the subject, and their listeners; 2) those interested in voice synthesis for the computer, particularly those who deal with spoken symbolic expressions; and 3) those technical writers and transcribers who may need to verbalize mathematics. This edition of the handbook is a working one, and it is hoped that the people who use it will add to and refine it. The choice of material and its ordering are my own preferences, and, as such, they reflect my biases. A goal of the handbook is to establish a standard where no standard has existed, so far as I know. However, this standard represents only one of many possibilities. A s a blind person, I have learned mathematics by means of others reading the material to me; so my preferences are a result of direct experience. This handbook is organized as follows: In Section I1 the various types of alphabets used in mathematics are listed. Section III lists the basic symbols used in mathematics, along with their verbalizations. Sections IVXi list t h e expressions used in some of the more common branches of mathematics, along with their verbalizations. Section XI1 contains some suggestions on how to and how not to describe diagrams.
To use this handbook efficiently, it is suggested that you look over Sections I1 and III on alphabets and basic symbols. Next, establish which section most closely relates to the subject matter at hand. There may also be material in other sections that you can use if you cannot find what you need in the related section. In many sections, more than one choice for a given expression is offered to the user. Once the choice has been made. the reader should use it consistently throughout the text. If you encounter an expression that is not included in the guide, read the expression literally, that is, read it from left to right, symbol by symbol. For those who are interested in speech synthesis and speech recognition for the computer, this handbook may provide some basic ideas and suggestions regarding the formulation of spoken mathematics. With speech synthesis, when the computer reads a file containing many mathematical expressions, the speech synthesizer will speak the expressions symbol by symbol. As we have pointed out before, this process can be tedious and hard to understand. A program that could translate the mathematical expressions from the symbol to symbol form into a spoken form that is more intelligible can ease the task for those who use synthetic speech. On the other hand, if one wishes to communicate mathematical expressions to the computer by voice, a program that will translate spoken expressions of mathematics into written expressions with the correct parsing is essential. This handbook provides a basis for writing these programs, both for speech synthesis and voice recognition, by giving examples of written mathematical expressions followed by the word for word spoken form of the same expressions. An example where these ideas are of particular relevance is the voice input and output of computer programs that manipulate symbolic expressions, because both the input and output of the program are mathematical expressions. I would like to thank the Office of Equal Opportunity of the Lawrence Livermore National Laboratory for their support in bringing this handbook into fruition. Thanks also go to my wife for her untiring help and to my friends and colleagues at the Lab for their assistance.
October, I983
Lawrence Chang
2
SECTION 11
 ALPHABETS
Roman Alphabet Read capital or uppercase letters as capital lettername or cap lettername. Read small or lowercase letters as small lettername. Capital or Small or
uppercase
lowercase
A
B
a b
C D
d
C
e f
E F G
9
H
h
I J
j
K
k
I
1
L M
rn n
N 0
0
P Q R
P 4 r
S
S
T
t
U V
U
W
W
x
X
V
Y Z
Y Z
3
Types of Roman Alphabets
Italic
Boldface
Read capital or uppercase letters a s italic capital /ettername. Read small or lowercase letters as italic lettername. Capital or Small or uppercase lowercase
Read capital or uppeicase letters a5 boldface capital letteinarne. Read small or lowercase letters as boldface lettername. Capital or Small or uppercase lowercase
A
a
A €3
b
C
c
C
D E
D E
B
K L M
I
L
in
M
d e f 9 h i j k 1 m
N
n
N
n
0
0
0
P
Q R
P 4 r
0 P
S
5 ,
F
F
G H I
G I
I
I
i
J K
H
k
6).
P 4
R s
S
r
T
t
T
t
U
U
U
V
w X Y
z
8
$I
a1
W
U V W
X
X
X
Y
Y
Y
z
2
4
2
Gothic or Old English
Script
Read capital or uppercase letters a s Gothic capital lettername. Read small or lowercase letters as Gothic let tername.
Read capital or uppercase letters as script capital lettername. Read small or lowercase letters a s script lettername.
Capital or uppercase
Capital or uppercase
Corresponding Romanletter A B C D
E F
Small or lowercase
Small or lowercase
El
n
b
B
C
c
21
d
P
G
f 9
P
H
b
R
I
t
J K
i k
L
I
M
m
N
m n
0
0
0
P Q
P
/z
4 r
a
B
J
R
L
1
R
e
n
Y
S T U
t
t
U
l/
v
U
W
w
X
X
Y Z
&4 H
5
Greek Alphabet Read capital or uppercase letters a s capital lettername or cap lettername. Read small or lowercase letters a s small lettername. Corresponding Roman Capital Small Name Pronunciation letter A B
r A E Z H
0 I K
A M
N 3 H
0
I1 P T
T a X
* s2
alpha beta gamma delta epsilon zeta eta theta iota kappa lambda mu
ai fuh ba? tuh ga$ rnuh del tuh e6 suh Ion zaj, tuh aj, tuh t h a j tuh i oh tuh kap puh lam duh IT’Tlew new zigh or ksigh om uh cron p!e row (as in rowboat) sig muh tow (rhymes with cow) u j suh Ion f i (rhymes with hi) ki (rhymes with hi) sigh or psigh oh meg uh
llU
xi omicron Pi rho sigma tau upsilon phi chi psi omega
6
a b g d e Z
e th i k 1 m n X 0
P r, rh S
t
Y? u Ph ch PS 0
SECTION 111  BASIC SYMBOLS Symbol
Speak
or
or
XI
or
Notes
plus positive minus negative mu1tiplies times
divided by
I ! I
divides
+
?Ius or minus
absolute value

+
minus or plus
03
circle plus
circle cross or
#
or
equals equal to does not equal
not equal to identical to not identical to approximately equal to
‘v
equivalent to approximately equal but less than less than or equal to 7
Symbol
Speak
>
much greater than
>
not greater than
(
or
or
or
or
or
or
Notes
open parenthesis left parenthesis closed parenthesis right parenthesis open bracket left bracket closed bracket right bracket open brace left brace closed brace right brace Example: a bc is read a s a minus vinculum b minus c.
vinculum
8
In the next examples, the letter a is used with the symbol for clarity  the letter a is a dummy variable.
Symbol
Speak
Notes
lal
absolute value of a
In this case a is any real number.
a’
a prime
If a is an angle, a’ is read as a minutes.
a”
a double prime
,In1
a with n primes
an
or

if a is an angle, a” is read as a seconds.
a superscript n a to the n a bar
a
a*
or
an
or
a star a super asterisk When n = 0, a, may be read as a naught.
a subscript n a sub n
J
radical sign square root of a cube root of a nth root of a
or
to distinguish from the letter o
zero null set
9
Symbol
Speak
Notes
z
the letter z
to distinguish from 2
K
a i Ief
aleph, the first letter of the Hebrew alphabet n
is
Example:
product
i=l
read product from i = l to n. n
c
Example:
summation
1
is
i=l
read summation from i = l to n. Example:
integral
jab
is read
integral from a to b.
d/dx
d/dX
or or
or
d over d x dbydx the derivative with respect to x the partial derivative with respect to x partial over partial x
c7
del
!
factorial
*
& i.
or
or
Example: n! is read n factorial.
star asterisk ampersand and dagger
10
Symbol
Speak
tt
double dagger
Notes
a degrees a radians section parallel perpendicular angle
L
L
right angle
A
triangle
R
parallelogram
0
square
0
circle
0
or
ellipse
arc
..
there fore
...
or
or or
or

oval
n
..
However, Ax is read delta x or increment X.
Example: AB is read arc ab.
since because dot, dot, dot ellipsis etc. is to ratio 11
Symbol
.. .. A
Speak
or
or
Notes
as proportion Example: 5 is read a hat or a circumflex.
hat circumflex
oom ]aut
Example: a is read a oom laut.
accent grave
is read Example: a accent grave.
accent acute
Example: 6 is read a accent acute.
til duh
Example: n til duh.
caret
or
c
or
or
or
arrow to the right approaches arrow to the left withdraws arrow pointing up upward arrow arrow pointing down downward arrow
+
a
vector a
"I
union
V
12
fi is read
Symbol
Speak
n
intersection
C
or
Notes
contained in subset of contains implies
++
equivalent to
iff
if and only if
3
or
there exists there is
v
for every
3
such that
%
percent
$
dollars
c
cents
0
at or
#
or
sharp pound sign number sign flat proportional to infinity
13
SECTION IV
 ALGEBRA
The small letters of the alphabet, a, b, c, d, ..., may be any numbers.
Expression
Speak
a + b
a plus b
a + b + c
a plus b plus c
a  b
a minus b
a
minus a minus b
b
Notes
a + b  c
a plus b minus c
abc
a minus b minus c
a
a


or
(b k c)
(b

or
or
c)
a minus the sum b plus c a minus the quantity b plus c a minus open parenthesis b plus c close paren thesis a minus the difference b minus c a minus the quantity b minus c
Or
a minus open parenthesis b minus c close parenthesis a  (b 
a
a


(b tc)
b

(c
or
C)


d
d)
or
or or
a minus the quantity minus b minus c a minus open parenthesis minus b minus c close parenthesis a minus the quantity b plus c end of quantity minus d a minus open parenthesis b plus c close parenthesis minus d a minus b minus the difference c minus d
a minus b minus the quantity c minus d a minus b minus open parenthesis c minus d close parenthesis
14
Expression
Speak or
or
a X b
or
or or or
or or
ab
or b
a
or
or
a ( b ic> 4 d
a (b
a(b
or
c

a cross b the product of a and b a multiplied by b a times b a dot b the product of a and b a multiplied by b a b
a times b the product of a and b
a multiplied by b
a b plus c
a (b k c)

a times b
a times minus b
a b k c
ab
Notes
a times the sum b plus c a times the quantity b plus c
a times open parenthesis b plus c close parenthesis a times the quantity b plus c end of quantity plus d a open parenthesis b plus c close parenthesis plus d a b minus c
or
c)

or
c)
or
a times the difference b minus c a times the quantity b minus c a open parenthesis b minus c close parenthesis a times the quantity minus b minus c
a open parenthesis minus b minus c close parenthesis 15
Expression a(b

c 4 d)
or
ab 4 cd ad


e(f

(a 4 b) (c 4 d)

g)
g)]
or
or
or
or
1 2
or
1 3
or

1 n

a open parenthesis b minus c plus d close parenthesis
a d minus b c
a (b 4 c)  e (f

a times the quantity b minus c plus d
a b plus c d
bc
a[b 4 c
Notes
Speak
a times the quantity b plus c end of quantity minus e times the quantity f minus g a open parenthesis b plus c close parenthesis minus e open parenthesis f minus g close parenthesis a times the quantity b plus c minus the product e times the difference f minus g end of quantity a open bracket b plus c minus e open parenthesis f minus g close parenthesis, close bracket the sum a plus b times the sum c plus d the product of the sum a plus b and the sum c plus d open parenthesis a plus b close parenthesis open parenthesis c plus d close parenthesis one half one over two
one third one over three
one over n
16
Expression
Speak or
or
a + b d
a+
b d
b c+d
   +a
or
Notes
a over d a divided by d
the ratio of a to d
the fraction, the numerator is a plus b, the denorninator is d the quantity a plus b divided by d
a plus the fraction b over d a plus the fraction, the numerator is b and the denominator is c plus d or a plus the fraction b divided by the quantity c plus d
the quantity a plus b over c, that fraction plus d
a + b + d C
b a++d
a plus the fraction b over c, that fraction plus d
C
a __
c +
b
the fraction a over b plus the fraction c over d
d
a
the fraction, the numerator is a, the denominator is the sum b plus the fraction c over d
b+c d
a b d

or
the fraction, the numerator is the fraction a over b, the denominator is d a over b, that fraction divided by d
17
Expression
Speak
a
a divided by the fraction c over d
a b
the fraction, the numerator is the fraction a over b, the denominator is the fraction c over d
.
or
C

d
a + b C
or
d
a b cld
a ( b 4
the fraction, the numerator is the quantity a plus b over c, the denominator is d the quantity a plus b over c , that fraction divided by d
a divided by the fraction b over the quantity c plus d
s)
a times the sum b plus the fraction c over d
b
a +
the fraction a over b divided by the fraction c over d
the fraction c over d times the sum a plus b
C
(a Ib) d
a +
Notes
b a+
b a + b
the continued fraction: a fraction b divided by the fraction b divided by the fraction b divided by the fraction b divided by dot
18
plus the sum a plus the sum a plus the sum a plus the dot dot
Expression ay 4 bx 4 c
=
0
y=mx+b y
=
ax2 4 bx
Speak
Notes
a y plus b x plus c equals zero
linear equation
y equals m x plus b
+c
y equals a x squared plus b x plus c
quadratic equation
x equals minus b plus or minus the
x=
x2
b k Jb2 4ac 2a
+ y2
=
r2
y = kJr2x
(x  h)2
or
2
X2 + Y2 q
__ X2
a2
b2

2 Y= 1
b2
x equals the fraction, the numerator is minus b plus or minus square root of the difference b squared minus 4 a c, the denominator is 2 a
x squared plus y squared equals r squared
circle with radius r, center at origin
y equals plus or minus square root of the difference r squared minus x squared
respectively, upper or lower semicircle with radius r, center at origin
4 (y  k)2 = r2
or
a2
square root of the difference b squared minus 4 a c, that whole quantity divided by 2 a
the difference x minus h squared plus the difference y minus k squared equals r squared the quantity x minus h squared plus the quantity y minus k squared equals r squared the fraction x squared over a squared plus the fraction y squared over b squared equals 1
ellipse
the fraction x squared over a squared rnirrus the fraction y squared over b squared equals 1
hyperbola
19
Expression
Speak
Notes
ax2 tbxy 4 cy2 4 dx 4 ey 4 f = 0 a x squared plus b x y plus c y squared plus d x plus e y plus f equals zero
or
ax
or
ex
+y
or
eXeY
a to the x a raised to the x power
e to the quantity x plus y power e raised to the x plus y power the sum of e to the x and y
e to the x power plus y the product of e to the x power and e to the y power
e raised to the x times a to the y power
xay
e
or
eXY
or
ei2.rrz
or
e raised to the product of x and a to the y the product of e to the x power and y
e raised to the x power times y e to the quantity i 2 pi z power
e raised to the i 2 pi z power log to the base b of a
log,, 3
'
log to the base 10 of the product 3 times 4
4
log to the base e of the fraction 2 over 5
or log to the base e of the ratio 2 to 5 In x
or
the natural log of x lnofx
20
the conics
Expression
a,
a,
Speak
+ a2 + + a,

a,
a2
or
... a,
b, 4 a2
b, 4
or
Notes
a sub 1 plus a sub 2 plus dot dot dot plus a sub n a sub 1 plus a sub 2 plus ellipsis plus a sub n a sub 1 times a sub 2 times dot dot dot times a sub n a sub 1 times a sub 2 times ellipsis times a sub n
... k a,
or
b, a sub 1 times b sub 1 plus a sub 2 times b sub 2 plus dot dot dot plus a sub n times b sub n a sub 1 times b sub 1 plus a sub 2 times b sub 2 plus ellipsis plus a sub n times b sub n in algebra
p of x
P(X)
+ 2x  4
p(x)
=
3x2
q(x)
=
x3  8
p(x)
=
aoxn
p of x equals 3 x squared plus 2 x minus 4 q of x equals x cubed minus 8
+ alxn* + + a,,x + a, 0 . 
or
p of x equals a sub zero x to the n plus a sub 1 x to the n minus 1 plus dot dot dot plus a sub n minus 1 x plus a sub n
polynomial of n degree
p of x equals a sub zero times x raised to the n power plus a sub 1 times x to the n minus 1 power plus dot dot dot plus a sub the quantity n minus 1 times x plus a sub n.
for extra clarity, when in doubt
21
SECTION V  TRIGONOMETRIC AND HYPERBOLIC EXPRESSIONS The Greek letter 8 (theta) will be used in this section to denote an angle in degrees or radians.
Expression
Speak
0"
theta degrees
or
theta minutes
8 If
theta seconds
s.a.s.
side angle side
S.S.S.
side side side
Notes
The six basic trigonometric functions are:
Function
Speak
sin 8
or
cos 8
or
tan 8
or
cot 8
or
sec H
or
8
or
CSC'
Notes
sine of theta sine theta
co sine of theta co sine theta tangent of theta tangent theta co tangent of theta co tangent theta
see cant of theta
see cant theta
co see cant of theta co see cant theta
22
Other functions are:
Function
Speak
sin2 x
sine squared x
cos2 x
co sine squared x
tan2 x
tangent squared x
cot2 x
co tangent squared
sec2 x
see cant squared x
csc2 x
co see cant squared x
sinh 8
or
cosh 8
or
tanh 8
or
__ Notes
X
hyperbolic sine theta sinch theta hyperbolic co sine theta cosh theta hyperbolic tangent theta tange theta
coth 0
hyperbolic co tangent theta
sech 8
hyperbolic see cant theta
csch 0
hyperbolic co see cant theta
or arc sin'sinx
"1
or or
or arc cos'cosx
or or
arc sine x inverse sine x anti sine x sine to the minus 1 of x arc co sine x inverse co sine x anti co sine x
co sine to the minus 1 of x
23
The negative exponent does not mean the reciprocal of the function n nor 1 the function
Function
Speak or
arc tan x tan'x
or
I
or
cot'x arc cot
or
I
or
or
arc seclx
I
or
or
I
or or
or arc sinh x sinh'x
1 j
or or
or cosh'x arc cash
arc tangent x inverse tangent x anti tangent x tangent to the minus 1 of x
arc co tangent x inverse co tangent x anti co tangent x co tangent to the minus 1 of x
arc see cant x inverse see cant x
Or
or
csc*x arc csc
Notes
or or
anti see cant x
see cant to the minus 1 of x
arc co see cant x inverse co see cant x anti co see cant x co see cant to the minus I of x
arc hyperbolic sine of x arc sinch x inverse hyperbolic sine of x anti hyperbolic sine of x
arc hyperbolic co sine of x arc cosh x inverse hyperbolic co sine of x anti hyperbolic co sine of x
24
Speak
Function
or
or
tanh'x arc tanh
or
coth'x arc coth
arc sech'x sech
arc csch csch'x
or
1
or
I
or or
I
or or
Notes
arc hyperbolic tangent of x arc tange x inverse hyperbolic tangent of x anti hyperbolic tangent of x
arc hyperbolic co tangent of x inverse hyperbolic co tangent of x anti hyperbolic co tangent of x
arc hyperbolic see cant of x inverse hyperbolic see cant of x anti hyperbolic see cant of x
arc hyperbolic co see cant of x inverse hyperbolic co see cant of x anti hyperbolic co see cant of x
The following expressions can be used for any of the six trigonometric functions: sine, cosine, tangent, cotangent, secant, cosecant. In the examples that follow, sine will be used.
Function sin 8
+x
sin (8
+ w)
Notes
Speak sine of theta, that quantity plus x
or
sine of the sum theta plus omega sine of the quantity theta plus omega
(sin 8) x
sine theta times x
sin (Ow)
sine of the product theta omega
(sin
e2) x
sine of theta squared, that quantity times x
sin2 8 cos 8
sine squared theta times co sine theta
sin 8 cos 8
sine of theta times co sine of theta
sin (8 cos 8)
sine of the product theta times co sine theta 25
SECTION VI  LOGIC AND SET THEORY Expression
Speak
Notes
therefore such that
3
P
The reader must be careful to differentiate between fi (p tilde) and p (not P).
not p
or
both p and q P and ci
pvql
or
PV4
PI4
I
at least one of p and q P 01"4
or
not both p and q not p or not q neither p nor q
or
if p, then q p only if q
if and only if
universal class
:I
null class
A 0
26
Expression
Speak
or
Notes

for all x, y, ellipsis
for all x, y, dot dot dot there exists
there is an x such that
there exist x, y, dot dot dot such that
E x , y, ...
C Ex X
I
the class of all objects x that satisfy the condition
Example: E x ( x  a) < 0 is read the class of all objects x that satisfy the condition the quantity x.minus a is less than zero.
the class of all objects x which satisfy s of x Note: In the following expressions the capital letters M, N, and P denote sets.
X E M M C N
or
or
x is an element of the set capital m the point x belongs to the set capital m capital m is a subset of capital n capital rn is contained in capital n
M C N
capital m is a subset of or equal to capital n
M 3 N
capital m contains capital n
MZ>N
capital m contains or is equal to capital n
1
M M( 7 N
intersection of capital m and capital n
27
Expression
Speak
or M4N
or
or
UatA
Ma
'atA
Ma
Notes
union of capital m and capital n join of capital m and capital n sum of capital m and capital n intersection of all the sets capital m sub alpha with alpha an element of capital a product of all the sets capital m sub alpha with alpha an element of capital a union of all the sets capital m sub alpha with alpha an element of capital a sum of all the sets capital m sub alpha with alpha an element of capital a
complement of the set capital m
MNI
or
MN
or
MN
M
n (N u P)
M f7 N U M
M
u (N n P)
nP
complement of capital n in capital m relative complement of capital n in capital m the sets capital m and capital n are bijective the sets capital m and capital n can be put into one to one correspondence
intersection of capital m and the set capital n union capital p capital m intersect capital n union capital m intersect capital p capital m union the set capital n intersect capital p complement of the set capital m union capital n
MnN
intersection of the complement of capital m and the complement of capital n 28
Expression
Speak
Notes
K
at; lef
the first letter of the Hebrew alphabet
at; lef null
the cardinal number of the set of positive numbers
M=N
capital m and capital n are of the same ordinal type
w
omega
the ordinal number of the positive integers in their natural order
omega superscript star
the ordinal number of the negative integers in their natural order
left superscript star omega
the ordinal number of all integers in their natural order
Pi
Q.E.D.
“Quod erat demonstrandurn”Latin meaning: which was to be demonstrated or which was to be proved
29
SECTIQN VI1
 ELEMENTARY AND ANALYTIC GEOMETRY
Symbol
Speak
Notes
L
angle
Example: L ABC is read the angle ABC.
LS
angles
1_
perpendicular
L S
perpendiculars
I/
parallel
I/s
parallels
or
Example: AB 1CD is read AB is perpendicular to CD.
Example: AB /I CD is read AB is parallel to CD.
Example: A I3 is read A is congruent to B.
congruent is congruent to
h,
or

similar
Example: A B is read A is similar to B.
is similar to
n
triangle
R
parallelogram
0
square
0
circle circles See Greek alphabet, Section !I.
Pi
0
origin the point a, b the point capital p with coordinates a and b the point r, theta in polar coordinates 30
See Greek alphabet, Section 11.
Speak
Symbol
Notes
the point x, y, z in a rectangular coordinate system in space
or
or
or
or
the point r, theta, z in a cylindrical coordinate system in space
See Greek alphabet, Section 11.
the point r, theta, f i
See Greek alphabet, Section 11.
rho, theta, f i in a spherical coordinate system in space the Iine segment a b the line segment between a and b the directed line segment from a to b the ray from a to b the arc a b the arc between a and b
31
SECTION VI11  STATISTICS AND MATHEMATICS OF FINANCE Greek alphabetthe pronunciation of the Greek letters can be found in Section 11.
Notes
Symbol
Speak
X2
chisquare
d.f.
degrees of freedom
F
capital f
F ratio
i
i
width of a class interval
k
k
coefficient of alienation
P.E.
or
probable error probable deviation
r
or
r
Pearson product moment, correlation coefficient between two variables
correlation Coefficient 12.34...n
r sub the quantity one two dot three four dot dot dot n
partial correlation coefficient between variables one and two in a set of n variables
standard deviation
from a sample
sigma sub x
standard deviation of the population of x
sigma sub x y
standard error of estimate, standard deviation of an x array for a given value of y
sd
t
V X
or or
t students’ t statistic students’ t test capital v
coefficient of variation
x bar
arithmetic average of the variable x from a sample
32
Symbol
Speak
Notes
P
mu
arithmetic mean of a population
P2
mu sub two
second moment about the mean
Pr
mu sub r
rth moment about the mean
P1
beta sub one
coefficient of skewness
P2
beta sub two
coefficient of kurtosis
P12.34
beta sub the quantity one two dot three four
multiple regression coefficient in terms of standard deviation units
eta
correlation ratio
2
Fisher’s z statistic
capital q sub one
first quartile
capital q sub three
third quartile
capital e of x
expected value of x, expectation of x
capital p of x sub i
probability that x assumes the value x sub i I
%
percent or
c Q
or
dollar dollars cent cents at
Example: three oranges Q $1.OO each is read three oranges at one dollar each.
j sub p in parentheses
nominal rate (p conversion periods per year)
n
number of periods or years 33
Symbol
Speak
Notes
1,
1 sub x
number of persons living at age x (mortality table)
'dX
d sub x
number of deaths per year of persons of age x (mortality table)
Px
p sub x
probability of a person of age x living one year
4x
q sub x
probability of a person of age x dying within one year
nA x
leftsubscript n capital a sub x
net single premium for $1 of term insurance for n years for a person aged x
n Px
leftsubscript n capital p sub x
premiums for a limited payment life policy of $1 with a term of n years at age x
s sub n right angle
compound amount of $1 per annum for n years at a given interest rate
34
SECTION IX  CALCULUS AND ANALYSIS Greek alphabet  the pronunciation of the Greek letters can be found in Section 11.
Expression
Speak
Notes
a
a
usually means acceleration
I
capital i
usually means inertia
k
k
usually means radius of gyration
S
usually means length of arc
sigma
s dot S V I
V
z, y,z
x bar, y bar, z bar
or
usually means velocity
open interval a b point a b closed interval a b
or
or
[XI
or
interval a less than x less than or equal to b interval a b, open on the left and closed on the right interval a less than or equal to x less than b interval a b, closed on the left and open on the right greatest integer not greater than x integer part of x
sequence a sub 1, a sub 2, dot dot dot, a sub n, dot dot dot boldface capital sigma
summa tion
35
Expression
Speak
i
summation from one to capital n
1
Go
Notes
summation from i equals one to infinity of x sub i
xxi i=l
rI
product
fI
product from one to n
1
co
boldface capital pi
product from i equals one to inifinity of y sub i
i= 1
least upper bound
1.u.b.
or
SUP
supremum soup greatest lower bound
g.1.b.
or
inf lim y = b xa
inferior inf limit as x approaches a of y equals b
lim y = b x=a
lim
t,
nco
lim t, 
nco
limit superior as n approaches infinity of t sub n
limit inferior a s n approaches inifinity of t sub n
36
Expression lirn sup
or
limit superior lim soup
lim
I
lirn inf lim 
or
limit inferior lim inf f of x
f(x)
or f (a
Notes
Speak
+ 0)
f composed with g of x f of g of x
f of the quantity a plus zero f of the quantity a plus f of the quantity a minus zero
f(a  0)
f of the quantity a minus lirn xla
lirn
f(x)
limit as x decreases to a of f of x
f(x)
limit as x approaches a plus of f of x
x+a+
lim xta lirn
f(x)
limit as x increases to a of f of x
f(x)
xa
limit a s x approaches a minus of f of x
f’(a +)
derivative on the right of f at a
f’(a )
derivative on the left of f at a
AY
or
or or
capital delta y an increment of y partial y a variation in y an increment of y
37
Expression
Speak
dY
or
dx dt
or or
df(x0) dx
or
dY differential of y derivative with respect to t of x derivative of x with respect to t d x over d t
derivative with respect to x of f at x sub zero derivative of f at x sub zero with respect to x
y prime
f prime of x or
4"y
derivative with respect to x of y capital d sub x of y nth derivative with respect to x of y
dx"
y'"'
y to the nth prime
or P
or
p prime first derivative of p
p d o h l e prime
P
second derivative of p
f'"' (x)
f to the nth prime of x
D:: y
or
or
nth derivative with respect to x of y capital d sub x super n of y
f prime of g of x f prime at g of x the quantity f of g of x, that quantity prime the product of f prime of g of x and g prime of x 35
Notes
Expression
Speak
Notes
the quantity f of x times g of x, that quantity prime f prime of x times g of x, that product plus f of x times g prime of x the quantity f of x over g of x, that quantity prime
the fraction, the numerator is f prime of x times g of x, that product minus f of x times g prime of x, the denominator is g squared of x
f of x, y
dX
or or
or
or f 1(Xl Y)
or d2U dy dx
uXY
partial derivative of u with respect to x partial u over partial x partial derivative with respect to x of u
partial derivative of u with respect to x u sub x
partial derivative with respect to x of f of x, Y f sub x of x, y partial derivative with respect to the first variable of f of x, y
f sub one of x, y second partial derivative of u, first with respect to x and then with respect to y
or
second partial derivative of u, first with respect to x and then with respect to y u sub x y
39
Expression
f,,
(KY)
Speak
or
or
or
D
or
Notes
second partial derivative of f of x, y, first with respect to x and then with respect to y
f sub x y of x, y second partial derivative of f of x, y, first with respect to the first variable and then with respect to the second variable
f sub one two of x, y partial derivative with respect to y of the partial derivative with respect to x of u capital d sub y of capital d sub x u operator d over d x capital d f of x sub one, x sub two, dot dot dot, x sub n
Di or
Dij
or
Dsf
or
partial derivative with respect to the ith variable capital d sub i
second partial derivative first with respect to x sub i then with respect to x sub j capital d sub i j
directional derivative of f in the direction s capital d sub s of f delta f of x del
Vf
u'
or
Example: Dif(xl,x2,...,xn)=
gradient of f del f vector u
40
Example:
Expression
Speak
grad f
gradient of f
0ii
or
Notes
divergence of vector u del dot vector u
div
u'
or
V X F
or
v2
or
divergence of vector u div vector u curl of boldface capital f del cross boldface capital f Example: V2u is the Laplacian operator on u.
Laplacian operator del squared
A
or
Laplacian operator delta Kronecker delta
or
or
capital f of x evaluated from a to b capital f of b minus capital f of a integral f of x d x anti derivative of f with respect to x
integral from a to b of f of x d x
a
i,
upper Darboux integral from a to b
lower Darboux integral from a to b iterated integral: integral from a to b of the integral from c to d of f of x,y d y d x
iterated integral: integral from alpha to beta of the integral from r sub one of theta to r sub two of theta of f of r, theta r d r d theta 41
iterated integral in polar coordinates
Expression
Speak
Notes
integral over capital r of one d capital v
jRfdV or
bl
b2
iterated integral with cylindrical coordinates
iterated integral: integral from zero to two pi of the integral from zero to pi over two of the integral from zero to a of rho cosine f i rho squared sine f i d rho d f i d theta
iterated integral with spherical coordinates
integral over capital r of f d capital v
dx
/ 1
iterated integral: integral from zero to two pi of the integral from zero to a of the integral from minus square root of the quantity a squared minus r squared to square root of the quantity a squared minus r squared of one dot r d z d r d theta
...
integral of the product of three factors: f of x of u, and d x over d u, and d u integral of f of x of u times d x over d u times d u
rn
f(xI,x2,...,xn) dx,dx 2...dxn multiple integral: integral from a sub one to b sub one, integral from a sub two to b sub two, dot dot dot, integral from a sub n to b sub n of function f of x sub one, x sub two, dot dot dot, x sub n, end of function, d x sub one d x sub two dot dot dot d x sub n integral over gamma of f of z d z line integral along capital c in positive direction of function capital m of x, y d x 42
Expression
Notes
Speak surface integral over capital s of g of x, y, z d capital s
S
one divided by the square root of two pi that fraction times integral from minus infinity to infinity of the quantity g of t times e to the i x t power d t
(fa)
inner product of the functions f and g
!I !!
norm of the function f
f*g
convolution of f and g
W(U~,U~,..,U~)
Wronskian of u sub one, u sub two, dot dot dot u sub n
Jacobian of the function f sub one of x sub one, x sub two, dot dot dot x sub n; f sub two of x sub one, x sub two, dot dot dot, x sub n; dot dot dot f sub n of x sub one, x sub two, dot dot dot x sub n
l
h I
In the following expressions z is a complex number /z/
or
Z
or
absolute value of z modulus of z conjugate of z
z bar
conj z
conjugate of z
arg z
argument of z
43
Expression
Speak
Notes
real part of z
imaginary part of z
Res f(z) z=a
residue at z equals a of f of z
44
SECTION X
 LINEAR ALGEBRA
Note: Matrices are read either by rows or by columns and the number of rows and columns determines the size of the matrix. Hence, a matrix with four rows and three columns is called a fourbythree matrix. (The number of rows is listed first, i.e., 4 by 3.)
Expression
Notes
Speak
or
two by two matrix first row two seven second row three ten two by two matrix first column two three second column seven ten
a sub i j
aij m x n
or
m cross n m by n
ai+ 1,j
a double subscript i plus one comma j
ai, j  1
a double subscript i comma j minus one
a i+. 1 , J2
a double subscript i plus one half, j minus one half
1 2
a11
a12
...
a21
a22
...
am2
...
[am1
a2nl
am"
m by n matrix: first row a sub one one, a sub one two, dot dot dot, a sub one n second row a sub two one, a sub two two, dot dot dot, a sub two n third row dot dot dot mth (or last) row a sub m one, a sub m two, dot dot dot a sub m n
45
Expression
Speak
[aij]I 5 i 5 m, I 5 j 5 n the m by n matrix with elements a sub i j or open bracket a sub i j close bracket one less than or equal to i less than or equal to m, one less than or equal to j less than or equal to n aA
AT
or
or
or A’
or
or AH
or
[AB]’
or
[A+B]’
or
ABBI
or
a boldface capitat a scalar product of a and matrix boldface capital a boldface capital a superscript capital t transpose of the matrix boldface capital a the matrix boldface capital a transpose boldface capital a prime transpose of the matrix boldface capital a the matrix boldface capital a transpose boldface capital a superscript capital h Hermitian transpose of the matrix boldface capital a left bracket boldface capital a boldface capital b right bracket superscript minus one inverse of the matrix product boldface capiial a boldface capital b left bracket boldface capital a plus boldface capital b right bracket superscript minus one inverse of the matrix sum boldface capital a plus boldface capital b boldface capital a boldface capital b boldface capital b superscript minus one the product boldface capital a boldface capital b boldface capital b inverse
Notes
Expression
Speak
A'
or or
Notes
boldface capital a superscript minus one inverse of the matrix boldface capital a matrix boldface capital a inverse determinant of the square matrix boldface capital a
det A
a,2
...
... ... an2 ...
a22
eterminant of the matrix: first row a sub one one, a sub one two, dot dot dot, a sub one n second row a sub two one, a sub two two, dot dot dot, a sub two n third row dot dot dot nth (or last) row a sub n one, a sub n two, dot dot dot, a sub n n n
summation from k equals one to n of the product a sub i k b sub k j
aikbkj d
L
k=l
summation from s equals one to n of summation from t equals one to p of the product a sub i s b sub s t and c sub t j
s=l t=l
ax I by cx I dy
=
=
e f
the system of equations first equation: a x plus b y equals e second equation: c x plus d y equals f
47
Expression
a , , x1 4 a,, x2 4 ... 4 a,, x, x1 4 a2, x2 t ... t x,
...
a,,
Notes
Speak = =
b, b,
x I I am, x2 i... 3 a,, x, = b, the system of equations first equation: a sub one one x sub one plus a sub one two x sub two plus dot dot dot plus a sub one n x sub n equals b sub one second equation: a sub two one x sub one plus a sub two two x sub two plus dot dot dot plus a sub two n x sub n equals b sub two third line: dot dot dot mth (or last) equation: a sub m one x sub one plus a sub m two x sub two plus dot dot dot plus a sub m n x sub n equals b sub m
n row vector a sub one a sub two dot dot dot a sub n
n column vector a sub one a sub two dot dot dot a sub n
or
I
matrix: first row one zero dot dot dot zero second row zero one dot dot dot zero third row dot dot dot last row zero zero dot dot dot one identity matrix identity matrix
48
Expression
Speak
0
0
d2
0
Notes
... ...
... 0
...
0
or
I
u11
u12
*.
Uln
0
u*2
...
U2,
0
matrix: first row d suo one zero zero dot dot do : zero second row zero d sub two zero dot dot dot zero third row dot dot dot nth (or last) row zero zero zero dot dot dot d sub n
n by n diagonal matrix with d sub one to d sub n on the diagonal
... ...
0
u,,
or
matrix: first row u sub one one u sub one two dot dot dot u sub one n second row zero u sub two two dot dot dot u sub two n third row dot dot dot nth (or last) row zero dot dot dot zero u sub nn n by n upper triangular matrix
49
Expression Ql1
0
Q2 1
a22
Qn 1
Qn2
'I
...
... ... ...
Qn n
or
i
u11
Q21u11 '3lU1 1
Notes
Speak
u12 f2 1u 12
+u22
Q31u12+Q32u22
matrix: first row script 1 sub one one zero dot dot dot zero second row script 1 sub two one script 1 sub two two dot dot dot zero third row dot dot dot nth (or last) row script 1 sub n one script I sub n two dot dot dot script 1 sub n n n by n lower triangular matrix
:I
u13
+u23
Q2 l u 13
Q31u13+f32u23+u33
.**
...
matrix: first row first element u sub one one second element u sub one two third element u sub one three, dot dot dot second row first element script 1 sub two one u sub one one second element script 1 sub two one u sub one two plus u sub two two third element script 1 sub two one u sub one three plus u sub two three, dot dot dot third row first element script 1 sub three one u sub one one second element script 1 sub three one u sub one two plus script 1 sub three two u sub two two third element script 1 sub three one u sub one three plus script 1 sub three two u sub two three plus u sub three three, dot dot dot fourth row dot dot dot 50
SECTION XI
 TOPOLOGY AND ABSTRACT SPACES
Note: In the following expressions, the capital letters M and N denote sets.
Expression
Speak
Notes
M
capital m bar
closure of capital m
M'
capital m prime
derived set of capital m
delta of x,y rho of x,y
distance from x to y
capital m cross capital n
the Cartesian product of spaces capital m and capital n
capital m slash capital n
the quotient space of capital m and capital n

M X N
En E" Rn
R" Zn
Cn H
%
llxll
capital capital capital capital
e sub n e superscript n r sub n r superscript n
real ndimensional Euclidean space
capital z sub n capital c sub n
complex ndimensional space
capital h Gothic capital h
Hilbert space
open parenthesis boldface x, boldface y closed parenthesis
inner product of the elements x and y of a vector space
norm of boldface x italic I sub p space italic I superscript p in parentheses space
51
Expression
Speak
LP
capital 1 sub p space
Notes
capital 1 superscript p in parentheses space summation i equals one to infinity of the absolute value x sub i, that absolute value raised to the p power, and the whole sum raised to the one over p power
integral over s of the absolute value of f of x, that absolute value raised to the p power a x and the whole integral raised to the one
over p power
dS
AS
partial capital s capital delta capital s d of capital s
I
52
boundary of the set capital s
SECTION XI1  DIAGRAMS AND GRAPHS In this section the approach changes from previous sections. Here suggestions are merely offered to alleviate the very complicated problem of diagram description. Diagrams are visual aids and are very useful to illustrate qualitative information. Because of their visual nature, it is somewhat clumsy and sometimes even impossible to describe them verbally. The old saying, “A picture is worth a thousand words”, sums up the difficulty faced when trying to describe a picture with words. The degree of complexity of the diagram should determine whether “reading” the diagram is worth the effort. Some illustrations require so many words from the reader that it can render the listener in a state of depressed confusion from which there is no reasonable hope of bringing him out clearheaded again. This section deals mainly with suggestions for describing diagrams in general. These suggestions should help the interpreter convey the information in the illustration to the listener in a s clear a manner as possible. It is most important that diagrams be described clearly. A poorly read diagram is worse than one not read at all, because it can confuse and frustrate the listener and even give misleading information. When taping, if the reader finds that the material to be described is not clear or comprehensible to himself, the reader should consult the listener in person. Specific questions from the listener will likely elicit the desired information. If the listener is blind, there are other ways to facilitate understanding of the diagram, such as tracing the diagram using the blind person’s hand, or using raised line drawing paper to duplicate the essential parts. The following are some specific suggestions that I have personally found helpful when having diagrams read to me. First, read the caption, for it may contain a very good description of the diagram itself. Next, describe the shapes either contained in the diagram or comprising the entire diagram. An example of the former case is a flow chart, a chart consisting of circles, squares, triangles, etc., with connecting arrows. An example of the latter case would be a pie diagram, where a circle is cut into pieshaped sections or wedges. Besides stating the basic geometric shapes, use words for the shapes of any familiar objects, such as crescent, football, piece of bread, sausage, tear drop, etc. Describe the relative sizes of the shapes and any labels, markings, or shading on them. In addition, describe the orientation of the various figures in the diagram, i.e., how the various figures are related to one another. Describe the basic layout, if there is one. An important subcategory of the diagram is the graph. Particularly in mathematics, graphs are widely used. Often they are hard to describe, for they can depict complicated figures, such as the projection of a threedimensional object on a plane. Nonetheless, from my experience, having certain key features of a graph described facilitates the listener’s understanding of whatever the graph is depicting. First, a framework upon which the graph is constructed is needed. In a graph, the horizontal and vertical lines form the axes of a coordinate system. The horizontal line in general is known as the xaxis and the vertical line as the yaxis. (Any letters may be used to label the axes.) If there is a scale marked on the axes, for the horizontal axis it increases from left to right; for the vertical axis it increases from down to up. The point where the axes meet is the origin. The axes divide the plane into four quadrants: the upper right is the first, upper left is the second, lower left is the third, and lower right is the fourth. This is the basic framework upon which the graph is constructed.
53
The following is a list of some of the key features of a graph that should be described: e Read the labels on the axes and any marking or scale on the axes. e If possible, read from left to right, and state in which quadrant the graph begins and in which it ends. e As the graph traverses from left to right, state where it goes up or down and over what point on the xaxis it changes direction. 0 Describe how steeply each portion of the graph goes up or down. Compare that portion to a line which forms a particular angle with the xaxis, such as 1 5 O , 30°,4 5 O , etc., if desired. e State at what points the graph crosses the axes, and where it reaches its local minima or maxima. e Describe the shapes of the various portions of the graph. Examples of shapes are: straight line, semicircle, parabola, sinusoid, etc. e Describe the concavity of the various portions of the graph; specify which portion is concave up (a curve that opens up or a dip) and which portion of the graph is concave down or convex (a curve that opens down or a hump). e Describe the point of inflection, i.e., the point on the graph at which the graph changes concavity. e Specify any points of discontinuity (breaks in the graph) and any cusps (sharp points on the graph). e Describe the symmetry of the graph, i.e., on which line one half of the graph is the mirror image of the other. 0 If there is more than one graph in the figure, describe each graph individually, and describe where they intersect or how they are related to each other. The types of diagrams and graphs are so varied that these few pages cannot help specifically in every case. These suggestions are limited, but it is hoped that not only will they be useful in themselves, but also will inspire the interpreter to develop his own ideas to describe diagrams clearly. This section concludes with a few examples of graphs, each (except the last) accompanied by a suggested verbal description. The last one cannot be reasonably described.
54
EXAMPLES
Y
3
2
1
1
2
y
=
x2

2x, a parabola
Speak The graph is captioned: y equals x squared minus two x, a parabola. The graph has x and yaxes and the scale for both axes is in units of one, labeled from minus three to plus three. The shape of the graph is a parabola, concave up. It is symmetric about the vertical line x equals one. The graph begins in the second quadrant and decreases steeply, almost vertically, from the upper left as it moves to the right. It crosses the origin and continues to go down into the fourth quadrant and reaches the minimum at the point one, minus one. The graph then changes direction to go up and crosses the xaxis again at the point two, zero, moves into the first quadrant and continues to go up steeply.
55
Y
1
y = x3
2
3
X
the cubic
__ Speak
The graph is captioned: y equals x cubed, the cubic. The graph has x and yaxes, and the scale for both axes is in units of one, labeled from minus four to plus four. The graph is antisymmetric about the vertical line x equals zero, the yaxis. The graph begins in the third quadrant and increases steeply as it moves to the right. As it nears the origin it flattens out somewhat, crosses the axes at the origin, remains somewhat flat close to the origin, after which it increases steeply again in the first quadrant. It is concave down for x less than zero and concave up for x greater than zero.
56
4
2
2
4
X
1
Y
=y X
Speak
The graph is captioned: y equals the fraction one over x squared. The graph has x and yaxes and the scale for both axes is in units of two, labeled from minus four to plus eight. The graph is symmetric about the vertical line x equals zero, the yaxis. The graph consists of two separate branches. The first begins in the second quadrant very close to the xaxis. As it moves to the right, the graph increases very slowly until it reaches the point minus one, one. As it continues to approach zero from the left, the graph increases steeply and nears but never touches the yaxis. That is the end of the first branch of the graph, which is entirely contained in the second quadrant. The graph has a discontinuity at x equals zero. The second branch of the graph is entirely contained in the first quadrant. It begins very close to the yaxis. As it moves to the right, the graph decreases steeply, until it reaches the point one, one, where it begins to flatten out, and slowly approaches the xaxis but never touches it. That is the end of the second branch of the graph. 57
Y

1
Speak The graph is captioned: y equals four times e raised to the quantity minus x squared. The graph has x and yaxes and the scale for both axes is in units of one, labeled from minus three to plus four. The graph is a bellshaped curve symmetric about the yaxis and concave down. The graph begins in the second quadrant near the xaxis. When x is less than minus two, the graph increases slowly. When x is greater than minus two and less than zero, the graph increases sharply and crosses the yaxis at the point zero, four. The graph then decreases rapidly for x greater than zero and less than two. For x greater than two, it decreases slowly as it approaches the xaxis but never touches it.
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6
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x
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5 The step function: y
=
1 , 5 5 x LLx>l