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Previous Chapter: 5 Islands and Division of Knowledge
Implication rules can be stated in several ways. We need to recognize
how. This book (and its companion Pattern Based Reason) introduce or coin
terms one- and two-way implication for concepts previously and even
currently called conditional and biconditional statements. This chapter
fulfils the obligation to explain or point out the (proposed) change of
language.
One-Way Implication Rules
(conditional statements)
In the chapter Implication Rules, we met the rule
when Aunt Jane visits her nephew Tom's home,
Tom goes out to play
Rules like this can be said in different ways. This gives
variety and choice in the way in which we write rules. The form of a rule does
not matter, if we understand exactly what it says. The above one-way rule can
also be rewritten (or restated, again without changing its meaning) using the
words IF and THEN as follows.
IF Aunt Jane visits her nephew Tom's home
THEN
Tom goes out to play.
The word IF introduces a condition, namely Aunt Jane's visit to
her nephew Tom's home. The word THEN introduces the consequence, what should
occur, when the condition is satisfied. Here the consequence is Tom goes out
to play. Since the original rule can be rewritten in the IF condition
THEN consequence form, we say the original rule and the if-then form are conditional
statements.
A statement If A then B is only false when the situation or
condition A occurs, but the anticipated consequence B does not.
Another way of writing the above one-way Aunt Jane and nephew Tom rule (with
no change in meaning) is given by:
Aunt Jane's visit to her nephew Tom's home
implies
Tom goes out to play.
The words forces or makes may be used instead of the
word implies. We could also use the word suggests, but in everyday use, a
suggestion is optionally obeyed or followed while a rule (when it is correct)
should or must be obeyed or followed. In talking about rules, we use the words implies,
forces or makes for those rules we expect will be obeyed, or more
precisely will never be disobeyed in the circumstances at hand.8
8The explicit
identification of such circumstances is exhaustive unless the circumstances in
question are understood from a context, an obvious one, we hope.
Two-Way Implication Rules
(biconditional statements)
In the previous chapter Implication Rules, we met the rule
Tom goes out to play
when and only when
Aunt Jane visits his home
This is an example of a two-way rule. Two-way rules can also
be said or presented in different ways. Again the form of a rule does not
matter, provided we recognize exactly what is meant. The above rule also can be
rewritten (or restated, again without changing its meaning) in the
if-and-only-if form:
Aunt Jane visits her nephew Tom's home
if and only if
Tom goes out to play.
This form suggests we call such rules biconditional statements. The
prefix bi- here signals two ways. Whenever the condition (or situation) Aunt
Jane visits her nephew Tom's home occurs, the other condition (or situation)
Tom goes out to play must also occur, and vice-versa, if this rule is to
be never-disobeyed.
You may prefer to say if and only if instead of when and only when.
For instance, I might say or suggest to you: I will do that for you if and
only if you do this for me. Alternatively, I might say or suggest to you: I will
do that for you when and only when you do this for me. Tone provides the only
difference between the two suggestions. Both of these suggestions represent a
two-way obligation to which we might agree. Confusion or disappointment or false
expectations may happen when suggestions such as these are not explicitly
accepted or rejected.
Two-Way or Two One-Way Rules
The two-way Aunt Jane and nephew Tom rule above is rewritten (with no change
in meaning) as Aunt Jane visits her nephew Tom's home
implies
Tom goes out to play,
and also that
Tom goes out to play
implies
Aunt Jane visits her nephew Tom's home.
In this form, the two-way rule is seen to be the same as two one-way
implication rules, each going in the opposite direction.
Equivalent Conditions
Two situations or conditions, each of which must happen whenever the other
does, are said to be equivalent to each other. So when a first situation
is equivalent to a second, each situation implies and is implied by the other.
Conditional versus Biconditional
One-way and two-way implications are called conditional and biconditional
statements (or rules), respectively.
The Abbreviation Iff
The terms and phrases
- if and only if
- when and only when
- iff (shorthand for if and only if)
can all be used instead of each other. They are interchangeable. No matter what
term or phrase is used to indicate a two-way implication, the difference between
one-way and two-way needs to be remembered. Otherwise, statements, definitions
and assertions will be read incorrectly.
Reading Guide
The last chapters describe more ideas in rule-based
reason.
Postscript - Another Reading Guide. Arithmetic and algebraic
expressions and formulas are like pictures better read in silence than spoken
aloud. That situation has led to a lack of words in mathematics. The
Discussion of Three Skills for Algebra in Chapter 8 to 12
provide a wordy, or too wordy remedy. See how much you swallow today, and
return for the rest to perfect your skills and comprehension later. Note too,
further skills for algebra, a fourth and/or fifth appear in Chapter 14. That
chapter introduces two unifying themes for secondary school mathematics:
- The forward and backward use of almost all formulas and equations (those
in function form y = something)
- The connection between arithmetic (or numerical) solution and algebraic
solution methods in the backward use of formulas and equations. If you
understand the algebraic solution, you are halfway to understanding the full
strength use of algebra in senior high school mathematics and
calculus.
So now, read on and get a headstart or catch-up for
high school mathematics and/or calculus. Good luck.
Next Chapter: Arithmetic Skill Check for Calculus
and Pre-calculus Students - Is your arithmetic precise and efficient?
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Three Skills
For
Algebra
Volume 2
Printed in Canada
ISBN 0-9697564-2-9
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Read slowly, this work may enrich your
skills & knowledge. Take the risk.
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Chapters and Appendices
Foreword
1. Introduction
2. Implication Rules [4]
3. Chains of Reason [3]
4. Induction Mathematical
4. Romeo and Juliet
6 Old Language
5 Knowledge Islands [2]
7 Arith Skill Check [4 X 2]
Arith Webvideos
7. The Next Chapters
8 The Three Skills
8 VNR-Concise-Encyclopedia
PS. What is a Variable [8]
9. Algebra Talk [7]
10 Two More Skills[5]
11 Why Shorthand
12 Shorthand Usage [10]
13 What's Next
PS: The 4-th Skill For Algebra
14 Compound Interest [6]
15 Linear Equations [5]
16 Painless Proofs
17 Pythagoras
PS I. Distributive Law
PS II. Polynomials
18 Rules of Algebra [20]
19 Functions & Sets
20 Degrees & Radians
21 What's Next
22. Arith & Geometric Sums [2]
23 Summation Notation
24 Your Money [3]
25 Induction & Recursion [4]
26 What's Next
27 Pronouns in Logic
28 Occurrence Tables
29 Contrapositive
30 Truth Tables
31 Indirect Reason
Pathways for Learning
Book Entrance
What is a Variable?
Introduction
Variation between Examples
Variation of Letters
A letter denotes a variable
Cases of Double Variation
Three Notions of a Variable
Constants, Parameters
& Variables
Talking about numbers
Dependent
or Independent
Variable, a Matter of Choice
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For
Senior
High School & Calculus Students
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<| (o) (o)
|>
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/
\___ _/
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-/[]\-
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Words to clearly
introduce algebra and variables
have been missing in course design. For people who cannot do
algebra,
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the missing words may
explain or ease their difficulties. Volume 2 ,Three
Skills for Algebra, in Chapters
8 to 14 & 18 etc, puts words before symbols to
providing the missing words in a way that enrich the
comprehension of all. Those words form the middle part of a algebra
(and logic) lessons aimed at helping or improving all
of high school mathematics and also calculus course
design & delivery.
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For Avid Readers in School & Out -
Online Books
1. Elements of
Reason. 1996
1A. Pattern
Based Reason 1995
1B. Math
Curriculum Notes 1996
2. Three
Skills for Algebra 1995
3.Why
Slopes & More.Math
1995
Tour their forewords.
Calculus Prep or Help: See Volumes 2 & 3,
and this bigger
Calculus
Guide. If your
calculus questions is not answered here, submit
it. Over time, that may complete the site development of
calculus.
For Parents: Speaking
Skills, Reading
& Writing,
Preparing for Science, ends,
values and methods for work and study, parent- friendly maths
skill development booklets for ages 4-14.
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Mostly
For High
School
Intro to Solving
Linear Equations
- a different paths for junior and even senior high
school students. Question for Tutors: When do
you use and when you skip the stick diagram method
here?
Fraction
Skills, thought-based development, Ages 10 to 14 may need a
tutor. Students who have to understand in order
to do may like the development in all or part.
For Senior
High School Mathematics & Calculus
5
wordy Logic
Chapters
4 curious Algebra
Chapters
Words before & besides symbols. A Key Algebra
forward & backwards Chapter
First Calculus
Preview (1st intro)
Four Calculus
Chapters
(2nd intro)
Intro to Complex
Numbers (long)
Intro to Mathematical
Induction (romantic & wordy at first)
Tutors & Instructors:
These lessons introduce skills differently Would you
recommend them?
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More Topics
1. Decimal
Arithmetic Reference!
2. Integers
- Intro to Signed No.s
3. Fractions
- fully explained.
4. Fractions
with Units
5. Number
Theory,
6. Solving
Linear Equations
7 Formulas
for- & backwards -
8. Proportionality,
Back- & For-wards.
9. Logic
Chapters:
10. Euclidean-Geometry
11. Slopes
& Equations of Straight Lines. (Take
I. See take II below)
12. Why
Study Slopes.
13. Maps,
Plans, Similarity & Trig,
(Take II included here)
14. Quadratics:
Starter lessons
15. Polynomials:
Starter lessons
16 Why
Factor Polynomials:
17 Functions
- Forwards & Backwards.
18. Exponents,
Radicals & logs.
19. Complex
Numbers before trig (new advance/ starter lesson)
20. DC
Electric
Circuits Etc
21. Real
Analysis
22. The
Olde Complex No, Trig
& Vector Section.
23. More
Calculus Stuff
- written after Volumes 2 and 3.
Level I Material: New Stuff
Time and Date Matters
Level I Arithmetic.
Money Matters
Measurement Matters
Matters of Chance (Risk Control)
Logic
Chapters
(leave what's not clear in Level I to Level II)
Using/Making Maps and Plans.
(A variant of
Maps,
Plans, Similarity & Trig, to
appear here).
For Instructors
-
Education
Essays
(opinions,
possibilities, references)
- Free
Advice and Directions for teaching primary & high school maths
will be given in online meeting place with voice &
whiteboard.
- Math & Logic How-TOs
1. Arithmetic
2. Algebra
3. More Algebra
4. Beginner Geometry
5. More Geometry
6. Calculus
7. Show Work or Logic
These may be too dense for students. Offering ideas to change
education makes this site different. Nothing
ventured, nothing gained. Site material is
mathematically correct, and where not, please report
errors. The two level program POMME in the site
entrance implies multiple paths for instruction. Supporting
those paths in turn implies a clear destination for
site development and perhaps a new name.
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