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Maths
Jobs/ Courses
for students in or visiting Montreal.
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YOU are better than YOU think. Show yourself how:
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Logic
Mastery
Amazing, Amusing, Amorous, Delicious, Delightful, Edifying,
Strengthening Elixir.
It eases work & learning difficulties Makes the hard easier. Opens eyes.
Leads to greater precision.
in reading and
writing
Do not leave here without it - Logic
mastery will develops critical thinking, improve reading and writing,
and give a firmer base for work and studies at many levels. Good luck.
After logic,
(a) continue reading Three
Skills for Algebra, chapters 8 to 14 and do so alongside site area on solving
linear2007 Equations ; or (b) see this calculus
starter lesson and Volume 3, Why
Slopes & More Math, chapters 2 to 6;
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Caution: Site advice is approximately
correct, for some circumstances, not all. That leaves room for thought |
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What may be learnt and when depends on how skills
and concepts are developed. Making the hard easier and clearer will allow
earlier & richer development of skills and concepts.
Try the Twiddla
Whiteboard. In principle, it allows
to people to draw and chat together online on a copy of this webpage or a clean
sheet. The chat may be via text or audio. Visit www.twiddla.com
to set up whiteboards to work with the webpage of your choice.
For online automated help in senior high school maths & calculus,
visit quickmath.com For Automatic
Calculus and Algebra Help with derivatives, integrals, graphs, linear equations,
matrix algebra, visit calc101.com
With overlap, each site quickmath
& calc101offers a different range of
services, some free, some not, all based on webmathematica. Good luck.
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Volume 1, Elements
of Reason, introduces all site volumes.
[Online Books and More Site Areas]
[Study Tips] [Directions for High School Mathematics -
Calculus Preparation] [Curriculum
Shifts - Shorter, Better, Stronger] [References]
Preparation for calculus provides the motivation for many skills and topics
in high school mathematics courses. Preparation for calculus is good
preparation for most, if not all, arts and subjects at work and school that
require some mathematics and logic.
Similar Directions: The earlier site preparation
for calculus page (written earlier) offers similar directions in
three different ways - lean, wordy and very wordy. The words comment on the
development of ideas in the classroom or historically.
Computer Games: If you play 3D computer
games and want to write your own, you will need a good command of logic,
fractions, algebra and geometry. The same advice applies if you want to enter
a business, trade or science.
Follow the steps below alone or with help. The review of
fractions etc in step 4 should come after steps 2 or 3. Other than that, which
step to put first appears to be a matter of taste. Site areas which do not
appear in these steps contain further material - optional reading. On first
reading, focus on learning how, and leave explanations why for later.
-
Put logic First (if possible). Read the first logic
chapters in Volume 2. Logic mastery will, we hope, ease fears
and difficulties, or if you have none, enrich skills and
knowledge.
Master logic carefully to
develop precision reading and writings. Skills and knowledge are
easier to obtain when you are able to read precisely what is written, and do
not assume too much. Marks in all subjects are base on your written
work. Precision reading will help you recognize errors in your written work
through the question: does it, your written work, say precisely what
you meant?
Secondary I
and II Material
-
Meet the
role of fractions in algebra: Explore the site area Solving
Linear Equation with stick diagrams to further develop your
algebra skills - those needed for solving problems in one or essentially one
unknown, and see how fractions of line segments, the sticks, are combined
(added, subtracted, multiplied and divided) exactly in the solution of
linear equations.
Next read the Chapter 15, solving
linear equations, in Three Skills for Algebra, alone or with help. The
discussion of general systems is optional for junior high school students.
Test your algebra skills
and linear
equation problem solving skills.
Remark: Steps 1 to 4 may be covered in junior or
senior high school, the sooner the better. The following steps are for
senior high school students and older students in college or adult
education.
-
Review or Develop Algebra and Fraction Sense and Skills.
Read (i) the algebra
chapters 8 to 14 Volume 2, Three Skills for Algebra.
The shorthand role of letters and symbols is meaningless for
many people in school and out. But the shorthand role is easier
to grasp when we first learn
to talk about numbers and quantities, and how
they may vary, before the use of letters and symbols. Doing that
would make algebraic ways of writing and reasoning clearer in calculus and
all of high school mathematics.
Chapter 14, Compound Interest,
in Three Skills for Algebra, develops algebraic skills with the aid of a
calculator. Calculators are useful but success and precision in mathematics
requires efficiency with fractions without one. --- Beside talking
about numbers and quantities, there is a fourth skill for algebra in Three
Skills for Algebra, namely a development of the ability to talk about or
describe the numerical and algebraic use of formulas and equations with
short descriptive phrases: (i) forward and backward use (or direct and
indirect use) and (ii) algebraic and arithmetic (numerical) solutions.
These phrases appear in Chapter 14.
can be used through out high school mathematics to identify recurring themes
- key objectives - and to provide another fresh perspective on the algebraic
way of writing and reasoning.
Alternate Between Steps 3 and 4 if you
wish. Each one has a different taste. The addition of animated graphic
make Solving Linear Equation with stick
diagrams easier than before.
If you spend grades 1 to 11 or 12 in
mathematics classes without mastering fractions sense and skills properly
and efficiently, you have been cheated - several hundred or thousand hours
of your time has been wasted.
-
Optional but Recommended: (i) Visit the fraction
pages in the site area, Fractions,
Ratios, Rates, Proportions & Units, to check your fraction sense
(step 4 could have helped in here) and to see the justification of methods
for adding, subtracting, dividing, multiplying and comparing fractions. (ii)
Develop an algebraic view of problem solving with units and with rates and
proportions, binary or multiple, direct, joint or inverse. (iii) learn how
to carry units through solutions in a way that relies more on mechanical
skill in algebra than on thought. Here is an algebraic perspective and
clarification of skills and concepts in junior high school mathematics,
which may be read after steps 1 to 4 above.
The site area Fractions,
Ratios, Rates, Proportions & Units view of junior high school
concepts may help teachers & tutors develop skills and concepts. Senior
high school students may explore this area to review and reform their
understanding. Area material needs to be rewritten to make it readable for
junior high school students. Writing is an iterative process in which the
first draft is not always best.
Fractions are needed for algebra and beyond. In modern times, that is
today, we see and will see more and more cognitive experts and
curriculum advisors suggest the replacement of fractions and algebra
skills and sense development with calculator push-button
exercises in which the intellectual component of mathematics
instruction is eliminated to provide a child- and technology- centered
learning environment. Yet arithmetic mastery was and remains a sign of
intelligence in work and study.
-
Check & Consolidate your Arithmetic Skills. Do
asap, the first set of
arithmetic problems, chapter 7 of Volume 2, Three
Skills for Algebra, See too Simplification
of square roots. Logic
mastery asap is recommended for greatest benefit from site pages.
In doing exact arithmetic, if your result is not the
same as that of another, one of you has made an error. Learning how
to follow methods so that you obtain repeatable, reproducible and thus
verifiable results is a must, not always emphasized, for work, school and
home.
See too these Real Player arithmetic
webvideos - a few a day, not all at once.
Aim for a logic-based mastery of mathematics after
arithmetic. That being said, arithmetic can be learnt by rote,
know-how without the know-why, provided you put aside your calculator and
learn the times and addition tables and learn to do arithmetic with
fractions and decmals (add, multiply, divide and subtract) in
an objective, efficient and automatic manner - arithmetic results
should be repeatable and reproducible, and you should know that an error
in one step makes all the rest wrong. Once you have a
logic-based mastery of mathematics after arithmetic, you can if you want
retreat to develop a deeper, logic-based understanding of
arithmetic, a retreat that could become easier, and a retreat that can be
woven in to the explanation of further mathematics for skill perfection
and enrichment.
Secondary
IV and V Material
-
Master Geometry without and with coordinates: Site
areas on Euclidean
Geometry and Analytic
Geometry offer senior high school students and teachers lean
logic-based development and connections of plane geometry, plane
trigonometry and functions of one variable. The site coverage of Analytic
Geometry does not include all that calculus requires, but is a start,
and the missing material can be found elsewhere.)
| Remark A:
The treatment of Euclidean
Geometry is not full, but it is enough to provide a logic-based
consolidation of the skills and concepts seen in junior and high
school mathematics, those needed to develop analytic geometry and
calculus. The treatment of Analytic
Geometry assumes results of the site treatment Euclidean
Geometry with the assumption that real numbers alone or in ordered
pairs may provide coordinates for lines and planes in space. The
result is a logical, coordinate based, development of the key skills
and concepts in analytic geometry, plane trigonometry and functions.
The reliance seen here on geometric diagrams can be replaced and will
be in studies of modern pure mathematics. Or, we could use the
alternate route in Remark B. |
Remark B: Step 6 follows the
traditional path of defining trigonometric functions for acute angles
with the aid of similarity postulates before defining them for all
angles. This complex numbers
introduction leads to trigonometry in general for all angles, with
right-angle triangle, similarity based, trigonometry coming
last. For the brave, that gives faster route for
developing the senior high school mathematics which calculus and
electrical studies requires. This route is leaner in that
its reduces the need for Euclidean
Geometry to a discussion of similarity
principles. |
| Remark C: In the
modern mathematics curricula of the late 1950s and 1960s, sputnik
inspired, there is a fuller treatment of coordinate-free Euclidean
geometry along side a general emphasis on logic. Geometric proofs were
challenging - not student friendly. So Geometry was eliminated. But
Euclidean Geometry was the traditional place for the emphasis of logic
and Euclidean model for reason. Site logic
and Pattern Based
Reason chapters present the Euclidean model in a math-free way and
do so to develop better study skills - or the precision reading and
writing better work and study skills demand. |
-
Test your arithmetic and Algebraic Skills: Try the remaining
problem sets in Chapter 7 of Volume 2. Get someone to identify all
errors in your answers in notation and comprehension, so you can learn from
your mistakes.
-
Optional: Explore the Number
Theory Site Area. Here is a mix of easy and challenging lessons, some in
sequence. If one lesson or sequence is not to your liking, try another.
Secondary VI
& VII Material
-
Meet or Revisit Calculus: Begins with the why slopes geometric
preview before the more algebraic
why slopes preview chapters in Volume 3. Then explore more of the site Calculus
Introduction.
Remark: The introduction points to simpler ways to
cover the first steps in calculus. Those simpler ways are for all. The
algebraic way of writing and reasoning is usually required suddenly in
calculus. The previews here and the latter decimal view of limits,
continuity and convergence provides a more accessible and less algebraic
demanding or shocking approach to calculus.Then the introduction includes
enriched material - the proofs that are often omitted in first courses.
Innovations here make the proofs easier to understand, but not simple. The
enriched material is for people who do not like to accept mathematical
methods without proof. The site area Real-Analysis-Decimal-View
(advance calculus) and the calculus introduction at this site emphasize an
error-control decimal view of limits, continuity, convergence.
Remark The Modern Mathematics movement of the 1950s
and 60s made calculus algebraically hard or inaccessible need-be by
following a decimal-free view prevalent in pure mathematics. Here is a
correction sufficient for students outside of pure mathematics that may
provide a stepping stone and context for the decimal-free, epsilon-delta
view of pure mathematics.
Remark: Steps 5
onward can be followed or explored in any order you like.
Learners at all levels need someone to review
their written work for mistakes in notation and comprehension in order to
learn from their mistakes. Every time someone (on your side) identifies a
mistake, say thank you because now you know not to make that mistake
again. Do not worry, your helper will be employed in identifying further
mistakes. It is a win-win situation.
| |
whyslopes.com
Entrance Level
UK Tutors -All
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Lesson Plans - Sec I
Lesson Plan, Sec II
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Secondary Maths, Core Elements
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Vol 1. Elements of Reason
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Arithmetic Check List
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Calculus. Guide Short
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Calculus Guide - Longest
Links - Many Subjects
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Long Site Intro
Logos Cafe
Logic Check List
Mathematics Cafe
Math CheckList
A Site Map
Advice for Secondary I Students
Three Ways to be a Better Student
Reason for HS Mathematics
Three Links for Teachers:
(i) First
Year High School Math - Lesson Plans with Fraction Focus
(ii) Second
Year High School Math - Lesson Plans with an algebra focus
(iii) Algebra
Lesson Plans
Help U Learn/ Teach
- Algebra
words before symbols
- direct & indirect
use of formula, numerical versus algebraic solutions - what
is a variable (more words)
- Arithmetic
- exercises
- with fractions
-
videos on primes, lcm, gcm,lcd, square roots etc
- Calculus - geometric
preview, algebraic
preview,
3 study guides,
much more
- Complex numbers
-starter lesson with java applet - easy
consequences for trig & vectors in the plane
- Education
- Empirical Course Design
& Delivery
- Fractions
- alone
- by rote
- with
algebra
- videos
- Functions - introduction
hindsight
- composition aka
substitution -
- Geometry, Euclidean - Correspondence
of triangles, Triangle
construciton, duplication & Isometry - Failure
of ASA & the // line postulate - angle
sum in triangles -//
grams - Triangle
Similarity
- Geometry-
Analytic - functions, polynomials, complex numbers, unit circle
trigonometry
- Logic
- First Steps -
Symbols in Logic
-
Occurrence &
Truth Tables - Indirect
Reason -Indirect
Reason More
- Proportionality
- Definition -
Direct & Indirect Use - Numerical versus Algebraic Solutions
- Real Analysis
- Decimal View of concepts
and of proofs
- Rules &Patterns in Science, Technology & Society
- Pattern Based Reason
- Mathematical Reasoning, empirical, inductive or deductive
- Units
- in rates & slopes &
(?) derivatives
- in ratios
& proportions - slopes & rates included
- Complex Numbers & Vectors & Trig
- trig expression for dot
& cross - cosine law
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