Rabu, 06 Agustus 2008

What is a rational number? Which numbers have rational square roots? The decimal representation of irrationals. What is a real number?

Functions

What is a function? Functional notation. A function of a function.

Introduction to graphs

The graph of a function. Coördinate pairs of a function. The height of the curve at x.

Basic graphs

The constant function. The identity function. The absolute value function. A parabola. The square root function. The cubic function.

The vocabulary of polynomial functions

Definition of a polynomial in x. The degree of a term and of a polynomial. The leading coefficient. The general form of a polynomial.

The roots, or zeros, of a polynomial

The polynomial equation. The roots of a polynomial. The x- and y-intercepts of a graph. The relationship between the roots and the x-intercepts.

The slope of a straight line

Definition of the slope. Positive and negative slope. A straight line has only one slope.
"Same slope" and "parallel." Perpendicular lines.
The slope and one point specify a straight line.

Linear functions: The equation of a straight line

The equation of the first degree. The graph of a first degree equation -- a straight line. The slope-intercept form, and its proof.

Quadratics: Polynomials of the second degree

Solving a quadratic equation by factoring. A double root. Quadratic inequalities. The sum and product of the roots.

Completing the square

Solving a quadratic equation by completing the square. The quadratic formula.

Synthetic division by x − a

The remainder theorem.

Roots of polynomials of degree greater than 2

The factor theorem. The fundamental theorem of algebra. The integer root theorem. Conjugate pairs.

Multiple roots. Point of inflection.

Concave upward, concave downward.

Reflections of a graph

Reflection about the x-axis. Reflection about the y-axis. Reflection through the origin.

Symmetry of a graph

Symmetry with respect to the y-axis. Symmetry with respect to the origin. Test for symmetry. Odd and even functions.

Translations of a graph

Definition of a translation. The equation of a circle.
The vertex of a parabola. Vertical stretches and shrinks.

Rational functions

Singularities. The reciprocal function. Horizontal and vertical asymptotes.

Inverse functions

Definition of inverses. Constructing the inverse.
The graph of an inverse function.

Logarithms

The system of common logarithms. The system of natural logarithms. The three laws of logarithms.

Logarithmic and exponential functions

Factorials

Permutations and Combinations

The Fundamental Principle of Counting. Factorial representations.

The binomial theorem

Pascal's triangle.

Multiplication of sums

A proof of the binomial theorem.

Mathematical induction

TOPIC IN TRIGONOMETRY from Themathpage

Ratio and Proportion. Similar Triangles

Radicals: Rational and Irrational

Numbers

The Pythagorean Theorem

Definitions of the Trigonometric

Functions of an Acute Angle

Trigonometry of Right Triangles

Similar figures. All functions from one function. Complements. Cofunctions.

The Isosceles Right Triangle

Solving Right Triangles

The Law of Sines

The Law of Cosines

The Circle

The definition of π. The remarkable π/4.

Evaluating π

The ratio of a chord to the diameter.
The area of a circle.

Measurement of Angles

Standard position. Degree measure.
The four quadrants. Coterminal angles.

Radian Measure

Radians into degrees. Degrees into radians. Coterminal angles. The multiples of π.

Arc Length

The definition of radian measure. s = rθ.

Analytic Trigonometry: The Unit Circle

The analytic definition of the trigonometric functions.
The signs in each quadrant.
Quadrantal angles.

Trigonometric Functions of Any Angle

The corresponding acute angle.
cos (−θ) and sin (−θ). Polar coordinates.

Line Values

Graphs of the trigonometric functions

The zeros of sin θ. The period of a function.

Inverse trigonometric functions

Trigonometric identities

Three-place Trigonometric Table

Some Theorems of Plane Geometry

High School Math from homeworkspot.com

Probability

Trigonometry

Word Problems

Math Students from Math Goodies

If you are a student in need of help, just click on a quick link below.

lesson Negation

lessom probability

Conditional Probability

Challenge exercise(probability)

homeschoolmath

Rabu, 23 Juli 2008

OnTrigonometry

History Usage Functions Inverse functions Further reading
Reference
List of identities Exact constants Generating trigonometric tables CORDIC
Euclidean theory
Law of sines Law of cosines Law of tangents Pythagorean theorem
Calculus
The Trigonometric integral Trigonometric substitution Integrals of functions Integrals of inverses

Kamis, 17 Juli 2008

Vektor dalam matematika merupakan besaran dengan arah tertentu. Vektor dapat dideskripsikan dengan sejumlah komponen tertentu, tergantung dari sistem yang digunakan. Contoh dari vektor yang terkenal adalah gaya gravitasi. Gaya gravitasi tidak hanya memiliki besar, namun juga arah yang menuju pusat gravitasi.
Panjang Vektor

Untuk mencari panjang sebuah vektor dalam ruang euklidian tiga dimensi, dapat digunakan cara berikut:

$\left\|\mathbf{a}\right\|=\sqrt{a_1^2+a_2^2+a_3^2}$

Kesamaan Dua Vektor

Dua buah vektor dinamakan sama apabila dua-duanya memiliki panjang dan arah yang sama

Kesejajaran Dua Vektor

Dua Buah Vektor disebut sejajar (paralel) apabila garis yang merepresentasikan kedua buah vektor sejajar.

Operasi Vektor

Perkalian Skalar

Sebuah vektor dapat dikalikan dengan skalar yang akan menghasilkan vektor juga, vektor hasil adalah:

$r\mathbf{a}=(ra_1)\mathbf{i} +(ra_2)\mathbf{j} +(ra_3)\mathbf{k}$

Penambahan Vektor dan Pengurangan Vektor

Sebagai contoh vektor a=a₁i + a₂j + a₃k dan b=b₁i + b₂j + b₃k.

Hasil dari a ditambah b adalah:

$\mathbf{a}+\mathbf{b} =(a_1+b_1)\mathbf{i} +(a_2+b_2)\mathbf{j} +(a_3+b_3)\mathbf{k}$

pengurangan vektor juga berlaku dengan cara yang kurang lebih sama

Vektor Satuan (Unit Vector)

Vektor satuan adalah vektor yang memiliki panjang 1 satuan panjang. Vektor satuan dari sebuah vektor dapat dicari dengan cara:

$\mathbf{\hat{a}} = \frac{\mathbf{a}}{\left\|\mathbf{a}\right\|} = \frac{a_1}{\left\|\mathbf{a}\right\|}\mathbf{\hat{i}} + \frac{a_2}{\left\|\mathbf{a}\right\|}\mathbf{\hat{j}} + \frac{a_3}{\left\|\mathbf{a}\right\|}\mathbf{\hat{k}}$

Lihat pula

Rabu, 16 Juli 2008

Major fields of mathematics

Arithmetic ·

Logic ·

Set theory ·

Category theory ·

Algebra (elementary – linear – abstract) ·

Discrete mathematics ·

Number theory ·

Analysis ·

Geometry ·

Trigonometry ·

Topology ·

Applied mathematics ·

Probability ·

Statistics ·

Mathematical physics

Islamic Mathematicians

Al-Hajjāj ibn Yūsuf ibn Matar · Muhammad ibn Mūsā al-Khwārizmī · Al-Abbās ibn Said al-Jawharī · 'Abd al-Hamīd ibn Turk · Al-Kindi · Hunayn ibn Ishaq · Banū Mūsā · Al-Mahani · Ahmed ibn Yusuf · Thābit ibn Qurra · Al-Hashimi · Muhammad ibn Jābir al-Harrānī al-Battānī · Abū Kāmil Shujā ibn Aslam · Sinan ibn Thabit · Al-Nayrizi · Ibrahim ibn Sinan · Abū Ja'far al-Khāzin · Al-Karabisi · Brethren of Purity · Abu'l-Hasan al-Uqlidisi · Al-Saghani · Abū Sahl al-Qūhī · Abu-Mahmud al-Khujandi · Abū al-Wafā' al-Būzjānī · Ibn Sahl · Al-Sijzi · Labana of Cordoba · Ibn Yunus · Abu Nasr Mansur · Kushyar ibn Labban · Al-Karaji · Ibn al-Haytham · Abū Rayhān al-Bīrūnī · Avicenna · Ibn Tahir al-Baghdadi · Alī ibn Ahmad al-Nasawī · Al-Jayyani · Abū Ishāq Ibrāhīm al-Zarqālī · Yusuf al-Mu'taman ibn Hud · Omar Khayyám · Ibn Yahyā al-Maghribī al-Samaw'al · Sharaf al-Dīn al-Tūsī · Ibn Mun`im · al-Marrakushi · Nasīr al-Dīn al-Tūsī · Muhyi al-Dīn al-Maghribī · Shams al-Dīn al-Samarqandī · Ibn Baso · Ibn al-Banna · Kamāl al-Dīn al-Fārisī · Al-Khalili · Ibn al-Shatir · Qādī Zāda al-Rūmī · Jamshīd al-Kāshī · Ulugh Beg · Al-Umawi · Al-Qalasadi · Ali Kuşçu · Al-Birjandi · Taqi al-Din · Muhammad Baqir Yazdi

Selasa, 15 Juli 2008

Mathematics,The Most Misunderstood Subject

Article by Dr. Robert H. Lewis

Professor of Mathematics, Fordham University

For more than two thousand years, mathematics has been a part of the human search for understanding. Mathematical discoveries have come both from the attempt to describe the natural world and from the desire to arrive at a form of inescapable truth from careful reasoning. These remain fruitful and important motivations for mathematical thinking, but in the last century mathematics has been successfully applied to many other aspects of the human world: voting trends in politics, the dating of ancient artifacts, the analysis of automobile traffic patterns, and long-term strategies for the sustainable harvest of deciduous forests, to mention a few. Today, mathematics as a mode of thought and expression is more valuable than ever before. Learning to think in mathematical terms is an essential part of becoming a liberally educated person.
-- Kenyon College Math Department Web Page

"An essential part of becoming a liberally educated person?" Sadly, many people in America, indeed, I would have to say very many people in America, would find that a difficult and puzzling concept. The majority of educated Americans do not think of Mathematics when they think of a liberal education. Mathematics as essential for science, yes, for business and accounting, sure, but for a liberal education?

Why do so many people have such misconceptions about Mathematics?

The great misconception about mathematics -- and it stifles and thwarts more students than any other single thing -- is the notion that mathematics is about formulas and cranking out computations. It is the unconsciously held delusion that mathematics is a set of rules and formulas that have been worked out by God knows who for God knows why, and the student's duty is to memorize all this stuff. Such students seem to feel that sometime in the future their boss will walk into the office and demand "Quick, what's the quadratic formula?" Or, "Hurry, I need to know the derivative of 3x^2 - 6x +1." There are no such employers.

What is mathematics really like?

Mathematics is not about answers, it's about processes. Let me give a series of parables to try to get to the root of the misconceptions and to try to illuminate what mathematics IS all about. None of these analogies is perfect, but all provide insight.

ball Scaffolding.

When a new building is made, a skeleton of steel struts called the scaffolding is put up first. The workers walk on the scaffolding and use it to hold equipment as they begin the real task of constructing the building. The scaffolding has no use by itself. It would be absurd to just build the scaffolding and then walk away, thinking that something of value has been accomplished.

Yet this is what seems to occur in all too many mathematics classes in high schools. Students learn formulas and how to plug into them. They learn mechanical techniques for solving certain equations or taking derivatives. But all of these things are just the scaffolding. They are necessary and useful, sure, but by themselves they are useless. Doing only the superficial and then thinking that something important has happened is like building only the scaffolding.

The real "building" in the mathematics sense is the true mathematical understanding, the true ability to think, perceive, and analyze mathematically.

ball Ready for the big play.

Professional athletes spend hours in gyms working out on equipment of all sorts. Special trainers are hired to advise them on workout schedules. They spend hours running on treadmills. Why do they do that? Are they learning skills necessary for playing their sport, say basketball?

Imagine there're three seconds left in the seventh game of the NBA championship. The score is tied. Time out. The pressure is intense. The coach is huddling with his star players. He says to one, "OK Michael, this is it. You know what to do." And Michael says, "Right coach. Bring in my treadmill!"

Duh! Of course not! But then what was all that treadmill time for? If the treadmill is not seen during the actual game, was it just a waste to use it? Were all those trainers wasting their time? Of course not. It produced (if it was done right!) something of value, namely stamina and aerobic capacity. Those capacities are of enormous value even if they cannot be seen in any immediate sense. So too does mathematics education produce something of value, true mental capacity and the ability to think.

ball The hostile party goer.

When I was in first grade we read a series of books about Dick and Jane. There were a lot of sentences like "see Dick run" and so forth. Dick and Jane also had a dog called Spot.

What does that have to do with mathematics education? Well, when I occasionally meet people at parties who learn that I am a mathematician and professor, they sometimes show a bit of repressed hostility. One man once said something to me like, "You know, I had to memorize the quadratic formula in school and I've never once done anything with it. I've since forgotten it. What a waste. Have YOU ever had to use it aside from teaching it?"

I was tempted to say, "No, of course not. So what?" Actually though, as a mathematician and computer programmer I do use it, but rarely. Nonetheless the best answer is indeed, "No, of course not. So what?" and that is not a cynical answer.

After all, if I had been the man's first grade teacher, would he have said, "You know, I can't remember anymore what the name of Dick and Jane's dog was. I've never used the fact that their names were Dick and Jane. Therefore you wasted my time when I was six years old."

How absurd! Of course people would never say that. Why? Because they understand intuitively that the details of the story were not the point. The point was to learn to read! Learning to read opens vast new vistas of understanding and leads to all sorts of other competencies. The same thing is true of mathematics. Had the man's mathematics education been a good one he would have seen intuitively what the real point of it all was.

ball The considerate piano teacher.

Imagine a piano teacher who gets the bright idea that she will make learning the piano "simpler" by plugging up the student's ears with cotton. The student can hear nothing. No distractions that way! The poor student sits down in front of the piano and is told to press certain keys in a certain order. There is endless memorizing of "notes" A, B, C, etc. The student has to memorize strange symbols on paper and rules of writing them. And all the while the students hear nothing! No music! The teacher thinks she is doing the student a favor by eliminating the unnecessary distraction of the sound!

Of course the above scenario is preposterous. Such "instruction" would be torture. No teacher would ever dream of such a thing, of removing the heart and soul of the whole experience, of removing the music. And yet that is exactly what has happened in most high school mathematics classes over the last 25 years. For whatever misguided reason, mathematics students have been deprived of the heart and soul of the course and been left with a torturous outer shell. The prime example is the gutting of geometry courses, where proofs have been removed or deemphasized. Apparently some teachers think that this is "doing the students a favor." Or is it that many teachers do not really understand the mathematics at all?

ball Step high.

A long time ago when I was in graduate school, the physical fitness craze was starting. A doctor named Cooper wrote a book on Aerobics in which he outlined programs one could follow to build up aerobic capacity, and therefore cardiovascular health. You could do it via running, walking, swimming, stair climbing, or stationary running. In each case, he outlined a week by week schedule. The goal was to work up to what he called 30 "points" per weeks of exercise during a twelve week program.

Since it was winter and I lived in a snowy place, I decided to do stationary running. I built a foam padded platform to jog in place. Day after day I would follow the schedule, jogging in place while watching television. I dreamed of the spring when I would joyfully demonstrate my new health by running a mile in 8 minutes, which was said to be equivalent to 30-points-per-week cardiovascular health.

The great day came. I started running at what I thought was a moderate pace. But within a minute I was feeling winded! The other people with me started getting far ahead. I tried to keep up, but soon I was panting, gasping for breath. I had to give up after half a mile! I was crushed. What could have gone wrong? I cursed that darn Dr. Cooper and his book.

I eventually figured it out. In the description of stationary running, it said that every part of one's foot must be lifted a certain distance from the floor, maybe it was 10 inches. In all those weeks, I never really paid attention to that. Someone then checked me, and I wasn't even close to 10 inches. No wonder it had failed! I was so discouraged, it was years before I tried exercising again.

What does that have to do with mathematics education? Unfortunately a great deal. In the absence of a real test (for me, actually running on a track) it is easy to think one is progressing if one follows well intentioned but basically artificial guidelines. It is all too easy to slip in some way (as I did by not stepping high enough) and be lulled into false confidence. Then when the real test finally comes, and the illusion of competence is painfully shattered, it is all too easy to feel betrayed or to "blame the messenger."

The "real test" I am speaking of is not just what happens to so many high school graduates when they meet freshman mathematics courses. It is that we in the U. S. are falling farther and farther behind most other countries in the world, not just the well known ones like China, India, and Japan. The bar must be raised, yes, but not in artificial ways, in true, authenic ones.

ball Cargo cult education.

During World War II in the Pacific Ocean American forces hopped from island to island relentlessly pushing westward toward Japan. Many of these islands in the south Pacific were inhabited by people who had never seen Westerners; maybe their ancestors years before had left legends of large wooden ships. We can only imagine their surprise and shock when large naval vessels arrived and troops set up communication bases and runways. Airplanes and those who flew them seemed like gods. It seemed to the natives that the men in the radio buildings, with their microphones, radios and large antennas, had the power to call in the gods. All of the things brought by the navy, radios, buildings, food, weapons, furniture, etc. were collectively referred to as "cargo".

Then suddenly the war ended and the Westerners left. No more ships. No more airplanes. All that was left were some abandoned buildings and rusting furniture. But a curious thing happened. The natives on some islands figured that they, too, could call in the gods. They would simply do what the Americans had done. They entered the abandoned buildings, erected a large bamboo pole to be the "antenna", found some old boxes to be the "radio", used a coconut shell to be the "microphone." They spoke into the "microphone" and implored the airplanes to land. But of course nothing came. (except, eventually, some anthropologists!) The practice came to be known as a "Cargo Cult."

The story may seem sad, amusing, or pathetic, but what does that have to do with mathematics education? Unfortunately a great deal. The south Pacific natives were unable to discern between the superficial outer appearence of what was happening and the deeper reality. They had no understanding that there even exists such a thing as electricity, much less radio waves or aerodynamic theory. They imitated what they saw, and they saw only the superficial.

Sadly, the same thing has happened in far too many high schools in the United States in the last twenty five years or so in mathematics education. Well meaning "educators" who have no conception of the true nature of mathematics see only its outer shell and imitate it. The result is cargo cult mathematics. They call for the gods, but nothing happens. The cure is not louder calling, it is not more bamboo antennas (i.e. glossy ten pound text books and fancy calculators). The only cure is genuine understanding of authenic mathematics.

ball Confusion of Education with Training.

Training is what you do when you learn to operate a lathe or fill out a tax form. It means you learn how to use or operate some kind of machine or system that was produced by people in order to accomplish specific tasks. People often go to training institutes to become certified to operate a machine or perform certain skills. Then they can get jobs that directly involve those specific skills.

Education is very different. Education is not about any particular machine, system, skill, or job. Education is both broader and deeper than training. An education is a deep, complex, and organic representation of reality in the student's mind. It is an image of reality made of concepts, not facts. Concepts that relate to each other, reinforce each other, and illuminate each other. Yet the education is more even than that because it is organic: it will live, evolve, and adapt throughout life.

Education is built up with facts, as a house is with stones. But a collection of facts is no more an education than a heap of stones is a house.

An educated guess is an accurate conclusion that educated people can often "jump to" by synthesizing and extrapolating from their knowledge base. People who are good at the game "Jeopardy" do it all the time when they come up with the right question by piecing together little clues in the answer. But there is no such thing as a "trained guess."

No subject is more essential nor can contribute more to becoming a liberally educated person than mathematics. Become a math major and find out!

So What Good Is It?

Some people may understand all that I've said above but still feel a bit uneasy. After all, there are bills to pay. If mathematics is as I've described it, then perhaps it is no more helpful in establishing a career then, say, philosophy.

Here we mathematicians have the best of both worlds, as there are many careers that open up to people who have studied mathematics. Real Mathematics, the kind I discussed above. See the Careers web page for a sampling.

That brings up one more misconception and one more parable, which I call:

ball Computers, mathematics, and the chagrinned diner.

About sixteen years ago when personal computers were becoming more common in small businesses and private homes, I was having lunch with a few people, and it came up that I was a mathematician. One of the other diners got a funny sort of embarrassed look on her face. I steeled myself for that all too common remark, "Oh I was never any good at math." But no, that wasn't it. It turned out that she was thinking that with computers becoming so accurate, fast, and common, there was no longer any need for mathematicians! She was feeling sorry me, as I would soon be unemployed! Apparently she thought that a mathematician's work was to crank out arithmetic computations.

Nothing could be farther from the truth. Thinking that computers will obviate the need for mathematicians is like thinking 80 years ago when cars replaced horse drawn wagons, there would be no more need for careful drivers. On the contrary, powerful engines made careful drivers more important than ever.

Today, powerful computers and good software make it possible to use and concretely implement abstract mathematical ideas that have existed for many years. For example, the RSA cryptosystem is widely used on secure internet web pages to encode sensitive information, like credit card numbers. It is based on ideas in algebraic number theory, and its invulnerability to hackers is the result of very advanced ideas in that field.

ball Finally, here are a few quotes from an essay well worth reading by David R. Garcia on a similar topic:

..... What is it that would cause us to focus only on this external fruit of material development and play down the antecedent realms of abstraction that lie deeper? It would be good to find a word less condemning than "superficiality", but how else can this tendency be described in a word? Perhaps facing up to the ugly side of this word can stir us into action to remedy what seems to be an extremely grave crisis in Western education.

.... The first step toward [progress in crucial social problems] is to recognize the deceptive illusions bred by seeing only the surface of issues, of seeing only a myriad of small areas to be dealt with by specialists, one for each area. Piecemeal superficiality won't work.

... Teaching is not a matter of pouring knowledge from one mind into another as one pours water from one glass into another. It is more like one candle igniting another. Each candle burns with its own fuel. The true teacher awakens a love for truth and beauty in the heart--not the mind--of a student after which the student moves forward with powerful interest under the gentle guidance of the teacher. (Isn't it interesting how the mention of these two most important goals of learning--truth and beauty--now evokes snickers and ridicule, almost as if by instinct, from those who shrink from all that is not superficial.) These kinds of teachers will inspire love of mathematics, while so many at present diffuse a distaste for it through their own ignorance and clear lack of delight in a very delightful subject.

Key phrases: Mathematics education, improving mathematics education, improving math education, high school math education, misconceptions about mathematics
(fordham.edu )

Bagi Anda Yang Ingin memperdalam Matematika