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$254.95 $38 – Joy of Thinking: The Beauty and Power of Classical Mathematical Ideas – Michael Starbird
Discover mathematics as an artistic and creative realm that contains some of the greatest ideas of human history. This course explores infinity, the fourth dimension, probability, chaos, fractals, and other fantastic themes.
Is it worth Bill Gates’s time to pick up a $100 bill if he sees it on the sidewalk? Amidst the frenzied screaming from the audience on television’s Let’s Make a Deal, is there sound advice to give the contestant trying to decide whether to swi
The world of mathematics contains some of the greatest ideas of humankind—ideas comparable to the works of Shakespeare, Plato, and Michelangelo. These mathematical ideas can add texture, beauty, and wonder to your life. Most importantly, you don’t have to be a mathematician to have access to this world.
A Mathematical Journey
The Joy of Thinking is a course about fun, aesthetics, and mystery—about great mathematical ideas that arise from puzzles, observations of everyday life, and habits of curiosity and effective thinking. It is as much about learning to think abstractly as it is about what we traditionally think of as mathematics.
You explore the fourth dimension, coincidences, fractals, the allure of number, and geometry, and bring these weighty notions back down to earth to see how they apply to your own life.
Rather than focusing on adding figures or creating equations (in fact, there are fewer numbers than you might expect), this course enables you to uncover and grasp insightful strategies for approaching, enjoying, and understanding the world around you.
“Wonderful … the Best”
Taught by Professors Edward B. Burger of Williams College and Michael Starbird of the University of Texas at Austin, this course is based on their innovative textbook, The Heart of Mathematics: An invitation to effective thinking, which a reviewer for The American Mathematical Monthly called “wonderful … possibly the best ‘mathematics for the non-mathematician’ book that I have seen.”
Paradoxical Phenomena
Consider these examples:
The Fourth Dimension
Mathematical thinking leads not only to insights about our everyday lives and everyday world but also points us to worlds far beyond our own. Take the fourth dimension. The very phrase conjures up notions of science fiction or the supernatural.
Because the fourth dimension lies beyond our daily experience, visualizing, exploring, and understanding it requires us to develop an intuition about a world that we cannot see. Nevertheless, that understanding is within our reach.
You learn how to construct a four-dimensional cube and why a four-dimensional surgeon could remove your appendix without making an incision in your skin.
Fractals
Or take a world that we can see: the two-dimensional realm. It can be just as rich with surprises. You learn how the simple exercise of repeatedly folding a sheet of paper introduces the concept of fractals—a geometric pattern that is infinitely complex—repeated at ever smaller scales to produce irregular shapes and surfaces that cannot be represented by classical geometry.
You discover that the paper-folding sequence offers an example of the classical computational theory of “automata,” developed by Alan Turing—the father of modern computing. Fractal construction processes may also relate to the behavior of the stock market and even to your heart rate.
Life Lessons
As Professors Burger and Starbird lead you through these and other examples, you pick up some valuable life lessons:
Just do it. If you’re faced with a problem and you don’t know how to solve it, begin by taking some action.
The Un-Math Math
This is probably not like the mathematics you had at school. Some people might not even want to call it math, but you experience a way of thinking that opens doors, opens minds, and leaves you smiling while pondering some of the greatest concepts ever conceived.
One of the great features about mathematics is that it has an endless frontier. The farther you travel, the more you see over the emerging horizon. The more you discover, the more you understand what you’ve already seen, and the more you see ahead. Deep ideas truly are within the reach of us all. How many more ideas are there for you to explore and enjoy? Well, how long is your life?
tch his choice to Door Number 2? How can we see the fourth dimension in a Salvador Dali painting?
These certainly aren’t the kinds of questions you would normally ask in typical lectures about mathematics. But then again, this isn’t an ordinary math course.
24 lectures
| Average 30 minutes each
1 Great Ideas that Bring Our World into Focus
2 How Many? Counting Surprises
3 Fermat’s Last Theorem and the Allure of Number
4 Pining for Nature’s Numbers
5 Sizing up the Fibonacci Numbers
6 The Sexiest Rectangle
7 The Hidden Beauty of the Golden Rectangle
8 The Pythagorean Theorem and Geometry of Ellipses
9 Not-so-Platonic Relationships in the Platonic Solids
10 Hunting for a Sixth Platonic Solid
11 Is There a Fourth Dimension? Can We See It?
12 The Invisible Art of the Fourth Dimension
13 A Twisted Idea—The Möbius Band
14 A One-Sided, Sealed Surface—The Klein Bottle
15 Ordinary Origami—Creating Beautiful Patterns16Unfolding Paper to Reveal a Fiery Fractal
17 Fractals—Infinitely Complex Creations
18 Fractal Frauds of Nature
19 Chance Surprises—Measuring Uncertainty
20 Door Number Two or Door Number Three?
21 Great Expectations—Weighing the Uncertain Future
22 Random Thoughts—Randomness in Our World
23 How Surprising are Surprising Coincidences?
This final lecture looks at 10 “lessons for life” that can be drawn from a range of mathematical themes and concepts.
$254.95 $38 – Joy of Thinking: The Beauty and Power of Classical Mathematical Ideas – Michael Starbird