Mathematics Describing the Real World: Precalculus and Trigonometry

Course No. 1005
Professor Bruce H. Edwards, Ph.D.
University of Florida
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Course No. 1005
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What Will You Learn?

  • numbers Get introduced (or reintroduced) to inverse, rational, exponential, and polynomial functions.
  • numbers Delve into the laws of sine and cosine.
  • numbers Dig into the rudimentary world of probability to determine your odds at winning the lottery.

Course Overview

What's the sure road to success in calculus? The answer is simple: Precalculus. Traditionally studied after Algebra II, this mathematical field covers advanced algebra, trigonometry, exponents, logarithms, and much more. These interrelated topics are essential for solving calculus problems, and by themselves are powerful methods for describing the real world, permeating all areas of science and every branch of mathematics. Little wonder, then, that precalculus is a core course in high schools throughout the country and an important review subject in college.

Unfortunately, many students struggle in precalculus because they fail to see the links between different topics—between one approach to finding an answer and a startlingly different, often miraculously simpler, technique. As a result, they lose out on the enjoyment and fascination of mastering an amazingly useful tool box of problem-solving strategies.

And even if you're not planning to take calculus, understanding the fundamentals of precalculus can give you a versatile set of skills that can be applied to a wide range of fields—from computer science and engineering to business and health care.

Mathematics Describing the Real World: Precalculus and Trigonometry

is your unrivaled introduction to this crucial subject, taught by award-winning Professor Bruce Edwards of the University of Florida. Professor Edwards is coauthor of one of the most widely used textbooks on precalculus and an expert in getting students over the trouble spots of this challenging phase of their mathematics education.

"Calculus is difficult because of the precalculus skills needed for success," Professor Edwards points out, adding, "In my many years of teaching, I have found that success in calculus is assured if students have a strong background in precalculus."

A Math Milestone Made Clear

In 36 intensively illustrated half-hour lectures, supplemented by a workbook with additional explanations and problems, Mathematics Describing the Real World takes you through all the major topics of a typical precalculus course taught in high school or college. Those who will especially benefit from Professor Edwards's lucid and engaging approach include

  • high school and college students currently enrolled in precalculus who feel overwhelmed and want coaching from an inspiring teacher who knows where students stumble;
  • parents of students, who may feel out of their depth with the advanced concepts taught in precalculus;
  • those who have finished Algebra II and are eager to get a head start on the next milestone on the road to calculus;
  • beginning calculus students who want to review and hone their skills in crucial precalculus topics;
  • anyone motivated to learn precalculus on his or her own, whether as a home-schooled pupil or as an adult preparing for a new career.

The Powerful Tools of Precalculus

With precalculus, you start to see all of mathematics as a unified whole—as a group of often radically different techniques for representing data, analyzing problems, and finding solutions. And you discover that these techniques are ultimately connected in a beautiful way. Perceiving these connections helps you choose the best tool for a given problem:

  • Algebraic functions: Including polynomial functions and rational functions, these equations relate the input value of a variable to a single output value, corresponding to countless everyday situations in which one event depends on another.
  • Trigonometry: Originally dealing with the measurement of triangles, this subject has been vastly enriched by the concept of the trigonometric function, which models many types of cyclical processes, such as waves, orbits, and vibrations.
  • Exponential and logarithmic functions: Often involving the natural base, e, these functions are built on terms with exponents and their inverse, logarithms, and describe phenomena such as population growth and the magnitude of an earthquake on the Richter scale.
  • Complex numbers: Seemingly logic-defying, complex numbers are based on the square root of –1, designated by the symbol i. They are essential for solving many technical problems and are the basis for the beautiful patterns in fractal geometry.
  • Vectors: Quantities like velocity have both magnitude and direction. Vectors allow the direction component to be specified in a form that allows addition, multiplication, and other operations that are crucial in fields such as physics.
  • Matrices: A matrix is a rectangular array of numbers with special rules that permit two matrices to be added or multiplied. Practically any situation where data are collected in columns and rows can be treated mathematically as a matrix.

In addition, Professor Edwards devotes two lectures to conic sections, slicing a cone mathematically into circles, parabolas, ellipses, and hyperbolas. You also learn when it's useful to switch from Cartesian to polar coordinates; how infinite sequences and series lead to the concept of the limit in calculus; and two approaches to counting questions: permutations and combinations. You close with an introduction to probability and a final lecture that features an actual calculus problem, which your experience in precalculus makes ... elementary!

Real-World Mathematics

Believing that students learn mathematics most effectively when they see it in the context of the world around them, Professor Edwards uses scores of interesting problems that are fun, engaging, and often relevant to real life. Among the many applications of precalculus that you'll encounter are these:

  • Public health: A student with a new strain of flu arrives at college. How long before every susceptible person is infected? An exponential function called the logistic growth model shows how quickly an epidemic spreads.
  • Surveying: Suppose you have to measure the diagonal width of a marsh without getting wet. It's a simple matter of walking two sides of a triangle on dry land and then using trigonometry to determine the length of the third side that spans the marsh.
  • Astronomy: One of the most famous cases involving the sine and cosine functions that model periodic phenomena occurred in 1967, when astronomer Jocelyn Bell detected a radio signal from space at 1.3373-second intervals. It proved to be the first pulsar ever observed.
  • Acoustics: The special properties of an ellipse explain why a person standing at a given spot in the U.S. Capitol's Statuary Hall can hear a whisper from someone standing 85 feet away.
  • Computer graphics: How do you make an object appear to rotate on a computer screen? Matrix algebra allows you to move each pixel in an image by a specified angle by multiplying two matrices together.
  • Probability: Have you ever forgotten your four-digit ATM PIN number? What is the probability that you can guess it? A simple calculation shows that you would have to punch numbers nonstop for many hours before being assured of success.
An Adventure in Mathematical Learning

A three-time Teacher of the Year in the College of Liberal Arts and Sciences at the University of Florida, Professor Edwards has a time-tested approach to making difficult material accessible. In Mathematics Describing the Real World, he enlivens his lectures with study tips and a feature he calls "You Be the Teacher," in which he puts you in the professor's shoes by asking how you would design a particular test problem or answer one of the frequently asked questions he gets in the classroom. For example, are all exponential functions increasing? After you hear Professor Edwards's explanation, you'll know that when someone uses the term "exponentially," you should ask, "Do you mean exponential growth or decay?"—for it can go in either direction. He also gives valuable tips on using graphing calculators, pointing out their amazing capabilities—and pitfalls.

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36 lectures
 |  Average 31 minutes each
  • 1
    An Introduction to Precalculus—Functions
    Precalculus is important preparation for calculus, but it’s also a useful set of skills in its own right, drawing on algebra, trigonometry, and other topics. As an introduction, review the essential concept of the function, try your hand at simple problems, and hear Professor Edwards’s recommendations for approaching the course. x
  • 2
    Polynomial Functions and Zeros
    The most common type of algebraic function is a polynomial function. As examples, investigate linear and quadratic functions, probing different techniques for finding roots, or “zeros.” A valuable tool in this search is the intermediate value theorem, which identifies real-number roots for polynomial functions. x
  • 3
    Complex Numbers
    Step into the strange and fascinating world of complex numbers, also known as imaginary numbers, where i is defined as the square root of -1. Learn how to calculate and find roots of polynomials using complex numbers, and how certain complex expressions produce beautiful fractal patterns when graphed. x
  • 4
    Rational Functions
    Investigate rational functions, which are quotients of polynomials. First, find the domain of the function. Then, learn how to recognize the vertical and horizontal asymptotes, both by graphing and comparing the values of the numerator and denominator. Finally, look at some applications of rational functions. x
  • 5
    Inverse Functions
    Discover how functions can be combined in various ways, including addition, multiplication, and composition. A special case of composition is the inverse function, which has important applications. One way to recognize inverse functions is on a graph, where the function and its inverse form mirror images across the line y = x. x
  • 6
    Solving Inequalities
    You have already used inequalities to express the set of values in the domain of a function. Now study the notation for inequalities, how to represent inequalities on graphs, and techniques for solving inequalities, including those involving absolute value, which occur frequently in calculus. x
  • 7
    Exponential Functions
    Explore exponential functions—functions that have a base greater than 1 and a variable as the exponent. Survey the properties of exponents, the graphs of exponential functions, and the unique properties of the natural base e. Then sample a typical problem in compound interest. x
  • 8
    Logarithmic Functions
    A logarithmic function is the inverse of the exponential function, with all the characteristics of inverse functions covered in Lecture 5. Examine common logarithms (those with base 10) and natural logarithms (those with base e), and study such applications as the “rule of 70” in banking. x
  • 9
    Properties of Logarithms
    Learn the secret of converting logarithms to any base. Then review the three major properties of logarithms, which allow simplification or expansion of logarithmic expressions—methods widely used in calculus. Close by focusing on applications, including the pH system in chemistry and the Richter scale in geology. x
  • 10
    Exponential and Logarithmic Equations
    Practice solving a range of equations involving logarithms and exponents, seeing how logarithms are used to bring exponents “down to earth” for easier calculation. Then try your hand at a problem that models the heights of males and females, analyzing how the models are put together. x
  • 11
    Exponential and Logarithmic Models
    Finish the algebra portion of the course by delving deeper into exponential and logarithmic equations, using them to model real-life phenomena, including population growth, radioactive decay, SAT math scores, the spread of a virus, and the cooling rate of a cup of coffee. x
  • 12
    Introduction to Trigonometry and Angles
    Trigonometry is a key topic in applied math and calculus with uses in a wide range of applications. Begin your investigation with the two techniques for measuring angles: degrees and radians. Typically used in calculus, the radian system makes calculations with angles easier. x
  • 13
    Trigonometric Functions—Right Triangle Definition
    The Pythagorean theorem, which deals with the relationship of the sides of a right triangle, is the starting point for the six trigonometric functions. Discover the close connection of sine, cosine, tangent, cosecant, secant, and cotangent, and focus on some simple formulas that are well worth memorizing. x
  • 14
    Trigonometric Functions—Arbitrary Angle Definition
    Trigonometric functions need not be confined to acute angles in right triangles; they apply to virtually any angle. Using the coordinate plane, learn to calculate trigonometric values for arbitrary angles. Also see how a table of common angles and their trigonometric values has wide application. x
  • 15
    Graphs of Sine and Cosine Functions
    The graphs of sine and cosine functions form a distinctive wave-like pattern. Experiment with functions that have additional terms, and see how these change the period, amplitude, and phase of the waves. Such behavior occurs throughout nature and led to the discovery of rapidly rotating stars called pulsars in 1967. x
  • 16
    Graphs of Other Trigonometric Functions
    Continue your study of the graphs of trigonometric functions by looking at the curves made by tangent, cosecant, secant, and cotangent expressions. Then bring several precalculus skills together by using a decaying exponential term in a sine function to model damped harmonic motion. x
  • 17
    Inverse Trigonometric Functions
    For a given trigonometric function, only a small part of its graph qualifies as an inverse function as defined in Lecture 5. However, these inverse trigonometric functions are very important in calculus. Test your skill at identifying and working with them, and try a problem involving a rocket launch. x
  • 18
    Trigonometric Identities
    An equation that is true for every possible value of a variable is called an identity. Review several trigonometric identities, seeing how they can be proved by choosing one side of the equation and then simplifying it until a true statement remains. Such identities are crucial for solving complicated trigonometric equations. x
  • 19
    Trigonometric Equations
    In calculus, the difficult part is often not the steps of a problem that use calculus but the equation that’s left when you’re finished, which takes precalculus to solve. Hone your skills for this challenge by identifying all the values of the variable that satisfy a given trigonometric equation. x
  • 20
    Sum and Difference Formulas
    Study the important formulas for the sum and difference of sines, cosines, and tangents. Then use these tools to get a preview of calculus by finding the slope of a tangent line on the cosine graph. In the process, you discover the derivative of the cosine function. x
  • 21
    Law of Sines
    Return to the subject of triangles to investigate the law of sines, which allows the sides and angles of any triangle to be determined, given the value of two angles and one side, or two sides and one opposite angle. Also learn a sine-based formula for the area of a triangle. x
  • 22
    Law of Cosines
    Given three sides of a triangle, can you find the three angles? Use a generalized form of the Pythagorean theorem called the law of cosines to succeed. This formula also allows the determination of all sides and angles of a triangle when you know any two sides and their included angle. x
  • 23
    Introduction to Vectors
    Vectors symbolize quantities that have both magnitude and direction, such as force, velocity, and acceleration. They are depicted by a directed line segment on a graph. Experiment with finding equivalent vectors, adding vectors, and multiplying vectors by scalars. x
  • 24
    Trigonometric Form of a Complex Number
    Apply your trigonometric skills to the abstract realm of complex numbers, seeing how to represent complex numbers in a trigonometric form that allows easy multiplication and division. Also investigate De Moivre’s theorem, a shortcut for raising complex numbers to any power. x
  • 25
    Systems of Linear Equations and Matrices
    Embark on the first of four lectures on systems of linear equations and matrices. Begin by using the method of substitution to solve a simple system of two equations and two unknowns. Then practice the technique of Gaussian elimination, and get a taste of matrix representation of a linear system. x
  • 26
    Operations with Matrices
    Deepen your understanding of matrices by learning how to do simple operations: addition, scalar multiplication, and matrix multiplication. After looking at several examples, apply matrix arithmetic to a commonly encountered problem by finding the parabola that passes through three given points. x
  • 27
    Inverses and Determinants of Matrices
    Get ready for applications involving matrices by exploring two additional concepts: the inverse of a matrix and the determinant. The algorithm for calculating the inverse of a matrix relies on Gaussian elimination, while the determinant is a scalar value associated with every square matrix. x
  • 28
    Applications of Linear Systems and Matrices
    Use linear systems and matrices to analyze such questions as these: How can the stopping distance of a car be estimated based on three data points? How does computer graphics perform transformations and rotations? How can traffic flow along a network of roads be modeled? x
  • 29
    Circles and Parabolas
    In the first of two lectures on conic sections, examine the properties of circles and parabolas. Learn the formal definition and standard equation for each, and solve a real-life problem involving the reflector found in a typical car headlight. x
  • 30
    Ellipses and Hyperbolas
    Continue your survey of conic sections by looking at ellipses and hyperbolas, studying their standard equations and probing a few of their many applications. For example, calculate the dimensions of the U.S. Capitol’s “whispering gallery,” an ellipse-shaped room with fascinating acoustical properties. x
  • 31
    Parametric Equations
    How do you model a situation involving three variables, such as a motion problem that introduces time as a third variable in addition to position and velocity? Discover that parametric equations are an efficient technique for solving such problems. In one application, you calculate whether a baseball hit at a certain angle and speed will be a home run. x
  • 32
    Polar Coordinates
    Take a different mathematical approach to graphing: polar coordinates. With this system, a point’s location is specified by its distance from the origin and the angle it makes with the positive x axis. Polar coordinates are surprisingly useful for many applications, including writing the formula for a valentine heart! x
  • 33
    Sequences and Series
    Get a taste of calculus by probing infinite sequences and series—topics that lead to the concept of limits, the summation notation using the Greek letter sigma, and the solution to such problems as Zeno’s famous paradox. Also investigate Fibonacci numbers and an infinite series that produces the number e. x
  • 34
    Counting Principles
    Counting problems occur frequently in real life, from the possible batting lineups on a baseball team to the different ways of organizing a committee. Use concepts you’ve learned in the course to distinguish between permutations and combinations and provide precise counts for each. x
  • 35
    Elementary Probability
    What are your chances of winning the lottery? Of rolling a seven with two dice? Of guessing your ATM PIN number when you’ve forgotten it? Delve into the rudiments of probability, learning basic vocabulary and formulas so that you know the odds. x
  • 36
    GPS Devices and Looking Forward to Calculus
    In a final application, locate a position on the surface of the earth with a two-dimensional version of GPS technology. Then close by finding the tangent line to a parabola, thereby solving a problem in differential calculus and witnessing how precalculus paves the way for the next big mathematical adventure. x

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  • Download 36 video lectures to your computer or mobile app
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  • 36 lectures on 6 DVDs
  • 256-page printed course workbook
  • Downloadable PDF of the course guidebook
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Course Guidebook Details:
  • 256-page printed course workbook
  • Lecture outlines
  • Practice problems & solutions
  • Summary of formulas

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Your professor

Bruce H. Edwards

About Your Professor

Bruce H. Edwards, Ph.D.
University of Florida
Dr. Bruce H. Edwards is Professor of Mathematics at the University of Florida. Professor Edwards received his B.S. in Mathematics from Stanford University and his Ph.D. in Mathematics from Dartmouth College. After his years at Stanford, he taught mathematics at a university near Bogot·, Colombia, as a Peace Corps volunteer. Professor Edwards has won many teaching awards at the University of Florida, including Teacher of...
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Mathematics Describing the Real World: Precalculus and Trigonometry is rated 4.6 out of 5 by 55.
Rated 4 out of 5 by from I hesitated many times before sending for this course as the subject material is very familiar to me, but I found it very interesting to view professor Edwards presentation methods.
Date published: 2019-08-07
Rated 5 out of 5 by from I bought this DVD along with two other math and two (2) science courses as a gift for my former High School Math & Science departments. I know from the subject areas covered in each that they will become a welcome part of the teaching strategies for those departments.
Date published: 2019-05-30
Rated 5 out of 5 by from Excellent course I bought this course for my grandson who will be taking precalculus in high school next year. It is an excellent refresher for me and will be a good head start for him.
Date published: 2019-04-06
Rated 5 out of 5 by from A review from my college days It has been 40+ years since I have studied these subjects and it is fun to revisit all that I have forgotten. I wish this had been around during my college days to get an overview of the subjects prior to sitting through the faced paced lectures in a lecture hall. The instructor is great. I wish I would have been lucky enough to have someone like him back then.
Date published: 2019-01-21
Rated 5 out of 5 by from Solid course, great professor This is a solid overview of the main topics covered in a course sometimes called College Algebra & Trigonometry, sometimes called Pre-Calculus. The professor is everything you would want in a math teacher. Very lucid, and his pacing is just right. I didn't find him dry but of course individual reactions vary. I do agree w. reviewers who said the real-world applications weren't too exciting. Pretty mundane stuff -- dimensions of a softball field, how high is the flagpole. Guess there's time for only so much in 36 lectures. If you're considering buying the course, here are some suggestions that may prove helpful: 1) It is not a course for beginners. You should have a good grasp of intermediate algebra. It's necessary to have skills in, for example, equation solving, operations with roots and exponents, navigating the Cartesian Plane. The professor is not going to teach these things, they are prerequisites. 2) Get the video. The visuals are good and you will want to follow along carefully as he walks through them. 3) Buy a Texas Instruments graphing calculator (and learn how to use it). The professor, rightly in my opinion, emphasizes graphical explanations. He uses the TI graphing calculator but he does not show you how to use it. If you can use the graphing calculator you will be able to actually learn a lot of amazing things just by playing around with it. If you don't want to spring for the graphing calculator, and they are relatively expensive, then you still must have a scientific calculator. All scientific calculators (except those labeled "for K-12") have the algebra and trig functions that the course uses. They are under $20 at any big box store. Don't try to navigate the course w/o any calculator at all, that's like learning how to drive a car without touching the steering wheel or the pedals. 4) Use the workbook. Yes it has some typos -- they all do -- it's like, the First Law of Workbooks. But it is nicely laid out with big margins and lots of space between lines of type, where you can insert notes or questions. I found it very useful to work through the examples after watching the lectures. How many of the practice problems to do is an individual choice. Finally, and I trust this won't seem frivolous, I appreciate that the professor took the trouble to dress nicely. I don't mean he looks like a fashion model, but just that he wears neat and pressed, well-coordinated outfits. And he varies them throughout the course. You other Teaching Company professors -- and you know who you are! -- that show up for every lecture in the SAME dusty, wrinkled black suit or hideously clashing shirt/tie/sport coat ensemble -- please take note!
Date published: 2018-10-19
Rated 5 out of 5 by from Whatever Dr. Edwards produces is tops! Great teacher!
Date published: 2018-09-07
Rated 1 out of 5 by from Not very good at presenting I originally bought all the series that James Sellers teaches. Sellers is a phenomenal teacher, however, this teacher on this precalculus series is not very clear and specific. This may be a good course for reviewing, but in my opinion, it's not the best for brand new students. One reason why I say this is because he's not very specific on how to use the calculator. He says there's a log, but than he just says "plug it in and here's your answer." I wish that he showed us step by step how to actually use the calculator for each equation, instead of just saying plug it in!
Date published: 2018-09-05
Rated 5 out of 5 by from A Good Background for Calculus This course looked in depth into what is needed for a background in Calculus. Exponents, Logs, Trig, Combinatorics, and Matrices were some of the highlights. Whereas I thought that most of the subjects were explained thoroughly, I did have to go back through some of the Algebra II course to get more information on Sequences and Series.
Date published: 2018-08-17
Rated 5 out of 5 by from Wonderful Course Prof. Edward teaches this course very well. We enjoyed it.
Date published: 2018-05-13
Rated 5 out of 5 by from Will this course "bridge" me to calculus? I am a 7th grade math teacher. This course is serving two purposes, one, to ultimately learn calculus well enough to teach it, two, unexpectedly, I am learning highly polished pedagogy strategies, careful pacing and practices like "Okay, now you be the teacher."
Date published: 2018-03-13
Rated 5 out of 5 by from What a great Professor! I wish we had a teacher like Professor Edwards way back when I first did Maths in college. He is fantastic at clearly explaining complicated scenarios, and getting his major points across. I took this course as a prelude to getting into calculus - I last did maths 50 years ago - and it proved to be superb. As Professor Edwards says on many occasions, calculus can only be done with a thorough knowledge of the pre-calculus principles, and he hammers home these principles. The workbook also has an excellent set of problems to solve to help retain his teachings. I am now looking forward to getting into calculus itself.
Date published: 2018-01-08
Rated 5 out of 5 by from Review Dr. Edwards has done a great job in presenting this course and provides ample examples of pre-calculus problems which are easy to understand and applied. Highly recommend this course especially to students who have completed Alg. II and are currently taking, have taken, or are planning on taking pre-calculus.
Date published: 2017-09-29
Rated 3 out of 5 by from DVD format is out of date I bought this product with the DVD and am disappointed because I cannot play on my computer. My computer is new and did not come with a DVD player, so I bought an external DVD player. However, the DVD format for the course is old and will not operate on the external player. I am going to try an older DVD player attached to my TV.
Date published: 2017-08-19
Rated 4 out of 5 by from Glad I purchased this course I am teaching PreCalculus after many years of teaching Middle School. This series helps me to refocus my skill set for an older and more advanced student, and also gets me up to speed on concepts where I need remediation.
Date published: 2017-08-04
Rated 2 out of 5 by from wooden instructor Part of the title is 'describing the real world'. But it seems there's really nothing about the 'real world' at all. The instructor is uninspiring and delivers his lectures like any garden variety high school teacher.
Date published: 2017-07-25
Rated 5 out of 5 by from Good presentation 50 years away from math courses, this course is a great refresher.
Date published: 2017-05-27
Rated 5 out of 5 by from Have not finished the course. So far it is great.
Date published: 2017-05-01
Rated 5 out of 5 by from Excellent presentation Easy to follow and very through
Date published: 2017-04-17
Rated 4 out of 5 by from great review I needed a refresher and this course worked great for me so far.
Date published: 2017-03-27
Rated 5 out of 5 by from This is an excellent presentation of precalculus. The examples of the applications really help tto nail down the concepts. Which I had this in my undergraduate days.
Date published: 2017-03-13
Rated 5 out of 5 by from Precalculus Great course for review of precalculus fundamentals. Instructor is easy o follow.
Date published: 2017-01-18
Rated 5 out of 5 by from Excellent lecturer I am currently about 1/3 through this. I have been impressed by how well Dr Edwards presents the material. I'm watching this as a review - I had math through college calculus and want to brush up. I have bought many of the Great Courses, but this I think is the best of all I've watched. I'm glad that there are Calculus level classes by Dr Edwards too, so I can continue my review with him as a teacher. He has obviously had many years of teaching the subject to refine his presentation. One thing I like in particular is how he discusses 'gotchas' in problems - places where its common to make an error and how to do the calculation correctly instead. I find his lecturing style to be very engaging, and the videos are just plain fun to watch (for me anyway!)
Date published: 2016-11-23
Rated 5 out of 5 by from Great for Refreshing Precalculus I took Precalculus 20 years ago. This course brought it all back in a matter of a few weeks. I recommend that the student uses a Precalculus textbook to work problems in order to ensure comprehension.
Date published: 2016-06-24
Rated 5 out of 5 by from Helpful for online Trig/Pre-calculus course At this time I've returned to college (community college) and am taking an online Trig course without lecture. This course was very helpful since the online course has no lecture and learning only from a book is very difficult. I really liked this professor. It was very helpful to read each class synopsis to know which ones I should skip for the Trig course. Next semester I'll be taking a Pre-calculus course and will rewatch this course. I do recommend for anyone taking an online course or personal pace course to use this material to augment the class to get an A in the class which is what I'm at with the help of this course.
Date published: 2016-05-14
Rated 5 out of 5 by from I like very much the trigonometry part This is an excellent pre-calculus course. I have always had hard times to understand trigonometry. Fortunately, Professor Edward's teaching is crystal clear. Finally, I could enjoy trigonometry, as well as of the other parts of the course. I would recommend to ask Professor Edwards to teach a course on Lineal Algebra to complement his courses on pre-calculus and calculus.
Date published: 2016-02-21
Rated 3 out of 5 by from Needs more prof reading The video section of this course is wonderful, the professor does an amazing job of explaning the subjects accurately, while still adding a bit of humor, making it feel less like school work and more like watching television! Unfortunately, the included textbook has way too many basic problems, and does not do a good job of explaining the subjects. (I personally feel that a textbook should really be able to be used on its own, without supplement). In almost every lesson there is a mistake in the textbook, such as a chart of common trig identities having the wrong information, or the answers in the back of the book are completely messed up. All these problems are the type that are easy to work around, yet still very irritating. I am sure that someone who is using this as a refresher course would have no problem, but as someone who is learning trig for the first time, it really bugs me.
Date published: 2015-05-05
Rated 5 out of 5 by from Pre-calculus The fact of the matter is that we are all going to need math skills in the world that is unfolding before our eyes. In fact, I'll go two steps further...math, music, and language skills. Better to start now than later. This course is a superb math refresher. The beauty of the dvd format is that you can replay it. You need a firm understanding of algebra and trig functions if you want to understand calculus. This dvd provides you with the tools.
Date published: 2015-03-26
Rated 5 out of 5 by from Very good instructor who presents and explains very well. The workbook is also excellent with good problems and answers that are worked out rather than just showing the final answer. Looking forward to completing this course and continuing with the Calculus 1 and Calculus 2 courses with Professor Edwards.
Date published: 2015-03-16
Rated 5 out of 5 by from great course I am math teacher at High School level. I was refreshing all my ideas and approaches with this extraordinary course. The professor is simply amazing, his knowledge of mathematics allows him to penetrate all difficult topics and make them reachable. Great course.
Date published: 2014-12-08
Rated 5 out of 5 by from An excelent bridge from Algebra to Higher Math. This is an ecellently presented course bridging the priciples of mathematics from algebra to higher levels of math. The use of real word examples is well done with applications to every day use.
Date published: 2014-10-22
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