{"id":1406,"date":"2016-09-19T08:00:44","date_gmt":"2016-09-19T12:00:44","guid":{"rendered":"http:\/\/blogs.ams.org\/matheducation\/?p=1406"},"modified":"2016-09-15T13:36:21","modified_gmt":"2016-09-15T17:36:21","slug":"more-linear-algebra-please","status":"publish","type":"post","link":"https:\/\/blogs.ams.org\/matheducation\/2016\/09\/19\/more-linear-algebra-please\/","title":{"rendered":"More Linear Algebra, Please"},"content":{"rendered":"

By<\/span><\/i> Drew Armstrong<\/span><\/i><\/a>, Associate Professor of Mathematics, University of Miami<\/span><\/i><\/p>\n

Anyone who teaches mathematics in the US knows that the quality of education could be better, but we also know that the problems are complicated and defy easy solutions. I grew up in Ontario, Canada, where I attended high school and completed an undergraduate degree in mathematics. Afterwards I completed a Ph.D. in the United States and I have now been teaching undergraduate mathematics here for over ten years. These experiences suggest to me a change that would improve college mathematics education in the US. It won\u2019t solve every problem, but it is something concrete that we can do right now.<\/span><\/p>\n

Suggestion: Replace the typical one-semester \u201cintroduction to linear algebra\u201d course with a two-semester linear algebra sequence. This would be taken in the first year of college, in parallel with calculus. It would <\/span>not<\/span> have calculus as a pre-requisite.<\/span><\/p><\/blockquote>\n

In effect, this would place linear algebra and calculus side-by-side as the twin pillars of undergraduate mathematics. I believe this would have several immediate benefits for the curriculum. In this blog post I\u2019ll describe three of these benefits and then I\u2019ll explain how my experience as a student in Canada and as a professor in the US has brought me to this position.<\/span><\/p>\n

Three Fundamental Problems<\/b><\/p>\n

Linear algebra is being undersold.\u00a0<\/i>Linear algebra is the common denominator of mathematics. From the most pure to the most applied, if you use mathematics then you will<\/i> use linear algebra. This is also a fairly recent phenomenon, historically speaking. In the 19th century, linear algebra was at the cutting edge of mathematical research. Today it is a universal tool that every user of mathematics needs to know. This becomes more true every year as algorithms and data play a bigger role in our lives. It seems to me that the current curriculum was fossilized in an earlier time when linear algebra wasn\u2019t so useful. But times change; sometimes we need to re-examine the mathematics curriculum to see if it is still relevant. I believe that a two-semester linear algebra sequence in the first year will be a more honest representation of how mathematics is used today.<\/p>\n

Complex Numbers.\u00a0<\/span><\/i>Complex numbers are currently an orphan in the undergraduate curriculum. According to the <\/span>Common Core Standards<\/span><\/a>, students are supposed to learn about complex numbers in high school; however, from my experience with US college students I know that they are not learning this material. At the University of Miami (where I teach), the basic ideas of complex numbers including de Moivre\u2019s Theorem appear in our pre-pre-calculus remedial course, so it is not reasonable that a student who takes this class will have time to complete the math major\u00a0<\/span>in four years<\/span>. Therefore, in practice, we are pretending that our undergraduates have seen complex numbers when this is not the case. It seems that many of our students are introduced to complex numbers for the first time in an upper-level complex analysis course. In my opinion this is way too late. If US students are not to learn about complex numbers in high school, then it seems to me that the first semester of a two-semester linear algebra sequence is an excellent place to introduce this material. Here they can see the 2-dimensional geometric interpretation of complex numbers via 2X2 rotation and dilation matrices. This would have the added benefit of teaching complex numbers to future high school teachers (who are usually not required to take a complex analysis course).<\/span><\/p>\n

Linear Algebra remediation eats up other courses.\u00a0<\/span><\/i>At the University of Miami we require all math majors to take MTH 210 (Introduction to Linear Algebra). As is typical in many departments, this is a one-semester course that is usually taken in the second year, as it has Calculus II as a pre-requisite. Most of the students have never seen vectors or matrices before, so our goal is to get them from the basic ideas to the useful applications in one semester. This course is then required as a pre-requisite for many upper-division courses. However, most instructors find that the students\u2019 subsequent linear algebra background is very shaky because one semester is not enough to absorb all of the material. In practice this means that many upper-division courses must include a crash course in the relevant ideas from linear algebra, which is hugely inefficient. A two-semester first year sequence would ensure that teachers of upper-division math courses could assume that the students are familiar with the basic ideas of linear algebra. This would save time and allow each of these classes to cover more material.<\/span><\/p>\n

This Has Been Done Before<\/b><\/p>\n

I attended high school and college in Ontario, Canada between 1993 and 2002. In those days we had 5 years of high school; the fifth year (called OAC for \u201cOntario Academic Credit\u201d) was optional for the general population, but it was required for entrance to many university programs. The OAC mathematics curriculum consisted of three courses: Algebra and Geometry, Calculus, and Finite Mathematics. \u00a0A student entering a Bachelor of Science program at an Ontario university was expected to take all three of these. The Calculus course was similar to the AP Calculus course that exists in American high schools today. The Finite Mathematics course was an introduction to probability and statistics with a discussion of induction and elementary combinatorics. The OAC Algebra and Geometry course was a novelty that has no parallel in American schools. (Since the OAC program was phased out in 2003 it no longer exists in Canada either.) To give you an idea of the course, here is the table of contents<\/a> from the final version of the course textbook<\/a>\u00a0(now out of print).<\/span><\/p>\n

The curriculum was mostly analytic geometry in 2 and 3 dimensions providing a thorough introduction to representing lines and planes in 3D. It also introduced Gaussian elimination, orthogonality, the language of vectors with applications to physics, matrices as linear transformations, and complex numbers. \u00a0I remember this course very vividly as one of the experiences that led me to become a mathematician. Ontario universities required these OAC courses for entrance to certain programs. The undergraduate curriculum was then able to make good use of these courses. For example, when I entered Queen\u2019s University as a mathematics and physics major I was required to take two full-year mathematics sequences in my first year. One sequence was Calculus and it required OAC Calculus as a pre-requisite. The other sequence was Linear Algebra and it required OAC Algebra and Geometry as a pre-requisite. Let me emphasize this situation:<\/span><\/p>\n

I was required to take a semester of linear algebra in high school, which was then followed by a required two-semester linear algebra sequence in the first year of college.<\/span><\/p><\/blockquote>\n

The textbook that we used for Linear Algebra was the 3rd edition of \u201cElementary Linear Algebra\u201d by Larson and Edwards. This text is indistinguishable from the standard textbooks used today for the \u201cintroduction to linear algebra\u201d course in the United States. Thus, by this point I had seen the same material, but I had seen it over three semesters instead of one.<\/span><\/p>\n

After the first year sequence was an additional one-semester course in linear algebra that was required for mathematics majors with a concentration in statistics or physics. (It was also required for many engineering programs.) This course gave a more abstract introduction to inner-product spaces, with applications to function spaces. The students in the course were diverse, coming from many different departments. This indicates to me that the material of this course was still seen as universal in the sense that it was relevant to all users of linear algebra, whether pure or applied. It was not a special topics course.<\/p>\n

In summary, by the time I had completed a Bachelor of Science degree in mathematics with a physics minor, I had been required to take <\/span>four semesters of general-purpose linear algebra<\/span><\/i>. And you want to know something funny? As I proceeded to graduate school in pure mathematics at Cornell, I shortly came to feel that the most serious deficiency of my undergraduate education was that <\/span>I had not seen enough linear algebra!<\/span><\/i> Not only did I find my multilinear algebra background weak when I learned representation theory, I was also shocked when I learned about the Perron-Frobenius theorem and its amazing applications (e.g., to ranking webpages): Why had no one told me about this theorem?<\/span><\/p>\n

My Teaching Experience<\/b><\/p>\n

I joined the mathematics faculty at the University of Miami in 2009, and since then I have taught our Introduction to Linear Algebra course (MTH 210) four times. After this, many upper-division courses (such as Multivariable Calculus) list MTH 210 as a pre-requisite. We have two upper-division linear algebra courses in the curriculum (one more abstract and one more numerical), but these are regarded more as capstone courses and they do not serve as pre-requisites for anything else. Thus MTH 210 is a very important course. <\/span><\/p>\n

Let me describe my experience teaching the course and how my approach to the syllabus has evolved. The official department syllabus reads as follows:<\/span><\/p>\n

Vectors, matrix algebra, systems of linear equations, and related geometry in Euclidean spaces. Fundamentals of vector spaces, linear transformations, determinants, eigenvalues, and eigenspaces.<\/span><\/p><\/blockquote>\n

The majority of students in the course have never seen the language of vectors and matrices before, nor have they taken a physics course which could be used for motivation. In my opinion, it is completely impossible to cover the material from a standard textbook under these conditions, so my experience with the course has been a painful process of deciding what to <\/span>leave out. After trial and error I have decided that the abstract notions of \u201cvector space\u201d and \u201clinear transformation\u201d had to go, so that I can get to some substantial applications by the end of the semester. The language of matrix arithmetic is already plenty abstract for students seeing it for the first time.<\/span><\/p>\n

Since the students are starting from scratch, I begin the course with a thorough introduction to Cartesian coordinates and analytic geometry in 2 and 3 dimensions. Without the visual intuition that this provides I don\u2019t think they\u2019ll get very far. By the halfway point of the semester I want to cover the standard material on Gaussian elimination and to be able to explain the geometric intuition behind it.\u00a0<\/span><\/p>\n

After covering these minimum pre-requisites in the first half of the semester, in the second half we dive into the actual \u201clinear algebra\u201d. Here is where the painful cuts come. Since this is the only linear algebra course that most of these students will ever see, I need to cover the significant applications. But I also need to cover enough theory that these applications can be understood. With practice I\u2019ve come up with a way to do this that I\u2019m reasonably happy with. If you want to see the details, my lecture notes from two previous iterations of the course are available here<\/a> and here<\/a>. \u00a0But on the other hand, I\u2019m not happy at all. I know how useful linear algebra is, and I know that most of these students would benefit from a deep understanding of it. I also know that this one-semester class goes by too quickly for the ideas to really sink in. I can only hope that I\u2019ve given them a roadmap so they can fill in the details later when needed.<\/span><\/p>\n

Conclusion<\/b><\/p>\n

It seems clear to me that a two-semester linear algebra sequence would vastly improve the undergraduate mathematics curriculum in the United States. This would give extra time to absorb the important ideas and give space to discuss neglected topics such as complex numbers and analytic geometry. It would also allow upper-division courses to use linear algebra in a deeper way.<\/span><\/p>\n

This is natural from a mathematical point of view, but I also recognize that from an administrative point of view it\u2019s pretty radical. I\u2019ve sat on committees and I know how time consuming it can be just to change the title of an existing course. Adding a new course at the center of the curriculum could easily be a decade-long process, and it would be far from painless. \u00a0Being realistic, I suspect that a change like this will only follow from a discussion at the national level. The MAA\u2019s Committee on Undergraduate Programs in Mathematics has already made some <\/span>recommendations for the role of linear algeb<\/span>r<\/span>a in the curriculum<\/span><\/a>\u00a0in their 2015 Curriculum Guide.<\/span><\/p>\n

I generally agree with the CUPM\u2019s remarks, but I think they are too shy in their recommendations. For example, the committee\u2019s Content Recommendation 1 from the Overview says that \u201cMathematical sciences major programs should include concepts and methods from calculus and linear algebra.\u201d This language seems to put calculus and linear algebra on equal footing (I assume they are listed in alphabetical order), but it doesn\u2019t grapple with the reality that linear algebra is currently under-represented with respect to calculus. I would rephrase their recommendation in stronger terms:<\/span><\/p>\n

Mathematical sciences major programs should include concepts and methods from calculus and linear algebra. <\/span>These two subjects should be introduced in parallel, and both should be studied in the first year.<\/b><\/p><\/blockquote>\n

Phrasing it this way emphasizes that a change is needed. Undergraduate programs in the US do not introduce linear algebra early enough and they do not place it beside calculus at the center of the curriculum. Other countries (such as Canada) have done a better job with this, and I hope that we in the US can learn from their example.<\/span><\/p>\n

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By Drew Armstrong, Associate Professor of Mathematics, University of Miami Anyone who teaches mathematics in the US knows that the quality of education could be better, but we also know that the problems are complicated and defy easy solutions. I … Continue reading →<\/span><\/a><\/p>\n

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