Video about Fractals

It’s rare to come across math documentaries, so I thought I’d post a link to NOVAs new one on fractals:

NOVA: Hunting the Hidden Dimension

You can watch it entirely online. I watched it on PBS while lesson planning. It was pretty good. I’m not sure how much I buy the importance of fractals, or the arguments about fractals in nature, but other than that, I’m a fan.

Flummoxed! Or emotionally traveling back to my student teaching days.

Today was a really hard day, because it brought back a lot of the emotions that I had when doing my student teaching. Those days were long and exhausting, and I remember that every little thing affected me.

In those days, I took every student comment to heart. A student got upset after getting back a quiz and breaks down? A student got angry at me for reprimanding them? A student came to me crying about how her A- on a test will preclude them from ever going to college? A student talking to me with nothing but apathy even though they’re failing and won’t be able to graduate? I heard their voices bounce around my brain and my stomach would be all fluttery and I would just be emotionally in turmoil. It may have been a throwaway comment by a student — usually it was — but I carried it with me all day. Sometimes for days.

I needed to develop a tough skin. And, as the student teaching progressed, I did. (Although I needed to breakdown a few times to do it.)

Last year (my first year of full time teaching) I really grew that thick skin. I learned to put up with a lot of flak without students phasing me emotionally. Students really really like to test the boundaries of new teachers at my school and I felt like I dealt with that admirably. I still had days where they got to me, though.

This year I’ve been even more adept at dealing with students. One quarter has passed and I haven’t had that emotional breakdown yet. I think it’s largely because I’ve been even clearer and consistent with my expectations, and I don’t always engage in dialogue with students.

If a student doesn’t do their homework, I let them tell me their reasons/excuses, and then I say “Thank you for telling me that. I’m sorry but I’m still going to have to give you a 0.” Last year, I would engage with a dialogue about why I can’t and won’t give them credit. Last year, if a student asked if I offer extra credit, I would say no and justify my reasons. This year, I say “no” and point them to the course expectations handed out on the first day which states that I don’t give extra credit. Only if students want to have a discussion, in respectful terms, outside of class, do I go into that territory. But this year, as opposed to last year, I’m not the one starting the discussion.

Anyway, how did I get on this topic? Oh yeah, so I feel like I can keep a pretty cool head at school. I’m empathetic to students and my own emotions don’t really ever show through. But today, for the first time this year, there was a student in front of me crying. Because of… well… lots of things. But the point is: my chest tightened, I got all emotional and flustered, and his or her words were bouncing around in my head for hours as I played the situation over and over like a movie reel in my mind.

I felt the same kind of heightened, overly-emotional reaction that I experienced when I was student teaching. It is hard to go through the motions of teaching when you’re not steady emotionally.

I’m much better now, and things will be just fine.

Some fluffy part of me wants to say that emotion enhances teaching. But the more honest part of me is screaming: not being so invested in students emotionally might actually serve them better. I don’t mean that it’s okay not to care about your kids. But it’s okay not to get all tied up in their day-to-day feelings towards you, your subject matter, your policies, or your class. I think I’m not expressing myself right and I need to think this through a bit more to articulate it so it doesn’t come across harshly. But maybe other teachers out there have a sense of what I’m talking about? Keeping an emotional barrier between you and your students?

Arc Length of Lissajous Curves, or Pretty, Pretty Pictures!

In MV Calc today, we were learning about arc length. In 3D, if you have parametric equations defining a curve, you can find the arc length by calculating:

L=\int_a^b \sqrt{(\frac{dx}{dt})^2+(\frac{dy}{dt})^2+(\frac{dz}{dt})^2}dt

I asked them to calculate the length of this curve, which will repeat itself, over and over and over:

x(t)=\cos(3t), y(t)=\sin(5t), z(t)=\cos(2t)

If you graph it, it looks like this (it’s a 3D Lissajous curve):

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Which is awesome! They had to figure out the limits of integration (the function will go back to it’s original starting point when t=2\pi, so the limits of integration are from 0 to 2\pi. And we had to use our fnInt function on our graphing calculators to actually calculate the length. But it was cool.

During the class, I starting thinking of all the extensions and projects that could come out of this. For example, we could have students study x(t)=\cos(at), y(t)=\sin(bt), z(t)=\cos(ct). If a, b, and c are all rational numbers, we can prove that the curve will repeat itself. However, as soon as we make one of them irrational, we can prove the curve will not repeat itself. Look at this video to see how cool it looks!

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What if all three (a, b, and c) are irrational? What constraints do we need if we want the function to repeat? (The answer won’t be tough, I imagine, but worth exploring.)

Also, on the subway ride home, I wondered if we could come up with an explicit formula (rather than parametric) for a surface containing every point on the curve. (A harder question, for sure.)

And another: what is the smallest volume you can design to enclose a curve which does repeat, like x(t)=\cos(3t), y(t)=\sin(5t), z(t)=\cos(2t). Since sine and cosine bounce between 1 and -1, I will say that your volume had better be better than 2^3.

Terminology, Notation, Ideas

In my (non-AP) calculus class last week, I was teaching my students about continuity of a function. Before we started, I asked them what continuity was, and students in both sections started their answer by saying “well, it’s when you draw a function and you don’t have to lift your pencil.” Some spoke of holes and asymptotes. Others spoke of endpoints.

I then proceeded to wow them by saying — all that they said could be encapsulated mathematically. The act of tracing out a function knowing where you’re going to have to lift it can be rewritten with three rules. They weren’t as impressed with that fact as I was, but I still tried to convey “Think about it! You can translate moving your hand across a page smoothly into mathematical statements.”

What’s needed for continuity of a function f(x) at x=c:

1. f(c) is defined
2. \lim_{x \to c}f(x) exists
3. \lim_{x \to c}f(x)=f(c)

I did the most obvious *you need to memorize this for tomorrow* wink-wink nudge-nudge that I possibly could. I might have even *coughed* the words “pop quiz.”

I just graded the quizzes. Horrible. HORRIBLE.

I got things that show no understanding of the symbols of calculus or what continuity means. Some examples:

(a) function f(x) exists
(b) f(x)=f(c)
(c) \lim_{x \to c}f(c) exists
(d) one value for f(x)
(e) the two-sided limit of c exists
(f) the two-sided limit of x is equal to c
(g) the function has to be continuous (you cannot pick up the pencil)
(h) \lim_{x \to c}f(x)=c

There are some major notational misunderstandings, but also part and parcel, some conceptual misunderstandings. I mean, for example, “the two-sided limit of c exists” doesn’t really mean anything useful to us. First of all, it should be the limit of the function, and second of all, it doesn’t say the limit as x approaches something.

I typed a bunch of these out and we’re going to talk about them in class tomorrow. Hopefully we’ll get to parlay that into a discussion of notation, the precise meaning of math symbols, and the importance of listening to Mr. Shah’s coughs.

Student Faculty Judiciary Committee

This year I’ve decided to be a faculty representative on the Student Faculty Judiciary Committee (SFJC).

I’m sure I must have talked about SFJC before, because I went a lot last year. I was called in to answer questions about some cheating incidents that happened in my class, and I went in as an advocate to my advisees for a few different issues.

This committee, in my opinion, is one of the best things about my school. It is comprised of 8 students (two students from each grade, elected by their peers), 2 faculty representatives, and 1 faculty adviser. When students violate the community standards laid out in the student handbook — be it anything from chronic lateness to cheating to theft — students are referred to the SFJC. It’s scary for students: they see it as a judging by their peers.

However, from what I’ve seen when I was called before the SFJC to answer questions or when I was advocating for one of my advisees, I didn’t see anyone judging. Instead I saw a place where students are asked, by other students, to reflect on their actions.

Standard questions seemed to be: “Why do you think the rule was in place?”, “What went through your mind as you were breaking the rule?”, “Who was hurt by this violation?”, and “What actions have you taken, or do you intend to take, to prevent a repetition of the same action in the future?”

Discipline becomes a learning process.

After the hearing, the committee deliberates and makes a recommendation for consequences which goes to the administration, who then decides to accept it or send it back to the committee with potential changes outlined. Standard consequences are being put on warning, in-school suspensions, and out-of-school suspensions.

Students (and faculty!) have to arrive at school at 7:30am when there are cases. This adds up to a not unsubstantial amount of given up by the members. I was so impressed with the committee’s work last year that I nominated the committee for an award (for a person or club which promotes school values) — that it ended up winning. In the nomination form, I said that the SFJC members are the unsung heroes who conscientiously and selflessly provided the backbone to our community by enforcing its values.

Even though I dread the idea of waking up 15 minutes earlier, and I cringe at the idea that I won’t be able to make photocopies before school on the day with cases, I felt like it would be crazy not to be a representative on the committee this year. The work they do is so integral to the school, it is work with meaning, that it’s a sacrifice I think I’m happy to make. (We’ll see once I take my seat on the committee.)

The four hour training session for this year’s committee members happens tomorrow (Sunday), and cases I’m sure will be heard next week. Here’s to hoping that my idealism isn’t shattered when I see the process from the inside.

Multivariable Calculus Problem Sets

As you probably know, I’m teaching Multivariable Calculus this year, and I came into the course with a vision: a collaborative, problem-solved based class, where students aren’t motivated by exams and grades, but rather by the challenge of thinking for themselves.

(Of course, getting really great, full-of-personality students helps too!)

The problem sets seem to be working out well. (As of now, I’ve gotten or adapted most of the questions from Anton; but I’m going to be integrating more questions from other sources.) At the end of the course, I’ll probably post them all my Multivariable Calculus Website, but for now I’ll post what they’ve been given:

multivariable-calculus-problem-grading-rubric
problem_set_1a
problem_set_1b
problem_set_2a

Of course I’ll be asking my students to reflect about this course, and the problem sets, and the very different setup. I’m more than curious as to what they’re going to say. I’m also hoping to get permission from my students to scan in their solutions, so you can see the evolution (or not) of how my students communicate mathematics.

You can see two of my favorite problem set problems below.