I love Nix the Tricks. I try to teach in ways that encourage students to make sense of mathematics, to believe that mathematics makes sense, and to understand what they’re doing rather than following a recipe provided for them.
But today, I told a student to flip and multiply when dividing fractions.
I’m teaching trig identities with my precalc students. I love this part of the unit; it’s abstract and challenging at first, but over time students start to see problems as little puzzles to figure out. I don’t mess with the product-to-sum and other more obscure identities, focusing more on reciprocal, quotient, and Pythagorean identities. I love questions like this one:
It seems so counter-intuitive that these expressions could be equal, yet they are. Students need to know their basic identities, need to be comfortable with algebraic manipulation, and need to remember some things about fraction operations. I like this unit because I find students can transition from seeing these problems as inscrutable and pointless symbol-mashing to seeing them as satisfying and logical puzzles.
But this isn’t a unit on fraction operations. Students were working on this problem:
Those divisions are hard! How do they work again? And we’re early in the unit, so there are some feelings of frustration that what we’re doing doesn’t make sense and students feel dumb. Frustration with fraction division is layered on top of all that. I could dive into an explanation of why dividing by a fraction is the same as multiplying by the reciprocal, but what I really want right now is for my students to feel successful working with trig identities and recognize the ways that they already know most of the math they need to solve these problems. Digging into fraction division feels like a distraction from the key ideas of the lesson, when students are happy to be quickly reminded of a procedure that will help them solve the problem in front of them.
Does this make me a bad teacher? Maybe I missed an opportunity to anticipate the difficulty with fractions and preteach some of those ideas before the unit. Maybe slowing down to spend time on the conceptual basis of fraction division is the right move. Maybe I should revisit fractions tomorrow. But these moments come up all the time, especially with precalc students. Are these moments distractions from the heart of the math we’re working on, or opportunities to circle back to math students have seen before?