With the conclusion of the algebraic portion of the MPM2D course (we only have the trigonometric unit yet to cover) the students are looking forward to their summative evaluation. We've been doing review for the past week or so through the application of what we learned in linear systems and quadratics to do the intersection of lines & parabolas and lines & circles. It's a good way to combine the substitution method, and all the aspects of factoring, quadratic formula, discriminant and using graphical methods. I've been pleased that the students transitioned to the linear-quadratic system without difficulty; they were able to anticipate the process.
As part of their preparation I've added on to our MapleTA question banks. While we have a lot of algebraic questions (factor this, CTS that, find the axis of symmetry, etc) at the suggestion of one of my students I've added on questions of the type "when you see..." Students do get confused by all the algorithms and when they need to be used. While we always stress understanding, for many of them a little bit of repetition can be helpful.
As part of their preparation I've added on to our MapleTA question banks. While we have a lot of algebraic questions (factor this, CTS that, find the axis of symmetry, etc) at the suggestion of one of my students I've added on questions of the type "when you see..." Students do get confused by all the algorithms and when they need to be used. While we always stress understanding, for many of them a little bit of repetition can be helpful.
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