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Disjointed independence

Posted on Apr 14 2016 by David Butler

There are two terminologies in probability which many students are confused about: "independent" and "disjoint". The other day I was working with a student listening to their thinking on this and I suddenly realised why.

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Quarter the Cross

Posted on Apr 12 2016 by David Butler

At the end of last year, the MTBoS (Math(s) Twitter Blog-o-Sphere) introduced me to this very interesting task: you have a cross made of four equal squares, and you are supposed to colour in exactly 1/4 of the cross and justify why you know it's a quarter. I call it "Quarter the Cross".

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The crossed trapezium

Posted on Apr 6 2016 by David Butler

Recently I started thinking about the properties of the following shape, which I like to call the "Crossed Trapezium". It has two parallel edges, which are joined by two crossing lines.

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The trig functions are about multiplication

Posted on Feb 25 2016 by David Butler

When I was taught trigonometry for the first time, I learned it as ratios of sides of right-angled triangles.

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When will I ever use this?

Posted on Feb 18 2016 by David Butler

"When will I ever use this?" is possibly a maths teacher's most feared student question. It conjures up all sorts of unpleasant feelings: anger that students don't see the wonder of the maths itself, sadness that they've come to expect maths is only worthwhile if it's usable for something, fear that if we don't respond right the students will lose faith in us, shame that we don't actually know any applications of the maths, but mostly just a rising anxiety that we have to come up with a response to it right now.

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Really working together

Posted on Feb 5 2016 by David Butler

Yesterday, I had one of those experiences in the MLC that makes me love my job.

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A constant multiplied on will stay there

Posted on Feb 1 2016 by David Butler

One of the most fundamental properties of the integral is that multiplying by a constant before doing the integral is the same as doing the integral and then multiplying by a constant. However, the way it's presented here makes it look like a rule for algebraic manipulation – I can move a constant multiple in and out of the integral sign. I do actually use it this way when I want to do algebraic manipulation – it comes in handy when I'm creating a reduction formula, for example. But most of the time when I do an integral, I don't use it that way at all.

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Flipping absolute values

Posted on Jan 22 2016 by David Butler

Every semester I talk to students about what the absolute value does to the graph of a function.

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