Rotation: Probing Questions
Whether you are looking for a question to stimulate discussion in lesson, or a challenge at the end of a homework, then hopefully you will find these useful.
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Convince Me That... keyboard_arrow_up
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I use Convince Me That questions lots in my lessons and homeworks. Providing students with a statement and challenging them to come up with as many different ways of convincing you as possible can lead to some fascinating discussions. The different ways of seeing the same thing can also help improve the depth of students’ understanding. Thanks so much to the Thornleigh Maths Department, in particular Erica Richards, Anton Lewis and Gareth Fairclough for helping me put these together, and we will endeavour to keep adding more!
You need to give 3 pieces of information to describe a rotation
A rotation 90o clockwise is the same as a rotation 270o anti-clockwise
You can check whether your rotation is correct
When looking at two objects, you can tell if they have been rotated
A reflection in the line y = x is not the same as a rotation 180o about the origin
The order you perform two different rotations does not matter to the final result (or does it???)
VI3 Treatment keyboard_arrow_up
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We devised VI3 Treatment as a versatile way of giving students meaningful follow-up work at once we have marked their homework. The idea is that students are challenged to come up with 3 things with certain constraints. These are ideal to use as an extension for students who have got everything correct, and also as further purposeful practise for students who have got a particular question wrong. Use the ideas below and adapt them accordingly, using different numbers where appropriate. Either mark them yourself or better still, get other students to do it. Thanks so much to the Thornleigh Maths Department, in particular Erica Richards, Anton Lewis and Gareth Fairclough for helping me put these together, and we will endeavour to keep adding more!
Write down the 3 pieces of information you need to give to describe a rotation
Write down a series of 3 rotations that result in a shape returning to its original starting position
Describe 3 different rotations that result in 3 different points of your choosing all ending up at (3, -5)
Draw a shape in the top-right quadrant. Write down 3 different single rotations that would transform the object into each of the other 3 quadrants. Always start back at your original shape each time.