Ten questions of increasing difficulty on sets and Venn diagrams; four possible answers are given for each of which three have common misconceptions that can be discussed in class. These are designed to encourage discussion.

Ten questions of increasing difficulty where four potential answers are given, but only one is correct. These are designed to encourage mathematical discussion in your classroom, where the incorrect answers are the focus of the discussion. These go from describing single transformations through to mapping coordinates to trigonometric functions but it is designed for GCSE or Further Maths Level 2 Certificate.

Six questiopns where students are given the answer but have to show the workings. There are two “challenge” questions but this is designed to force students to explain what they are doing mathematically.

Ten questions of increasing difficulty (you can choose which you do); four hypothetical students have had a go and one has got the answer correct with the other three making common errors. Not only should your class work out who got it correct but as an extension/part of the activity they could work out the misconception for the wrong answers. This involves lines, polygons, quadrilaterals, circle theorems and bearings.

Ten questions of increasing difficulty; four answers given but only one is correct. Can your classes decide who is correct and where those who aren’t correct have got their answers from? This is designed to create discussion over vector problems (and have worked in my classroom). Arrow changed in Q1!

Five pairs of graphs; students need to calculate where intersections with each other and axes are. I have produced a PowerPoint so the graphs can be displayed, but if you want a worksheet there is one of those too. The worksheet asks for turning points on the final set of graphs.

State which points (lettered) are invariant in each transformation and reorder the letters to find the punchline to a cheesy joke.

I got shown this by a colleague so thought I would PowerPoint it; there are essentially a few versions of the same thing: Minimally labelled etc - for a strong set of mathematicians All angles marked The side or angle you need to find next is highlighted I will use this to introduce the addition formulae. There may well be other/better versions out there so I am sorry if I have wasted your time.

Casey is doing the AQA Further Maths Level 2 Certificate course; this is the homework for Chapter 1 involving Pascal’s Triangle, product rule for counting, solving equations (involving fractions) and algebraic percentage relationships. These are designed for students to discuss how to solve the problems given and appraise “Casey” regarding their understanding; I find these to be good at deepening understanding.

Casey is working through the AQA Further Maths Level 2 Certificate and has reached the Calculus chapter; however, Casey requires the help of your class. Spot the mistakes, correct them and explain where Casey has gone wrong. These work well for discussions in class.

There are four trees where students can work from bottom to top, choosing an appropriately challenging start point if they wish. This is “introduction to algebra” stuff, I will do expanding and factorising on a separate file but these could offer nice starters or plenaries. It contains adding/subtracting as well as multiplying variables and collecting like terms.

Includes one and two brackets for expanding, including simplifying as well. I wanted to have 8 trees in total so also put in a completing the square tree. Each tree has 3 or 4 questions of increasing difficulty; students choose their start and finish which should allow you to judge where to pitch your teaching; or you could just use it however you like.

Answer the questions, which get progressively more difficult, involving one or more of the trigonometric rules to reveal an anagram for the punchline of a joke. My classes seem to like these, the cheesier the joke, the better and given that this is an anagram they cannot guess the order of the letters for the answer.

Find the missing coordinates on the functions to reveal the punchline to a joke. Most involve linear functions but there are others towards the end; the challenge increases as the questions progress. Useful as a starter, plenary or main task and students seem to enjoy finding the punchlines.

Essentially students must use y=mx+c to answer questions then reveal the punchline to a joke. There is a grid and five lines from which to refer to, but this includes parallel and perpendicular lines and their equations as well.

Another one of the “answer the questions, reveal the joke” classics (the joke is a cracker by the way). This is an attempt to force students to solve equations rather than try numbers as I am seeing some of this with some students.

Designed for the AQA Further Maths Level 2 Certificate course but could be used at A Level. Answer the questions, reveal the joke, you know the drill…

Designed for the AQA Further Maths Level 2 Certificate course, answer the questions, reveal the joke. This is essentially multiplying matrices.

The usual "do the Maths, find the punchline) thing; find where the coordinates have moved to after the transformation. I particularly like this joke, by the way.

Four spiders which are easiest at 12 o’clock then get harder clockwise; they also allow for debate about what function fits the coordinates given. These are designed to stop students just following a set of rules and to get them thinking; I hope it works!