I have been a teacher for over 20 years - all the stuff I upload has been tried and tested in my classroom. I don't mind a discussion on Twitter too where I also share new resources. I now have a personal website: https://andylutwyche.com/
I have been a teacher for over 20 years - all the stuff I upload has been tried and tested in my classroom. I don't mind a discussion on Twitter too where I also share new resources. I now have a personal website: https://andylutwyche.com/
This takes students through everything they will need to know about sets and Venn diagrams, building up to the hardest type of question (hence the name).
Another in the series taking students through the skills required to solve equations, including simplifying expressions, expanding brackets and reading the question carefully!
Another one of these, although I have not included probability scales or tree diagrams specifically (there are a couple of questions where a tree diagram could be designed to help with a solution); this is due to lack of space in the main.
The next in the “Building Blocks” series going through all the skills that lead up to different ratio problems. I have included simplifying fractions, unit conversion, HCF before moving on to ratio problems of varying difficulty levels. Hopefully this should provide some useful revision tasks.
Practice for the skills required to find a percentage of an amount; not difficult but designed for non-calculator use ultimately and checks skills such as multiplying and dividing by 100, decimals, converting between fractions, decimals and percentages before asking a few percentage of an number questions.
I had this idea whilst driving home tonight thinking that I could do with some more stuff on bearings. The idea is for student to practice all the skills involved in bearings problems (angle properties on lines, around a point, triangles and parallel lines as well as scale) and then move on to solving some actual bearing problems. I have designed it in the shape of a wall to show that we build up to the summit. Obviously with this topic, scale is more of an issue but I hope it’s useful… (error corrected)
This does exactly what ot says on the tin; I want my classes to get used to using multipliers instead of “divide by 100, multiply by the percentage you want” in readiness for percentage calculations later on in the curriculum. This is not the most challenging but offers an opportunity for students find multipliers. It is a great joke mind you.
This (hopefully) does what it says on the tin: I wanted some sheets for students to construct triangles and bisectors so produced this. The constructions all fit in the boxes provided as long as you print them out on A4 paper. We start with constructing triangles, then bisectors, then a rhombus and a perpendicular line from a given point before finishing with couple of challenges (Yin-yang, incircle and circumcircle). Like I say, it is not designed to be flashy just practical.
I was looking for something that had its own grids as I didn’t want the mis-drawing of axes to take over a lesson but there wasn’t a lot (maybe I wasn’t looking in the right place), so I wrote this. There are three sections: y=mx+c, rearranging to y=mx+c, mixed questions. There is also a RAG sheet for students to fill in as they go to demonstrate progress.
I’ve called this an “Advent” calendar as I couldn’t think of a better name, but I have little intention of using it in the run up to Christmas only. There are 24 questions which you can choose to display; students have a go and can then check their solutions with the model answer slide. Topics include bearings, averages, expanding and simplifying brackets, angle problems, transformations, proportion, simultaneous equations, similar shapes, indices, surds, circle theorems, algebraic fractions amongst other topics. Questions are from Edexcel past papers.
I’ve called this an “Advent” calendar as I couldn’t think of a better name, but I have little intention of using it in the run up to Christmas only. There are 24 questions which you can choose to display; students have a go and can then check their solutions with the model answer slide. Topics include forming/solving equations, estimating the mean, equations of lines, trigonometry, tree diagrams, transformations, standard form, angles, compound interest, bounds, geometric sequences, completing the square amongst other topics. Questions are from Edexcel past papers.
For those who have used these before it is the usual format where students answer questions to reveal a punchline to a cheesy joke. Student seem to like them as they offer a competitive edge and are different from answering questions out of a text book. I use these as starters/plenaries but occasionally as a main task. Topics here include inequalities, linear and quadratic graphs, simultaneous equations, transformations, expanding brackets, factorising expressions (including quadratics), rearranging formulae amongst others. Some of these are already available for free on TES.
These cover new topics on the GCSE curriculum including Venn diagrams (Given that…), iteration, algebraic proof, expanding three brackets and others plus some gaps plugged from the original bundles. Each sheet contains questions and an accompanying video which is accessed via a QR code; the video is reasonably short and covers a couple of examples of similar questions on the sheet.
This is a booklet of around 180 worksheets covering the GCSE Maths course, each with an accompanying QR code to a short video for those who need a reminder of how to do the questions (the videos aren’t solutions to the questions on the sheet but to similar questions). There are answer sheets at the end so answers can be checked. This includes new elements of the GCSE including iteration, frequency trees, Venn diagrams and other topics. Each section (Number, Algebra, Geometry and Data) is available individually but if you want the whole booklet then this is for you.
The usual terrible joke once students have done some work on gradients of lines either by finding it from the equation (involves some rearranging) or by calculating it from two points on the line.
The usual lame joke having done some maths; the formulae aren’t overly taxing but do involve powers of negatives. They are now formulae and not expressions.