Hero image

Andy Lutwyche's Shop

Average Rating4.68
(based on 8559 reviews)

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/

2k+Uploads

5623k+Views

8147k+Downloads

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/
Matrices - Fill In The Blanks
alutwychealutwyche

Matrices - Fill In The Blanks

(0)
Designed for the AQA Further Maths Level 2 Certificate, it struck me as we were covering matrices that a “fill in the blanks” sheets would (should?) work nicely with them. Hopefully I have come close to hitting the nail on the head… it involves multiplying and transformations.
Defuse The Bomb - Inequalities (Quadratic)
alutwychealutwyche

Defuse The Bomb - Inequalities (Quadratic)

(0)
Solve the quadratic inequalities to work out the order in which to cut the wires. I find these sheets useful as the answers appear on the sheet and therefore students can check quickly (without asking the teacher) whether they are on the right track; this means that the teacher can help those who genuinely require it.
Transformation Matrices Codebreaker
alutwychealutwyche

Transformation Matrices Codebreaker

(0)
Students must work out from the written transformations the transformation matrix in each case to reveal a punchline to a joke. This is designed for the AQA Further Maths Level 2 Certificate qualification.
Function Notation - Fill In The Blanks
alutwychealutwyche

Function Notation - Fill In The Blanks

(0)
A sheet in four parts regarding functions: substitution, domain/range, inverses and composite. I have tried to cover as many different aspects of each part; each part contains eight questions and I have done it this way so you can use each part separately if you wish, or all together, whatever you like. The idea is to work forwards and backwards using the information given. Hopefully it is fairly self-explanatory but no doubt we will find out!
Stationary Points Codebreaker
alutwychealutwyche

Stationary Points Codebreaker

(0)
Written for the AQA Further Maths Level 2 Certificate but could be used at A Level too. This is the usual “answer the questions, reveal the anagram of the punchline” thing, being an anagram so that student don’t guess the order/answers. I like this joke but others may not…
Second Derivatives Codebreaker
alutwychealutwyche

Second Derivatives Codebreaker

(0)
Designed to be used in the AQA Further Maths Level 2 Certificate but could be used at A Level too. Answer the questions, reveal the punchline to a cheesy joke… the usual nonsense.
Simple Differentiation Codebreaker
alutwychealutwyche

Simple Differentiation Codebreaker

(1)
Designed for AQA Further Maths Level 2 Certificate course (the style of questions in particular) but could be used at A level too. Answer the questions, reveal the (really rather good, even if I do say so myself) joke.
Trigonometry and Circle Theorems Problems
alutwychealutwyche

Trigonometry and Circle Theorems Problems

(1)
I wanted some problems involving trigonometry (both right-angled and non-right-angled) and thought I’d mix them up with circle theorems for a particular class. Hopefully these will make them think a little bit. There are animated solutions should you want them. One typo corrected…
Trigonometry (Area, Sine, Cosine Rule) Codebreakers
alutwychealutwyche

Trigonometry (Area, Sine, Cosine Rule) Codebreakers

(0)
Three codebreakers covering area using trig, the sine rule and cosine rule respectively. Make sure that students do not round any answers until right at the end (it does state on each to round you “final answer”) and reveal the three cheesy jokes. These work well in my classes as starters, plenaries or main tasks. Each one is an anagram so that students are not tempted to guess letters. The final question on each is more of a problem solving question.
Equations of Linear Functions Codebreaker
alutwychealutwyche

Equations of Linear Functions Codebreaker

(0)
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.
Coordinates On Functions Codebreaker
alutwychealutwyche

Coordinates On Functions Codebreaker

(0)
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.
Area, Sine and Cosine Rules Codebreaker
alutwychealutwyche

Area, Sine and Cosine Rules Codebreaker

(0)
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.
Percentage Trees
alutwychealutwyche

Percentage Trees

(0)
Six trees to climb on percentages, covering equivalence, of an amount, change and repeated change. Each tree gets increasingly challenging as the tree is scaled so these might be useful for a plenary or starter to inform you of where they feel comfortable/challenged.
Fraction Trees
alutwychealutwyche

Fraction Trees

(0)
Six trees taking students through simplifying, fractions of an amount, add/subtracting, multiplying/dividing, mixed numbers. Four questions on each getting progressively harder so students can choose the level they start (and finish). Good for starters or plenaries(?).
Sporting Bounds
alutwychealutwyche

Sporting Bounds

(0)
This came about after a colleague of mine (a Spurs fan) was moaning about a VAR decision that prevented Spurs from winning a Champions League match. Another colleague (a Brighton fan this time) suggested we check the errors in measurement and this was born. It is a bit of an experiment and I am aware that error is built in to the systems but I thought it was a nice practical use of something we cover in GCSE Maths. There are four scenarios: one tennis, two cricket and one football; questions are quite wordy but need to be to explain the laws of the sports in question.