Maths resources.
Working on Project-A-Lesson. A full lesson in a PowerPoint. For busy teachers who still want outstanding engaging tasks and learning checks
Maths resources.
Working on Project-A-Lesson. A full lesson in a PowerPoint. For busy teachers who still want outstanding engaging tasks and learning checks
Example problem pair
Some exercises
Learning check
Not massively exciting. Open to suggestions on how to inject a little more zip.
NOTE: TES has pretty rubbish versioning. I tend to update my PowerPoints every time I teach with them, adding more stuff or correcting errors in presentation and math. The latest version can always be found here
Full lesson
Prior knowledge check
quite a few questions with nice diagrams
learning check
NOTE: TES is a bit rubbish for versioning. I often update my PowerPoints to add corrections or tweek the content etc. The latest version of this resource can always be found here
An example problem pair
A nice set of questions where students have to decide why two problems have been paired (a bit variation theory-esque)
Lots of questions, including a big set of questions on moving between radius/diameter and circumference.
Some whiteboard work
A problem solving question I came up with
A learning check
NOTE : TES is annoying for keeping stuff up to date. I often change my powerPoints to add stuff and make them better, or simply to correct errors in maths and presentation. The latest version will always be found here.
Areas of circles lesson.
Includes
Example problem pairs
Lots of activities
Links to some mini whiteboard random questions
A learning check.
Probably two lessons. Quite in-depth.
NOTE : Version management on TES sucks. Sometimes I update my PowerPoints to resolve errors or make them better. I keep the latest, updated version of the PowerPoint here.
ppt on collecting like terms.
Includes:
Discussion on what a like term is
Some basic questions
Questions about algebraic perimeter
Questions on algebra pyramids
A problem solving task involving an algebraic magic square
Two learning checks.
Not sure how I feel about some of the decisions here. I’ve introduced a bit of index laws towards the end of the sheet. Is this madness? I thought I would add it to reinforce the difference between simplifying powers and simplifying regular expressions. Maybe it’s too much.
As usual here’s my little justification for the first 10 questions.
A simple one to start
If you change the letter, it’s the same process
You can have multiples of terms
And it doesn’t matter where in the expression they occur
You can have 3 terms
And it doesn’t matter where in the expression they occur
Introducing a negative for the first time. At the end to make it easier
But the negative can occur anywhere! Here it actually makes you use negatives unless you collect the terms first
Introducing terms like bc. It’s not the same as b + c
We can do some division
Later questions cover stuff like ab being the same as ba.
I quite like the last question
A worksheet attempting to combine Craig Barton’s ideas on variation theory (only changing one part at a time) and Dani and Hunal’s ideas around making students make choices. I’ve tried to build up to that.
Maybe by trying to combine both I miss the point of each.
Would love criticisms and thoughts.
An attempt at some variation theory
This one was hard. I spent ages rearranging questions and looking at what should be added. Specifically, I had a massive dilemma when it came to introducing fractions. I was trying to point out the ways in which simplifying fractions and simplifying ratio were similar, but I’m not sure that I haven’t just led students down the wrong path thinking they’re equivalent. For instance 5 : 6 is 5/11 and 6/11, not 5/6. Hmmmm.
The variations I used for section A.
An example where you can use a prime divisor
The opposite way around. What happens to our answer. Order is important!
Half one side. 8 : 5 becomes 4 : 5
One that’s already as simple as possible. Time for some questioning? How do you know you can’t simplify it?
It’s not just reducing the numbers down. Here you have to multiply up. Deals with what simple is. I have changed this from the picture to make only one number vary from the previous question.
Needs a non prime divisor. This isn’t really a variation, though. It has nothing really to do with the previous questions!
Again, double one side
Double both. Our answer does not double!
Adding a third part of the ratio. Changes the answer significantly.
Doubling two parts here. Our parts don’t double in our answer!
If you amend this and it works better, please let me know.
Trying to use variation theory
My thinking
A question to start
Reversing the terms. Does balancing still work?
A subtraction. How does this effect our balance.
Does reversing the terms still lead us to the same answer
Increasing the constant by one. What happens? Also: a decimal answer.
We can have a negative answer
Divide x, instead of multiplying it.
Increasing co-efficient of x by one. What happens to our answer?
Doubling co-efficient of x. Not sure about these last two. I think they may be a step back from question 7. This is the problem with presenting these in a linear format. These questions are variations on question 1, not question 7. I might experiment with some kind of spider diagram.
Doubling the divisor from 7. Again, maybe the linear way these are written is a bit rubbish.
Don’t know how I like the order of these questions, but there’s lots to think about and something to tweak.
I have found the transition to asking ‘why have they asked you that question? What are they trying to tell you?’ has been difficult for some students, but I think it’s worth devoting time to it. If students are inspecting questions for things like this, maybe they’re more likely to read the question thoroughly and pick out it’s mathematics. Big hope, I know.
Made these as a way of drilling into my students useful facts that they should commit to memory (ie 1/5 = 0.2).
Made to be used like old spelling tests. Give out the facts. Students use memory techniques like covering up etc to remember them,
Then they can be given a follow up test (included) to see how much they’ve remembered.
Starter about hatching eggs and a rich task involving student developing a plan to maximise XP and minimise time spent.
Made by a colleague who is shy to upload stuff. I understand none of it. Much thanks to him.
Massively based on @Dooranran 's stuff.
Speed distance time
Nets
Areas of circles/volumes of spheres
Symmetry
Pie charts
Equations of lines
Proportion
Reading graphs
Misleading graphs.
A resource for P Level maths.
Created this because I have a nurture student who finds it difficult to tell the difference between both, all and other directional statements.
Will do more if people want. This area of maths interests me.
A worksheet for simple sequences, both generating from a written rule, and finding the missing number.
Students start at T. They then answer the question at the bottom of the letter, to find the answer at the top of their next letter. And so on.
If they complete this it should spell out the punchline 'Tyrannosaurus Wrecks&'
GCSE algebra card sort. Really simple excel card sort.
Cut out the tables, the equations and the graphs. Students have to match them together.
As always, please comment and rate with suggestions for improvement.