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is an 黑料情报站 venture working in partnership to empower and equip schools to deliver world-class mathematics teaching through an engaging and accessible style of mathematics teaching, inspired by Singapore and Shanghai. Below, the team shares tips on how they’ve used representations and models from the Mathematics Mastery programme to illustrate and teach key concepts.

Claire Crosbie, Head of Training 鈥� bundles of drinking straws for developing number sense

鈥淒rinking straws in bundles of tens and singles are great for year 1 pupils to develop understanding of place value.

鈥淧hysically making groups of ten and breaking them up is critical to them understanding the value of any 2-digit number.

鈥淚t鈥檚 great when you see pupils confidently represent any 2-digit number using straws and also articulate very clearly the value of each number. When they can do this confidently, addition and subtraction of 2-digit numbers falls into place more securely for them. It really is critical to developing the basics of their number sense knowledge.鈥�

Fin McLaughlin, Regional Lead 鈥� the area model of multiplication for teaching multiplication with fractions

鈥淢y favourite model is the area model of multiplication (drawing rectangles to represent products, where the lengths of the sides are multiplied together to make the product).

鈥淚t鈥檚 a very rich model that makes links to arrays (an early concrete representation that supports pupils to start understanding the structures of multiplication and division). It neatly demonstrates the inverse relationship between multiplication and division, the commutativity of multiplication and how different pairs of factors can produce the same product.

鈥淚t becomes really useful in KS2 if pupils are familiar with it and fluent in manipulating it, as it can be used to start constructing pupils鈥� understanding of multiplication with fractions.

鈥淭his is an important idea because, for the first time, they learn that multiplying doesn鈥檛 always produce products that are greater.鈥�

Lisa Coe, Primary Development Lead 鈥� Cuisenaire rods for fractions

鈥淐uisenaire rods have a myriad of uses. They can be used for number work, including representing word problems as a concrete representation of bar models but can also be used to measure and represent shape and space problems.

鈥淚 particularly like using them for fractions 鈥� they have no fixed value and so can represent anything and since they are proportional, they can be used to represent fractions. Because they are practical and hands-on, they can be manipulated and moved around which supports conceptual understanding of more abstract concepts.鈥�

James Protheroe, Primary Development Lead 鈥� the number grid ITP for spotting patterns

鈥淲hen I was teaching, I loved using the Number Grid ITP. It is great for getting pupils to spot patterns in a given times table and see that multiples go beyond just 12 times a number which pupils usually get to.

鈥淚 love the Number Grid ITP especially because you can alter the number of columns and therefore the patterns shift but getting pupils to focus in on the patterns between the multiples and how the gap will remain the same. There will always be two empty squares between multiples of three.

鈥淭he best lesson I had with one was when we were looking at the multiples of 3 on the ITP. Once pupils had spotted the pattern of the three times tables on standard ten by ten, I then started playing 鈥榮illy teacher鈥� and not always selecting a multiple of three for the pupils to spot which were selected by mistake and getting them to explain why.

鈥淲e then went a step further and changed the number of columns still with the multiples of three highlighted, subsequently altering the pattern represented and the pupils loved watching it and then checking whether it was still the three times table by looking at the relationship between the multiples 鈥� all the numbers highlighted were still three steps away from each other, there were two numbers which weren鈥檛 highlighted before one that was.鈥�

Anthony Latham, Development Lead 鈥� Dienes blocks for the place value of numbers

鈥淒ienes blocks help to stress the place value of number and pupils can use them to represent numbers and see their value. They are incredibly useful all the way from Year 1, where they start to replace tens and ones to show groups of ten, up to upper Key Stage Two, where they can support a conceptual understanding of more complex concepts such as decimals and percentages.

鈥淲hilst they are a great representation, with increasingly large numbers they become rather clunky (too many 1000 Dienes cubes!) and so they are best used when transitioned into/in conjunction with Place Value counters. The counters are more efficient but the Dienes ensure that a strong conceptual understanding is maintained.

鈥淎 great lesson I saw this year exploring Dienes was the teacher collecting all the Dienes from the school (which we know can be tough to source) and challenging pupils to work out how much space on the floor they think the representation of a number in millions might take up. This provides lots of great explanation/reasoning opportunities. Pupils then go on to create the number in Dienes and test their predictions.鈥�

Laura Tyler, Primary Development Lead 鈥� the bead string for numbers beyond 100

鈥淢y favourite resource is the bead string. The power of the bead string comes from realising its versatility beyond numbers within 100. Pupils鈥� conceptual understanding can be developed by re-assigning the values of each bead.

鈥淲hat if the 鈥榳hole鈥� (all 100 beads) was worth 1? Pupils can be engaged in exploratory activities and dialogue, making connections between the value of the whole and its parts and they can manipulate the beads to support their reasoning.

鈥淗ow do you know the value of each bead? If one bead is worth 0.1, what鈥檚 10 beads worth? 100 beads? What if we had 2 bead strings in a row鈥hat鈥檚 the value of 120 beads? 13 groups of 10 beads? 1.5 bead strings?

鈥淭he bead string engages pupils in visualising maths 鈥� so taking the questioning further, what if we had 50 bead strings in a row in the room, each with a value of 0.1 鈥� what鈥檚 the value of 50 bead strings? 10 beads? 1 bead?鈥�

Rebekah Goh, Design Project Lead 鈥� using the Dienes block to represent decimals

鈥淎 good use of manipulatives I鈥檝e seen is reassigning the value of Dienes blocks to represent decimals. Dienes equipment is normally used to represent integers; one of the things its structure emphasises is the base ten property of our number system (that each place to the left has a value ten times greater than that to its right).

鈥淭he teacher got the class to imagine 鈥榸ooming in鈥� so that the 鈥榯housand cube鈥� now represented one, which then meant the 鈥榟undred slab鈥�, 鈥榯en stick鈥� and 鈥榦ne cube鈥� represented tenths, hundredths and thousandths respectively.

鈥淧upils were then using Dienes to support them in matching up decimal and fraction notation. A pupil had matched something like 0.25 with 25/1000 until they represented it with the Dienes and then they were able to reason with their partner about how 0.25 must actually be 25/100 because they could see the five hundredths and twenty hundredths (or two tenths).鈥�

Laura Shenker, Design and Development Director 鈥� geoboards for 鈥楢rea鈥�

鈥淚 think the best lesson I鈥檝e have seen is a year 7 lesson on 鈥楢rea.鈥�

鈥淲orking in pairs, one student had a geoboard and the other had dotty paper. I was really impressed with how they listened to each other鈥檚 explanations, drew diagrams to convince one another and presented their reasoning in full sentences.鈥�

Mathematics Mastery is a research-based school improvement programme, specifically designed for UK classrooms by Dr Helen Drury and a team of experts. The programme includes five integrated components, which work together to build specialist expertise, develop teachers, improve maths lessons and drive change. to find out more.