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The focus of all of the resources on this website is to promote conceptual understanding by starting with context first. This makes them ideal low threshold, high ceiling lessons. Please read the notes below on how to use them. These resources and this idea is new and untested so feedback is welcomed! Please visit the website for more info on how to use these resources. (Some resources are borrowed or adapted from other places - Credit where it's due)

The focus of all of the resources on this website is to promote conceptual understanding by starting with context first. This makes them ideal low threshold, high ceiling lessons. Please read the notes below on how to use them. These resources and this idea is new and untested so feedback is welcomed! Please visit the website for more info on how to use these resources. (Some resources are borrowed or adapted from other places - Credit where it's due)
Topic Intro - Year 7 - Unit 2 - FDP
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Topic Intro - Year 7 - Unit 2 - FDP

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Topic Intro designed to introduce Year 7 students to careers and real life uses of maths plus its place in their learning journey and other skills that they will be building on.
Whole Number & Decimal - Lesson 7 - Division
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Whole Number & Decimal - Lesson 7 - Division

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Much of this lesson references the idea of thinking about division in terms of multiplication. As such, the lesson starts with an exercise designed to provide students with a complete set of multiplication grids. You will need to print slide 1 for students and hand them to them on the way in to lessons. The answers are on slide 2. Then follows a true or false exercise designed to refresher students understanding of division. Do this using thumbs up or thumbs down across the room (They can always do in the middle if they aren’t sure). The next activity gets students to think of division in terms of worded sentences e.g. How many 5’s are there in 15? followed by a look at fact families. This is to get students to remember and understand the inverse relationship between multiplication and division. Similar to the other arithmetic lessons, there are then mental and written methods of division. The mental methods of division are a series of divisibility tests and what to look for to see if a number will divide to give an integer answer. Provide students with a copy of the green grid on slide 7 and fill in the rules as they go along. It’s fun to do the number sort activities at the board with some board pens. When they have all the rules, they should attempt to complete the orange grid on slide 13. Bonus points for any students who can recognize that all the divisions can be completed but some will give a decimal answer. To lead in to the written division techniques, first is a reminder of some of the literacy such as dividend, quotient and divisor and a visual demonstration of how division works as a method of grouping. There is then an “I do, you do” section to teach bus stop method. Most students should have seen this before. There is then a differentiated challenge. Students should challenge themselves to get as far as they can. The next section is about dividing decimals including giving decimal answers, dividing a decimal by an integer and giving recurring decimal answers and some practice on these skills. A trickier extension is to ask students to explain how to divide by a decimal. This slide includes a visual explanation of why it works and some practice. Lastly, there is some problem solving questions and a division dot to dot. Students will need a copy of slide 28 and 29. Students should start at an underlined question. They then need to join the question number to it’s answer. The answer then becomes the next question number until they reach a dead end. They should then start at the next underlined number. Activities included: Timetable grid starter Division True or False Division as a sentence Mental Divisibility tests Division Literacy Written division explanation & practice Mixed decimal division Dividing by a decimal Problem Solving Division Dot to Dot
Whole Number & Decimal - Lesson 6 - Multiplication
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Whole Number & Decimal - Lesson 6 - Multiplication

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The ‘Why’: Why does multiplication work the way it does? This lesson starts with an exercise designed to get students to recognize that multiplication is a way of simplifying repeated addition. It is then followed by a refresher of the commutative and associative laws and why they work. Similar to the addition and subtraction lessons, this is then split into mental and written techniques. Mental techniques covered include; doubles, using 10’s, hand tricks and partitioning. Students should be reminded that, whilst they may be able to answer quickly and another way, these are good techniques for them to have in their back pockets. The aim is to give a technique for as many time tables as possible. Each slide features an “I do, you do” example, followed by a time trail to see how many students can complete in one minute. Following this is the written techniques that includes: bar models, grid method, lattice method and lines. Some of these descriptions are slight rewording of popular techniques. Grid method is the method by which the place value of each number is split and put in a table. The lattice method, is similar but features diagonal lines to give two digit answers followed by diagonal addition to give each place value. Lastly, line is the Japanese method of drawing a single line to represent each place value, followed by another line across is and then counting the points at which they cross. The deliberate decision was made to not include column method as it will likely have been covered in primary and often leads students to an incorrect answer. Towards the end of the lesson, there are some techniques for decimal multiplication including using similar sums and estimating followed by practice using any method. At the end is a mix of problem solving tasks including worded and spot the mistake problems. Activities included: Repeated addition starter Commutative and associative law refresher Mental multiplication methods Written multiplication methods Decimal Multiplication Estimating and Using Similar Sums Mixed Problem solving
Whole Number & Decimal - Lesson 5 - Subtraction
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Whole Number & Decimal - Lesson 5 - Subtraction

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The ‘Why’: Why does subtraction work the way it does? This lesson starts with a worded problem about people’s heights. This is to introduce the idea of a real world application of subtraction as well as unit conversion and problem solving skills. Next is an introduction to inverse operations. This explained as being one of the most beautiful and simplistic ideas in all of mathematics; that anything that can be done one way can also be done in reverse. This is shown through bar models and fact families. As an extension of the work on addition, mental subtraction techniques such as partitioning and compensating are covered as an ‘I do, you do’ followed by some practice questions of each. Then, move on to written subtraction. This is one of very few slides where the answers haven’t been provided. However, a place value grid has been provided to talk through the answers and techniques. There is then some practice (with grids) that does include the answers and some problem solving questions as extension. There is then a slide addressing a misconception that is often built in by teachers; that you “can’t take 3 from 2”. This isn’t strictly speaking true. If you take 3 from 2, you get negative 1. There is then an example of how, if you are secure in your understanding of place value, you can subtract using these numbers. There is then explanation and practice for subtracting decimals. Although this will have been modelled earlier, this will be the students first chance to practice. Again, the first screen is an “I do, you do” (without answers) and then practice (with answers). There is then an example of how bar models and fact families can be used to solve algebraic expressions and lastly, some problem solving tasks using algebraic skills. Activities included: Worded height starter The beauty of inverse functions Partitioning and compensating mental subtraction Written subtraction practice Problem solving Place value subtraction Subtracting decimals practice Using bar models for algebra Algebra problem solving