Count back from - Shepway Teaching Schools

Transcript Count back from - Shepway Teaching Schools

Shepway Teaching Schools Alliance 31a Folkestone Enterprise Centre, Shearway Road, Folkestone CT19 4RH Telephone Number: 01303 298266 e-mail: [email protected], website: www.shepwayts.co.uk

Finding rules and patterns - NIM * A game for two players * Start with 20 counters * Each player can

remove 1,2,3, counters in turn

The loser is the person who picks up the last

counter.

• • • We are preparing you to teach mathematics by : Discussing the importance of subject knowledge and pedagogical knowledge in the teaching and learning of mathematics Considering the importance of early counting for all learners Considering how arithmetic can be taught through using and applying activities

New standards: Standard 3 

Demonstrate good subject and curriculum knowledge

 have a secure knowledge of the relevant subject(s) and curriculum areas, foster and maintain pupils’ interest in the subject, and address misunderstandings  demonstrate a critical understanding of developments in the subject and curriculum areas, and promote the value of scholarship  if teaching early mathematics, demonstrate a clear understanding of appropriate teaching strategies.

* • • • The latest draft National Curriculum for mathematics aims to ensure all pupils: become

fluent

in the fundamentals of mathematics, including through varied and frequent practice with increasingly complex problems over time, so that pupils have conceptual understanding and are able to recall and apply their knowledge rapidly and accurately to problems

reason

mathematically by following a line of enquiry, conjecturing relationships and generalisations, and developing an argument, justification or proof using mathematical language can

solve problems

by applying their mathematics to a variety of routine and non-routine problems with increasing sophistication, including breaking down problems into a series of simpler steps and persevering in seeking solutions.

Procedural Fluency INTEGRATION Conceptual Understanding

* * The government wishes to continue to emphasise fluency, but this should not be understood to mean

“rote learning without understanding”.....conceptual understanding is clearly important and ..any emphasis on practice needs to be a part of achieving that understanding.

Stefano Pozzi Mathematics in School May 2013 p2

Many secondary teachers

Subject knowledge

The best teachers

Classroom practice Pedagogy

Many primary teachers OfSTED (2008) Understanding the Score http://www.ofsted.gov.uk/resources/mathematics-understanding-score

32 – 3 32 - 29

One to one principle – giving each item in a set a different counting word. Synchronising saying words and pointing.

Stable order principle - Keeping track of objects counted knowing that numbers stay in the same order.

Cardinal principle – recognising that the number associated with last object touched is the total number of object. The answer to ‘how many?’ Abstraction principle - recognising small numbers without counting them and counting things you cannot move or touch.

Order irrelevance principle - counting objects of different sizes and recognising that if a group of objects is rearranged then the number of them remains the same.

http://webarchive.nationalarchives.gov.uk/20110202093118/http:/national strategies.standards.dcsf.gov.uk/node/84889

0 10 20 30 40 50 60 70 80 90 100

1 11 21 31 41 51 61 71 81 91 2 12 22 32 42 52 62 72 82 92 3 13 23 33 43 53 63 73 83 93 4 14 24 34 44 54 64 74 84 94 5 15 25 35 45 55 65 75 85 95 6 16 26 36 46 56 66 76 86 96 7 17 27 37 47 57 67 77 87 97 8 18 28 38 48 58 68 78 88 98 9 19 29 39 49 59 69 79 89 99 10 20 30 40 50 60 70 80 90 100 http://www.teachfind.com/nati onal-strategies/mathematics itp-number-grid 0-99 or 1-100 Midge Pasternack http://www.atm.org.uk/journal/archi ve/mt182files/ATM-MT182-34 35.pdf

3 13 23 33 43 53 63 73 83 93 4 14 24 34 44 54 64 74 84 94 45 55 65 75 5 15 6 16 25 26 35 36 85 95 86 96 46 56 66 76 7 17 27 37 47 57 67 77 87 97 8 18 28 38 48 58 68 78 88 98 9 19 29 39 49 59 69 79 89 99

*  Counting one, two, three then any number name or other name to represent many      Number names not remembered in order Counting not co-ordinated with partition Count does not stop appropriately Counts an item more than once or not at all Does not recognise final number of count as how many objects there are  Counting the start number when ‘counting on’ rather than the intervals (jumps) when ‘counting on’ on a number line.

*  when counting on or back, include the given number in their counting rather than starting from the next or previous number or counting the ‘jumps’;  Difficulty counting from starting numbers other than zero and when counting backwards;  understand the patterns of the digits within a decade, e.g. 30, 31, 32, ..., 39 but struggle to recall the next multiple of 10 (similarly for 100s);  Know how to count on and count back but not understand which is more efficient for a given pair of numbers (e.g. 22-19 by counting on from 19 but 22-3 by counting back 3);   Not understanding how place value applies to counting in decimals e.g. 0.8, 0.9, 0.10, 0.11 rather than 0.8, 0.9, 1.0, 1.1; Counting upwards in negative numbers as -1, -2, 3 … rather than -3, -2, 1…

* Draw a grid big enough for digit cards Hundreds Tens Player Player 1 Units (ones) Player 2

* LO: To use knowledge of place value to order numbers up to 1000

Rules

• Shuffle the number cards place face down in a stack • Take turns to pick up a number card. You can place your number card on your own HTU line or on your partner’s HTU line.

• The aim is to make your own number as close as possible to the target – and to stop your partner making a number closer to the target.

• Take it in turns to go first.

* Largest number * Smallest number * Nearest to 500 * Nearest to a multiple of 10 * Nearest to a multiple of 5 * Nearest to a square number * Nearest any century * Lowest even number * Nearest odd number to 350 *

1,2...1,2,3..1,2,3,4,5 3,4,5 4,5 3,4,5 or 4,5 5 2+3 =5 so 3+3 =6 and 5-3=2

Carpenter and Moser (1983)

* * Tom had two sweets and John had three sweets how many did they have altogether?

* Tom had two sweets and bought three more. How many sweets does he have now?

* • Aggregation - combining of two or more quantities (How much/many altogether? What is the total?

Tom had two sweets and John had three sweets how many did they have altogether?

• Augmentation – where one quantity is increased by some amount (increase by) Tom had two sweets and bought two more. How many sweets does he have now

* • Partition/change/take away - Where a quantity is partitioned off in some way and subtraction is required to calculate how many or how much remains. (Take away, How many left? How many are/do not?) Tom had five sweets, John ate three sweets. How many sweets did Tom have left? • Comparison – a comparison is made between two quantities. (How any more? How many less/fewer? How much greater? How much smaller? Tom had 5 sweets, John had three sweets. How many more sweets did Tom have than John?

* *

Count out:

* * Ian Thompson (1997)

Teaching and Learning Early Number,

OUP

Count back from: Count back to:

Hold up 9 fingers ( 1, 2, 3, ...., 9 ( ) and fold down 4 ( 1, 2, 3, 4, 5 ).

1, 2, 3, 4 ). Count the remaining 5 fingers

Count back 4 numbers from 9: ‘8, 7, 6, 5’

Count up to:

Recall of known number facts

Use derived facts:

Count back from first number to second saying: ‘ 8, 7, 6, 5, 4 ’ and tallying the numbers said ( 1, 2, 3, 4, 5 )

Count on from 4 up to 9: ‘ 5, 6, 7, 8, 9’

to 10, 20 …, ways of making 100, 1000 e.g. 20 - 5 = 15 so 20 - 6 = 14

* • Repeated addition - ‘so many sets of’ or ‘so many lots of’ This is four lots of two this is written as 2 x 4 • Scaling structure – increasing a quantity by a scale factor (doubling, so many times bigger...so many times as much as). Tom has three times as many sweets as John.

John Tom

* • Equal sharing- (shared between, divided by) There are 8 sweets shared between four children. How many sweets do they get each?

• Equal grouping - I want to buy 8 sweets they come in packs of two . How many packs must I buy.

* * Commutative law - axb = bxa and a+b = b+a eg 3 x 4 = 4 x 3 55 + 45 = 45 + 55 * Associative law - (axb) x c = a x (bxc) eg 24 x 6 = (4x6) x 6 = 4x (6x6) (5 + 7) + 3 = 5 + (7 + 3) * Distributive law or partitioning (a+b) x c eg 12 x 7 = (10 x 7) + ( 2 x 7) and 84 ÷ 7 = (70 ÷ 7) + (14 ÷ 7)

http://dera.ioe.ac.uk/778/

* Using the digits 1- 9 arrange them in the 3 x 3 grid so that each row, column and diagonal adds up to the same amount.

* What would happen if you added two to each number - would the square still be magic? What could you tell you partner about the magic square now.

* What learning was going on? In pairs or small groups, consider the magic square activity in relation to Skemp’s theory of relational and instrumental understanding. *

* • • • • • • Based on constructivist learning theory and problem solving.

Learner actively constructs knowledge and skills rather than passively receiving knowledge from a teacher/text book or equivalent.

Learning is more effective when a student is actively engaged in the learning process Pupils retain knowledge and have deeper understanding if they discover it for themselves learning builds upon prior knowledge and understanding Pedagogical aims: Promote "deep" learning Promote meta-cognitive skills (develop problem-solving skills, creativity, independent learning , evaluation) Promote student engagement.

Developing higher order thinking Bloom's Taxonomy is a hierarchy of skills that reflects growing complexity and ability to use higher-order thinking skills (HOTS). Bloom, B.S. (Ed.) (1956) Taxonomy of educational objectives: The classification of educational goals: Handbook I, cognitive domain. New York ; Toronto: Longmans, Green.

How can we encourage higher order thinking skills?

* If children spend most of their time practising paper and pencil skills on worksheet exercises, they are likely to become faster at executing these skills.

* If they spend most of their time watching the teacher demonstrate methods for solving special kinds of problems, they are likely to become better at imitating these methods on similar problems.

* If they spend most of their time reflecting on how various ideas and procedures are the same or different, on how what they already know relates to the situations they encounter, they are likely to build new relationships. That is, they are likely to construct new understandings.

Hiebert ( 1993)

* Mathematical reasoning, even more so than children’s knowledge of arithmetic, is important for children’s later achievement in mathematics (Nunes et al 2009 p.3)

* “ If teachers consider that tasks involving mathematics thinking are suitable for ‘high attainers’ then the result may be that ‘low attainers’ are given a diet of routine and repetitive tasks on which they have already demonstrated their low attainment. But if all learners are treated as possessing the powers necessary to think mathematically, and if those powers are evoked, developed and refined, the so called ‘low attainers’ can transcend expectations (Mason and Johnston-Wilder (2006 . 41)

1 3 2 4

x 32 15 22 40 49 27

* Fit into the purple boxes: 2,3,4,5,6,7,8,9,10,11,12 * One number has to be used twice! Which one?

Why?

24 42

Shepway Teaching Schools Alliance, Unit 31a Folkestone Enterprise Centre, Shearway Road, Folkestone CT19 4RH

EYFS

* How many different patterns of dots can you make with five dots?

Year 1

* When you add two numbers, you can change the order of the numbers and the answer will be the same * You can make 4 different two digit numbers with the digits 2 and 3: 23, 32, 22, 33 * When you add 10 to a number the units digit stays the same.

Year 2

* When you subtract ten from a number, the units digit stays the same * You can add 9 to a number by adding 10 and subtracting 1 * All even numbers end in 0, 2, 4, 6, 8 * If you have 3 digits, and use each one exactly once in a three digit number, you can make 6 different three digit numbers

* ‘The subtle art of questioning is the art of teaching. In a real sense, learning to teach is learning to ask questions.’ Tanner and Jones (2000)

* Examples of open-ended questions that invite children to think include * What do you think…………?

* How do you know………….?

* Why do you think that………..?

* Do you have a reason………..?

* Is this always so……….?

* Is there another way/reason/idea…………..?

* What if………….? What if…….does not…..?

* Where is there another example of this…..?

* What do you think happens next?

* Instead of * Find the perimeter of a 3x8 rectangle * * You could ask * If the area of a rectangle is 24cm 2 what is the perimeter?

Improve these Questions A chew costs 3p and a lolly costs 7p. What do they cost together?

What is 6- 4?

Is 16 an even number?

What are 4 threes?

What is this shape called?

* * Sequencing a set of questions * Pitching appropriately * Distributing questions around the class * Prompting and probing * Listening and responding positively – inviting further questions * Challenging right as well as wrong and underdeveloped answers * Using written questions effectively.