1. Year 2 Mathematics

2. Maths
Maths is magic!
Unfortunate because with Maths iit is usually like sprouts at xmas you either hate it or love it! We want our children to love it! You will be glad to know there are only a few slides for me!
Step1: Think of a number below 10.
Step2: Double the number you have thought.
Step3: Add 6 with the getting result.
Step4: Half the answer, that is divide it by 2.
Step5: Take away the number you have thought from the answer, that is, subtract the answer from the number you have thought. Answer: 3
Numicon-who has a 2 shape, who has an odd number, who has 1 more than 6, who 6 subtract 2, who has a multiple of 2. model the difference-number pairs, multiplaction, place value

3. The Knowledge Led Curriculum
3 Forms of Knowledge:
I know that …
I know how…
I know why …
The
Yearly
Programmes Of
Study
- Factual
- Procedural
- Conceptual

4. National Curriculum Structure
Fluency
Reason
Mathematically
Solve
Problems
Programmes of Study for Each Year Group
Number
Place
Value
+ / -
X / ÷
FDP
Measurement
Geometry
Properties of Shape
Position & Direction
Statistics (Y2 – Y6)
Fractions, decimals, percentages

5. Expectations of Mathematics in the National Curriculum
Close the gap and raise attainment
Providing access to mathematical concepts for all children
Pupils should make connections in mathematics
Use representations to support learning
Deep rather than superficial learning
Calculating with confidence
More and longer time on fewer topics

6. Problem Solving

7. Deep Over Superficial…

8. Using and Applying So broaden rather than lengthen
Apply maths skills to problem solving
Cover all areas of problem solving:
Word problems
Logic problems
Finding all possibilities
Visual problems
Rules and Patterns

9. word

11. Long Term Plan townlaneinfantschool.eschools.co.uk

12. NCETM https://www.ncetm.org.uk/ Free to sign up
Responsible for running the day-to-day mathematics curriculum for the government
Examples of questions to meet each maths N.C objective
Progression maps for all maths topics
Progression maps for reasoning skills

14. Fluency

15. Curriculum Balance Procedural Conceptual Efficiency Understanding
- make links
- reason
- depth & breadth
- fluency
- representations
- procedures
- fluency
- not ‘getting lost’
- accuracy
- select & check

16. Mental Mathematics Targets

17. Number Bonds
By the end of Year One, children should be recalling all number bonds to 20.
In Year Two, the children should be using these facts to derive related facts to 100.

18. + 1 2 3 4 5 6 7 8 9 10 Y1 facts Y2 facts Adding 1 and 2 Bonds to 10
Bridging/
compensating
Y1 facts Y2
facts
Doubles
Adding 0
Near doubles + 1 2 3 4 5 6 7 8 9 10
0 + 0
0 + 1
0 + 2
0 + 3
0 + 4
0 + 5
0 + 6
0 + 7
0 + 8
0 + 9
0 + 10
1 + 0
1 + 1
1 + 2
1 + 3
1 + 4
1 + 5
1 + 6
1 + 7
1 + 8
1 + 9
1 + 10
2 + 0
2 + 1
2 + 2
2 + 3
2 + 4
2 + 5
2 + 6
2 + 7
2 + 8
2 + 9
2 + 10
3 + 0
3 + 1
3 + 2
3 + 3
3 + 4
3 + 5
3 + 6
3 + 7
3 + 8
3 + 9
3 + 10
4 + 0
4 + 1
4 + 2
4 + 3
4 + 4
4 + 5
4 + 6
4 + 7
4 + 8
4 + 9
4 + 10
5 + 0
5 + 1
5 + 2
5 + 3
5 + 4
5 + 5
5 + 6
5 + 7
5 + 8
5 + 9
5 + 10
6 + 0
6 + 1
6 + 2
6 + 3
6 + 4
6 + 5
6 + 6
6 + 7
6 + 8
6 + 9
6 + 10
7 + 0
7 + 1
7 + 2
7 + 3
7 + 4
7 + 5
7 + 6
7 + 7
7 + 8
7 + 9
7 + 10
8 + 0
8 + 1
8 + 2
8 + 3
8 + 4
8 + 5
8 + 6
8 + 7
8 + 8
8 + 9
8 + 10
9 + 0
9 + 1
9 + 2
9 + 3
9 + 4
9 + 5
9 + 6
9 + 7
9 + 8
9 + 9
9 + 10
10 + 0
10 + 1
10 + 2
10 + 3
10 + 4
10 + 5
10 + 6
10 + 7
10 + 8
10 + 9
Music-number fun

19. Times Tables x 2 3 4 5 6 7 8 9 10 11 12 14 16 18 20 22 24 15 21 27 30 33 36 28 32 40 44 48 25 35 45 50 55 60 42 54 66 72 49 56 63 70 77 84 64 80 88 96 81 90 99
108
100
110
120
121
132
144
Year Two
Year Three
Year Four
Year Two
30 facts
2, 5 and 10 times tables

20. Nrich Investigation/Reasoning
Pupil One puts in a secret number into the calculator and asks pupil Two, "What do you want to multiply it by?" Pupil Two replies, "Multiply it by 5  ." Pupil One puts in 'times' and '5  ' and hands the calculator to Pupil Two. When Pupil Two presses the 'equals' button the calculator shows '35’.

21. NCETM/Topmarks

22. Resources Websites Topmarks.co.uk NCETM Nrich BBC Documents
National Curriculum

23. Solve addition and subtraction problems
30+20 = 50
4 + 3 = 7
= 57
= 50
= 7
= 57
100 40 5 7 60
300 =
In order to order chldren need to understand the value of numbers-we do lots of work on place value usng practical equipment such as arrow cards and dienes equipment to partition a number. Once children understand how to partition numbers we can then move onto using an empty number lne to support mental calculations of addition and subtraction.
Why? What does the column method teach them??????????????????

24. Assessment
Interim teacher assessment frameworks at the end of key stage 1
Key principles:
The interim framework does not include full coverage of the content of the national curriculum and focuses on key aspects for assessment. Pupils achieving the different standards within this interim framework will be able to demonstrate a broader range of skills than those being assessed.
Teachers must base their teacher assessment judgement on a broad range of evidence from across the curriculum for each pupil.
The evidence used must include the key stage 1 mathematics test, which does not focus solely on the key aspects listed in this interim framework.

25. Working towards the expected standard
The pupil can demonstrate an understanding of place value, though may still need to use apparatus to support them (e.g. by stating the difference in the tens and ones between 2 numbers i.e. 77 and 33 has a difference of 40 for the tens and a difference of 4 for the ones; by writing number statements such as 35 < 53 and 42 > 36).
The pupil can count in twos, fives and tens from 0 and use counting strategies to solve problems (e.g. count the number of chairs in a diagram when the chairs are organised in 7 rows of 5 by counting in fives).
The pupil can read and write numbers correctly in numerals up to 100 (e.g. can write the numbers 14 and 41 correctly).
The pupil can use number bonds and related subtraction facts within 20 (e.g. 18 = 9 + ?; 15 = 6 + ?).
The pupil can add and subtract a two-digit number and ones and a two-digit number and tens where no regrouping is required (e.g ; ), they can demonstrate their method using concrete apparatus or pictorial representations.
The pupil can recall doubles and halves to 20 (e.g. pupil knows that double 2 is 4, double 5 is 10 and half of 18 is 9).
The pupil can recognise and name triangles, rectangles, squares, circles, cuboids, cubes, pyramids and spheres from a group of shapes or from pictures of the shapes.

26. Working at the expected standard
The pupil can partition two-digit numbers into different combinations of tens and ones. This may include using apparatus (e.g. 23 is the same as 2 tens and 3 ones which is the same as 1 ten and 13 ones).
The pupil can add 2 two-digit numbers within 100 (e.g ) and can demonstrate their method using concrete apparatus or pictorial representations.
The pupil can use estimation to check that their answers to a calculation are reasonable (e.g. knowing that will be less than 100).
The pupil can subtract mentally a two-digit number from another two-digit number when there is no regrouping required (e.g. 74 − 33).
The pupil can recognise the inverse relationships between addition and subtraction and use this to check calculations and work out missing number problems (e.g. Δ − 14 = 28).
The pupil can recall and use multiplication and division facts for the 2, 5 and 10 multiplication tables to solve simple problems, demonstrating an understanding of commutativity as necessary (e.g. knowing they can make 7 groups of 5 from 35 blocks and writing 35 ÷ 5 = 7; sharing 40 cherries between 10 people and writing 40 ÷ 10 = 4; stating the total value of six 5p coins).
The pupil can identify 1/3 , 1/4 , 1/2 , 2/4 , 3/4 and knows that all parts must be equal parts of the whole.
The pupil can use different coins to make the same amount (e.g. pupil uses coins to make 50p in different ways; pupil can work out how many £2 coins are needed to exchange for a £20 note).
• The pupil can read scales in divisions of ones, twos, fives and tens in a practical situation where all numbers on the scale are given (e.g. pupil reads the temperature on a thermometer or measures capacities using a measuring jug).
• The pupil can read the time on the clock to the nearest 15 minutes.
• The pupil can describe properties of 2-D and 3-D shapes (e.g. the pupil describes a triangle: it has 3 sides, 3 vertices and 1 line of symmetry; the pupil describes a pyramid: it has 8 edges, 5 faces, 4 of which are triangles and one is a square).

27. Working at greater depth within the expected standard
The pupil can reason about addition (e.g. pupil can reason that the sum of 3 odd numbers will always be odd).
The pupil can use multiplication facts to make deductions outside known multiplication facts (e.g. a pupil knows that multiples of 5 have one digit of 0 or 5 and uses this to reason that 18 × 5 cannot be 92 as it is not a multiple of 5).
The pupil can work out mental calculations where regrouping is required (e.g. 52 − 27; 91 – 73).
The pupil can solve more complex missing number problems (e.g – 3 = 17; 14 + Δ = ).
The pupil can determine remainders given known facts (e.g. given 15 ÷ 5 = 3 and has a remainder of 0, pupil recognises that 16 ÷ 5 will have a remainder of 1; knowing that 2 × 7 = 14 and 2 × 8 = 16, pupil explains that making pairs of socks from 15 identical socks will give 7 pairs and one sock will be left).
The pupil can solve word problems that involve more than one step (e.g. which has the most biscuits, 4 packets of biscuits with 5 in each packet or 3 packets of biscuits with 10 in each packet?).
The pupil can recognise the relationships between addition and subtraction and can rewrite addition statements as simplified multiplication statements (e.g = 3 × × 5 = 4 × 10).
The pupil can find and compare fractions of amounts (e.g. 14 of £20 = £5 and 12 of £8 = £4 so 14 of £20 is greater than 12 of £8).
The pupil can read the time on the clock to the nearest 5 minutes.
The pupil can read scales in divisions of ones, twos, fives and tens in a practical situation where not all numbers on the scale are given.
The pupil can describe similarities and differences of shape properties (e.g. finds 2 different 2-D shapes that only have one line of symmetry; that a cube and a cuboid have the same number of edges, faces and vertices but can describe what is different about them).

28. KS1 Mathematics 2016
2016 tests will be made of 2 components
1. Fluency in calculation
2. Application & reasoning
Test will reflect each of the domains within the PoS
A new test and mark scheme will be developed each year.
Marked internally by teachers.
Both papers will be timed and contain a ‘grid’ on which to show workings (reflecting a square maths book).

29. Paper 1 – Arithmetic Paper
The guidance time for this test is 20 mins.
Questions are context free.
Focus is speed and accuracy – ‘recall and use known facts’, encourages pupils to use efficient calculation strategies.
NO apparatus can be used to support pupils to access questions.
Marks will not be awarded for working out. Every question is worth one mark.

33. Paper 2 - Application and Reasoning
The guidance time for this test is 35 minutes.
There are 5 aural questions and after these there should be approximately 30 minutes.
Reflects current KS1 test question ‘style’ with raised expectations in line with current National Curriculum.
This paper will contain ‘working mark’ questions – 1 mark for appropriate working but incorrect answer.
The test will contain a mixture of contextualised and context-free questions, and real life and abstract problems. Language will be appropriate to key stage 1 and questions can be read to the children; word length will be kept to a minimum for accessibility reasons.
The only apparatus that can be used to support the children are spelling aids.

34. KS1 Mathematics 2016

35. Paper Two – Range of methods

36. “If you want to take part in tomorrow’s world, you’ll need mathematics and statistics just as much as grammar and syntax”
Professor Robert Worcester, Chairman, Market Opinion Research International
I like to have the last word!