1. Thinking is at the heart of mathematics and therefore should be at the heart of mathematical teaching and learning.

2. Maths at Ss Alban & Stephen= + x %
subtract
more
add
sum
factor
product
Here is a receipt for some shopping. How much did I spend? How much change did I get from £20?

3. The New Maths Curriculum
Children should:
Become fluent in the fundamentals of mathematics, including through varied and frequent practice with increasingly complex problems over time, so that pupils develop conceptual understanding and the ability to recall and apply knowledge rapidly and accurately.
Reason mathematically by following a line of enquiry, conjecturing relationships and generalisations and developing an argument, justification or proof using mathematical language.
Solve problems by applying their mathematics to a variety of problems with increasing sophistication, including breaking down problems into a series of simpler steps and persevering in seeking solutions.

5. Number Sense!
Children need to understand our number system, starting with counting numbers, building an understanding of how our numbers work and fit together. This includes exploring place value and comparing and ordering numbers then applying this understanding in different contexts.

6. Recalling facts
It is important that children recognise number bonds, different pairs of numbers with the same total.
6 + 2
3 + 2 5 8
7 + 3
5 + 3 10
1 + 4
6 + 4
6 + 1 7
6 + 3
3 + 4 9 6
5 + 4
3 + 3

7. Place Value
Place value is at the heart of the number system. All digits have a value and a secure understanding of this will enable children to use and understand different calculation methods.

8. Keep Counting! Backwards and forwards in 10s, 100s, 1000s.
Counting in decimals.
Counting in fractions.
Counting into negatives.

9. Word problem using counting on and number bonds You have 1 minute to answer these questions.
Kate needed 120 marbles but she only had 45, how many more does she need? (partitioning)
John started with 99 lemons and he has eaten 1 each day for the last 32 days, how many does he have left? (compensating)
Peter had £31 and David had £25. They were saving up to buy a remote control car, that cost £75. How much more do they need? (Known number facts)
A bag of potatoes weighs 62kg and a bag of onions weighs 38kg. What is their total weight? (Number bonds)
The bus is taking 48 children home. At the first stop, 13 children get off. How many are left? (partitioning)
One ribbon is 56 cm long, another 67 cm of ribbon is needed . How much ribbon is needed altogether? (partitioning)

10. Multiply and dividing talking about strategies
402 x 6 (Partitioning)
8 x 19 (compensating)
248 / 4 (halve then halve again)
186 / 6 (Known multiplication facts)
3600 / 9 (known facts)
Rob scores 3 points out of every 5 possible points. Ben scores 55 out of 100. Who has the biggest score, out of 100?

11. What’s in the box?
Four numbers in little boxes are put into a special big box that does a multiplication, then four new numbers come out at the end:
We only used whole numbers to go in, so, what multiplication might have gone on in the big box to get the answers in the picture above?
What was the largest number that could have been used to multiply by, in that big box? 3 6 9 21

12. We only used whole numbers to go in, so, what multiplication might have gone on in the big box to get the answers in the picture above?
What was the largest number that could have been used to multiply by, in that big box?

13. Imagine four new boxes now (with new numbers in) and the large box multiplying by a different number this time. The numbers that come out are these:
What would be the number that the big box is multiplying by?
How are you working these out?

14. Fractions and decimals
Player 1 chooses 2 numbers to make into a fraction. Using a calculator divide these 2 numbers to convert to a decimal. Place them in roughly the right place along the line then cross off the 2 numbers used. Now player 2 chooses 2 other numbers. The winner is the first person to get 3 fractions/decimals in a row without the other player stopping them.

15. Thinking is at the heart of mathematics and therefore should be at the heart of mathematical teaching and learning.

16. Partitioning 72 x 8 70 x 8 = 560 2 x 8 = 16 560 + 16 = 576 757 – 432
= 700
= 50
= 7
= 757
757 – 432
700 – 400 = 300
= 20
= 5
= 325
72 x 8
70 x 8 = 560
2 x 8 = 16
= 576

17. Compensating For example: 654 +296
Round 296 up to the nearest 100: 296 → 300
= 954
Take away the extra 4 ( = 4)
= 950

18. Column methods
Children with a secure understanding of place value will better understand the column method for addition and subtraction.
Understanding place value will help children see the relationship between the columns.