1. Pentominoes What is a pentomino? Well – you know what a domino is 2 squares joined exactly edge to edge

2. Triominoes Both have line symmetry, only 1 has rotational symmetry

3. 4 Squares - Tetrominoes 3 have line symmetry 3 have rotational symmetry

4. Pentominoes ‘pent’ means..... 5 as in pentagon and pentagram It’s Greek, by the way

5. Pentominoes Now pentominoes are how many squares joined exactly edge to edge? 5

6. How many different pentominoes are there?

7. How many different pentominoes are there? Different – meaning not the same one another way round Back to dominoes is the same as ‘do’ is Greek for 2

8. Pentominoes be systematic to get them all 12

9. Pentominoes – the task Choose a pentomino. Now using only the numbers 1-5 any way you want to, add up pairs of adjacent numbers and total

10. Now using only the numbers 1-5 any way you want to, add up pairs of adjacent numbers and total 25 What’s the biggest total you can make? + = 6 + = 7 + = 5 + = 7

11. Pentominoes What’s the biggest total we can make? What’s the smallest total?

12. Now choose one of your shapes... and I want you to fill each square with one of the numbers 1-5

13. What’s the biggest total you can make? What’s the smallest total? Hint – choose your shape wisely

14. Maximum totals Why? Which shape do you think will give the biggest total?

15. Minimum totals Why? Which shape do you think will give the smallest total?

16. Pentominoes Next task How about multiplying pairs of adjacent numbers and making a total? 1 x 5 = 5 x 2 = 2 x 3 = 3 x 4 = Total 5 14 6 12 37 Where is the mistake?

17. Maximum totals for multiplying Why? Which shape do you think will give the biggest total?

18. Minimum totals for multiplying Why? Which shape do you think will give the smallest total?

19. How many pentominoes have line symmetry? 6

20. How many pentominoes have rotational symmetry? Rotational symmetry 2 Rotational symmetry 2 Rotational symmetry 4 3

22. Hexominoes

24. Symmetry 10 have mirror symmetry (Red, Green, Purple) 7 have rotational symmetry (Blue and Purple)

25. Hexominoes How many of them can be folded to make cubes? First group to identify them all wins...

26. Cube Nets 11 – might use one of these later....

27. 7 Squares - Heptominoes – 108!

28. 8 Squares - Octanominoe – 369!

29. Poly - nominoes Number of squaresNumber of combinations? How long will it take to count to these numbers? 11 21 32 45 512 635 7108 8369 91285 104665

30. How long would it take to count to a million?

31. What do you want to do tomorrow? Do an activity involving going outside for some of the time? Make 3D Shapes Carry on investigating what we started today Investigating Patterns – Magic Squares, Magic triangles Something not on this list...