16 Mazy - Suffolk Maths

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Transcript 16 Mazy - Suffolk Maths

Mazy Task
Task 1
Task 2
Task 3
Task 4
Task 5
Task 6
Task 7
Task 8
Task 9
Task 10
NC Level 4 to 7
Mazy Task 1
This shape has one line
of symmetry and has no
rotational symmetry
Make other patterns
using by colouring 6 tiles
and see what
symmetrical patterns
you can make.
Home
Mazy Task 2
Can you rearrange
the 16 numbers so
that the total of the
four 4 digit
numbers is as close
to 9000 as possible
+
=
Home
1
2
3
4
1
2
3
4
1
2
3
4
1
2
3
4
4
9
3
6
Mazy Task 3
Spider can move right and
up or down
Spider safety
Geckos can move down and
left or right
Take it in turns and see who
can get to safety first
Gecko safety
Home
Mazy Task 4
Here is a block of squares
Find the length of
the red line that goes
from A to B
B
A
Home
100cm
Mazy Task 5
Here is a block of squares
The red line shows one
route from A to B
If you can only
move up and right A
then how many routes
are there from A to B
Home
B
Mazy Task 6
Here is a block of squares
The red line cuts the shape
into two congruent parts
(identical).
How many other ways can
you find to split the shape
into halves
Home
Mazy Task 7
Here is a block of 16 small
squares
There are other squares
hidden in this shape, such
as the green one shown.
How many squares can
You find?
How many rectangles?
Home
Mazy Task 8
Here is a block of 16
small squares
Can you rearrange the
16 numbers so that each
row, column and
diagonal add up to the
same number
Home
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
Mazy Task 9
This grid has a red perimeter
How many of the 16 squares have:
no red lines on their perimeter
1 red line on the perimeter
2 red lines on the perimeter?
What if the grid were 10 by 10 rather than 4 by 4?
Home
Mazy Task 10
Here is a block of squares
Find the length of the red
line that goes from A to B
B
What other lengths can be
made when travelling from A
to B and only turning at
crossing points?
A
Home
100cm