T-Totals
Grid:
Shape:
Rotate:
0Β°
Custom grid:
Γ
Starts at:
Step:
Direction:
T-Number
20
T-Total
37
1 + 2 + 3 + 11 + 20 = 37
Getting Started
1
On a 9Γ9 grid, place the T-shape at different positions. Record the T-number and the T-total each time. What do you notice?
2
Can you find a formula connecting the T-total to the T-number?
Hint: if the T-number is n, express each cell in the T-shape in terms of n and the grid width.
3
Test your formula by predicting the T-total for a T-number you haven’t tried yet. Were you right?
Changing the Grid Size
4
Switch to a 7Γ7 grid and repeat your investigation. Does your formula still work? What changes?
5
Try the 8Γ8 and 10Γ10 grids. Can you find a general formula that works for any grid size
g?
Hint: the T-total = 5n β 7g for an upright T on a gΓg grid. Can you prove why?
Rotating the T-shape
6
Rotate the T-shape 90Β° clockwise. Investigate the relationship between T-number and T-total for this new orientation. How does the formula change?
7
Now try 180Β° (upside-down T) and 270Β°. Find formulas for each rotation.
8
Can you explain algebraically why each rotation gives a different formula? Express each cell’s offset from the T-number in terms of the grid width
g.Changing the Starting Number and Step
9
Change the starting number to 0. How does this affect your formulas? What about starting at 5?
10
Change the step to 2 (so the grid counts 1, 3, 5, 7β¦). How does your formula change? Try step = 3.
11
Can you find a master formula that includes the grid size
g, starting number s, and step d?Reversing the Grid
12
Switch the direction to β β so numbers count down. How does the T-total change for the same position? Can you explain why?
Different Shapes
13
Switch to the L-shape. Investigate the relationship between the anchor number and the L-total. Find a formula.
14
Try the + shape (plus/cross). This one is symmetric β does the formula simplify compared to T and L?
15
For the + shape, the centre number always equals the total divided by 5. Can you prove this algebraically?
Deeper Thinking
16
If the T-total is 200 on a 9Γ9 grid, what is the T-number? Can you work backwards from any T-total to find the T-number?
17
Two T-shapes on the same grid give totals of 37 and 167. Without looking at the grid, can you work out how far apart they are?
18
Design your own shape (perhaps an E, S, or Z). Define its cells relative to an anchor point and find its total formula. Share your shape with a partner.
T-Totals
What are T-Totals?
Place a T-shape on a number grid. The number at the bottom of the stem is the T-number. Add up all the numbers inside the T-shape β this is the T-total. Your task is to investigate the relationship between them.
How to Use
Click any cell on the grid to move the T-shape there. Use arrow keys to nudge it. Rotate the shape with the βΊ β» buttons. Record results to build a table and spot patterns. Change the grid size, shape, starting number, or step to explore further.