Arrow antics
These are level 3 number, algebra, and geometry problems from the Figure It Out series. They are focused on exploring patterns in mutliples of 7, 8, 9 multiplication facts, identifying parallelograms and trapeziums in geometric shapes, and exploring the idea of equality in diagrams of scale balances. A PDF of the student activity is included.
About this resource
Figure It Out is a series of 80 books published between 1999 and 2009 to support teaching and learning in New Zealand classrooms.
This resource provides the teachers' notes and answers for one activity from the Figure It Out series. A printable PDF of the student activity can be downloaded from the materials that come with this resource.
Specific learning outcomes:
- Explore patterns in mutliples of 7, 8, 9 multiplication facts (Problem 2).
- Identify parallelograms and trapeziums in geometric shapes (Problem 3).
- Explore the idea of equality in diagrams of scale balances (Problem 4).
Arrow antics
Achievement objectives
GM3-3: Classify plane shapes and prisms by their spatial features.
NA3-1: Use a range of additive and simple multiplicative strategies with whole numbers, fractions, decimals, and percentages.
NA3-6: Record and interpret additive and simple multiplicative strategies, using words, diagrams, and symbols, with an understanding of equality.
Required materials
- Figure It Out, Level 3, Problem Solving, "Arrow antics", page 14
See Materials that come with this resource to download:
- Arrow antics activity (.pdf)
Activity
This problem can be likened to switches being open or closed. The early evelopment of computers involved binary reasoning. Binary in this case means that only two possibilities exist: an arrow can be either up or down.
If binary numbers were used, 1 for up and 0 for down, the problem would look like this:
This representation may make the problem easier for students who get confused with all the arrows. Another method is to put the arrows onto cards so that they can be moved. Here is one way of solving the problem:
Students should be able to apply similar logic to find out how many adjacent arrow turns are needed to change
into
The digital sums of multiples produce fascinating patterns.
In the case of multiples of nine, the pattern is:
Multiples of 9 |
9 |
18 |
27 |
36 |
45 |
54 |
63 |
72 |
81 |
90 |
99 |
108 |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
Digital sum |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
19→9 |
9 |
Ask students to explain why the digit sum for the first 10 multiples of nine is 9. They may notice that, because 9 is one less than 10, each addition of 9 (obviously up to 90) results in the tens digit increasing by one but also the ones digit decreasing by one.
With multiples of eight, we would expect that the ones digit will decrease by two and the tens digit will increase by one with each addition of eight. The digital sum should therefore decrease by one with each successive multiple.
Multiples of 9 |
9 |
18 |
27 |
36 |
45 |
54 |
63 |
72 |
81 |
90 |
99 |
108 |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
Digital sum |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
9 |
19→9 |
9 |
The principle of digits increasing and decreasing is based on the idea of clock arithmetic.
In special cases like 48, the rule appears to break down. After 40 (8 x 5), increasing the tens digit by one would give 5_ (50 something). Decreasing the ones digit by two on the clock would result in eight. To compensate for the minus two, we get 50 – 2 = 48.
Similarly, with multiples of seven, the tens digit increases by one and the ones digit decreases by three. With the 21 → 28 transition, 21 → 31 (tens digit up by one) minus three gives 28.
Multiples of 7 |
7 |
14 |
21 |
28 |
35 |
42 |
49 |
56 |
63 |
70 |
… |
|---|---|---|---|---|---|---|---|---|---|---|---|
Digital sum |
7 |
5 |
3 |
10→1 |
8 |
6 |
13→4 |
11→2 |
9 |
7 |
… |
Students will need to know what parallelograms and trapezia are. A parallelogram is a four-sided polygon with two pairs of parallel sides. The shapes below are all parallelograms.
A trapezium is a four-sided polygon with only one pair of parallel sides. The shapes below are all trapezia.
Students will need to use a systematic approach to find all the parallelograms and trapezia in the figure. They will find three sizes of parallelograms:
There are only two sizes of trapezia.
To work out the number of
each corner triangle can be dealt with separately.
Two trapezia of this size are made using each corner triangle. This gives 6 x 2 = 12 in total.
Within the hexagon formed by the six internal triangles, there are six further trapezia of that size.
So there are 12 + 6 = 18 trapezia of the size
Considering that two corner triangles each time must be used to make a large trapezium, there are six possibilities:
This gives a total of 18 + 6 = 24 trapezia.
A slow but thorough strategy is to label each triangle in the star and use the labels to name each shape as it is found.
A strategy for finding all the parallelograms is to start with all the parallelograms that involve triangle a, then b, and so on.
ag aghi aglk aghijdkl
bh bhij bhgl bhijkelg
ci cijk cihg cijkhglf
dj djkl djih
ek eklg ekji
fl flgh flkj
gh gl hi ij jk kl
There is a spotty bag on each side of the right-hand balance, so these could both be removed and the balance would be retained. Therefore one pink bag weighs the same as two blue bags.
Looking at the left-hand balance, if each pink bag were replaced with two blue bags, the balance would remain. This would mean that six blue bags weigh the same as two spotty bags. One spotty bag is therefore balanced by three blue bags.
Algebraically, the scales pictures could be represented as the equations 3p = 2s and s + p = 2b + s, where p is the mass of a pink bag, s the mass of a spotty bag, and b the mass of a blue bag. We can remove a spotty bag from each side of the right-hand balance, so now we have:
3p = 2s and p = 2b
which can be simplified as 3 x 2b = 2s
6b = 2s
3b = s.
1.
3
2.
a. In each case, the digits total 9.
b. The pattern is decreasing by 1. (When the single-digit number gets to 1, the next
number is 9 and the pattern continues.)
c. The pattern is groups of 4 odd or even digital sums decreasing by 2:
Multiples of 7 |
7 |
14 |
21 |
28 |
35 |
42 |
49 |
56 |
63 |
70 |
… |
|---|---|---|---|---|---|---|---|---|---|---|---|
Digital sum |
7 |
5 |
3 |
10→1 |
8 |
6 |
13→4 |
11→2 |
9 |
7 |
… |
3.
a. 27
b. 24
4.
3
The quality of the images on this page may vary depending on the device you are using.