Wetland Pattern Detectives
Your maths helper β stuck? Scroll to the "Remember" cards. Ready? Pick your sheet.
Remember 1 β The = sign means BALANCE π¦
Same picture as on the board β the pΕ«keko seesaw.
Big idea: = does NOT mean "the answer is coming". It means both sides weigh the same β like two pΕ«keko on a seesaw.
Try it: 8 + 4 = β + 5. The left makes 12, so the right MUST also make 12. β + 5 = 12, so β = 7. (It's NOT 12 β that would tip the seesaw!)
Remember 2 β Patterns have a STEP rule and a SHORTCUT rule πΏ
Same picture as on the board β the growing harakeke.
Big idea: The step rule tells you what changes each time. The shortcut rule lets you jump straight to Year 10 without drawing.
- Step rule: +2 leaves each year.
- Shortcut rule: leaves = year Γ 2 + 1. Test on Year 3: 3 Γ 2 + 1 = 7 β
- Jump to Year 10: 10 Γ 2 + 1 = 21 leaves. No drawing!
Detective check: always TEST your shortcut on a year you know before trusting it.
Remember 3 β Function machines have a SECRET RULE π§
Same picture as on the board β the wetland filter.
Big idea: Something goes IN, the machine's secret rule changes it, something comes OUT. Your job: crack the rule.
- Ask: "How do I get from IN to OUT?" Try + or Γ first.
- Check your rule on EVERY clue β a rule that only fits once isn't the rule.
- Some machines do TWO things, like Γ 2 then + 1.
Running it backwards: if OUT is 12 and the rule is + 4, do the opposite: 12 β 4 = 8 went IN.
Remember 4 β Missing numbers: do the OPPOSITE to undo π
Same picture as on the board β the eel that grew over summer.
Big idea: Every operation has an opposite that undoes it. + undoes β, β undoes +, Γ undoes Γ·, Γ· undoes Γ.
Worked example: 35 + β = 52. Undo + with β: 52 β 35 = 17 cm. Check: 35 + 17 = 52 β
Another: 3 Γ β = 15. Undo Γ with Γ·: 15 Γ· 3 = 5. Check: 3 Γ 5 = 15 β
Always CHECK: put your answer back in the box. If both sides balance, you've cracked it.
Remember 5 β Meet n, the number we don't know π³
Same picture as on the board β the kahikatea (NZ's tallest tree).
Big idea: Mathematicians got tired of drawing boxes. They use the letter n instead. Same maths, fancier costume.
Try it: if n = 5, leaves = 5 Γ 2 + 1 = 11. If n = 100, leaves = 100 Γ 2 + 1 = 201.
Solving with n: n + 5 = 14. Undo the + 5: 14 β 5 = 9. So n = 9.
π’ Sheet 1 β Detective in Training
Everyone starts here. Show your working in your book.
A. Balance it (Remember card 1)
- 5 + 3 = β
- 6 + 4 = β + 2
- 9 + 1 = β + 5
- 7 + 7 = β + 4
B. Continue the patterns (Remember card 2)
- RaupΕ reeds: 2, 4, 6, 8, β, β What is the step rule?
- PΕ«keko chicks: 3, 6, 9, 12, β, β What is the step rule?
- Eel lengths in cm: 10, 15, 20, 25, β, β
- Draw the next harakeke: Year 1 has 3 leaves, Year 2 has 5, Year 3 has 7. Draw Year 4. How many leaves?
C. Crack the machines (Remember card 3)
- Machine rule is + 3. Complete:
IN 2 5 10 20 OUT 5 β β β - Crack the secret rule:
The rule is: ________IN 1 4 7 10 OUT 6 9 12 15
D. Missing number mysteries (Remember card 4)
- 10 pΕ«keko at the wetland. Some fly away. 6 are left. 10 β β = 6
- A baby eel is 12 cm. It grows to 20 cm. 12 + β = 20
- β + 5 = 14
- β β 4 = 9 (careful β undo the take-away!)
Finished? Tap β Check answers, fix any mistakes, then head up to Sheet 2! π‘
π‘ Sheet 2 β Pattern Detective
For detectives who finished Sheet 1. Two-step thinking starts here.
A. Trickier balance
- 15 β 5 = β + 4
- 12 + 8 = β + 13
- 3 Γ 4 = β + 2
- 18 β β = 6 + 5 (work out the right side first)
B. The shortcut rule
A kahikatea seedling pattern: Year 1 = 4 branches, Year 2 = 7, Year 3 = 10.
- Copy and complete:
Year 1 2 3 4 5 10 Branches 4 7 10 β β β - What is the step rule?
- What is the shortcut rule? (year Γ ? + ?) Test it on Year 3!
- How many branches in Year 20?
C. Two-step machines β and backwards!
- Crack this two-step rule:
The rule is: ________IN 2 3 5 10 OUT 5 7 11 21 - Same machine: what comes OUT if 8 goes IN?
- Same machine running backwards: 15 came OUT. What went IN? (undo the steps in reverse order)
- Machine rule is Γ· 2. 18 went IN β what comes OUT? 7 came OUT β what went IN?
D. Missing numbers with Γ and Γ·
- Four matuku nests each hold the same number of eggs β 20 eggs altogether. 4 Γ β = 20
- β Γ 5 = 45
- 30 Γ· β = 6
- A tuna swims the same distance every day. After 6 days it has swum 42 km. How far each day? Write it as a missing number sentence first.
Done? Tap β Check answers, learn from any slip-ups, then the red sheet awaits, detective... π΄
π΄ Sheet 3 β Master Detective: Meet n
Advanced challenge. Mathematicians got tired of drawing boxes β they write n instead. n just means "the number we don't know yet". So β + 5 = 14 becomes n + 5 = 14. Same puzzle, fancier costume.
A. Solve for n (undo it, then CHECK)
- n + 9 = 23
- n β 7 = 15
- 4 Γ n = 36
- n Γ· 3 = 8
- 2 Γ n + 1 = 17 (two steps β undo the +1 first)
B. Write the rule with n
- The harakeke rule was "leaves = year Γ 2 + 1". If the year is n, write the rule using n.
- A machine's rule is "Γ 3 then β 2". If n goes IN, what comes OUT? (write it with n)
- Use your rule from question 2: what comes OUT when n = 10? When n = 100?
- Same machine: 28 came OUT. Write the puzzle with n, then solve it.
C. Reasoning like a mathematician
- The harakeke pattern goes 3, 5, 7, 9, ... Could a plant in this pattern EVER have exactly 50 leaves? Explain how you know without listing every number.
- Balance puzzle β both boxes hide the SAME number: β + β + 4 = β + 10
- Wetland maths: NZ once had about 2,500,000 hectares of wetland. Only 10% is left. How many hectares is that? How many hectares were lost?
D. Design your own (the real test of a master)
- Invent a two-step machine rule. Make an IN/OUT table with 4 clues and ONE missing OUT. Swap with a partner β can they crack it?
- Invent a wetland growing pattern (a plant or animal population). Give the first 3 terms and challenge your partner to find the shortcut rule and term number 10.
Done? Tap β Check answers β you've cracked the case, Master Detective! π΅οΈ