Fact Families — Keeper Kits

Progression 2 (Years 3–4) Number | Building multiplication/division fact families to strengthen basic facts.

Duration: 60 mins Strand: Number Context: Keeper supply kits; small-group arrays Representations: Triangle cards, arrays, bar models

Learning Intentions & Success Criteria

Te Mātaiaho: use place value to operate with whole numbers; connect ×/÷ NZC L2–3: basic multiplication/division facts (2–10) Key idea: facts live in families

Ākonga are learning to:

Create fact families from a context or array.
Use inverse relationships to solve division.
Fluently recall 2, 5, 10, then 3, 4 facts.

Success looks like:

I can write 4 facts from one array (2 × 5 = 10; 5 × 2 = 10; 10 ÷ 2 = 5; 10 ÷ 5 = 2).
I can use a multiplication fact to solve a division quickly.

Teacher prompts

“What are the four facts in this family?”
“Which fact helps you solve the division?”
“Show the array that matches.”

Kupu / Vocabulary

inverse / tauaro
factor / tauwehe
product / hua
quotient / hua whakawehe
divide / whakawehe
family / whānau

Materials

Triangle fact cards; array tiles; bar models.
Context cards (kit items packed in equal groups).
A5 Handout: Progression 2 core (facts) or generator “Multiplication/Division facts.”

Lesson Flow

Hook (5 mins)

Keeper kits: 4 kits with 5 torches; how many torches? Build fact family.

Teach/Model (12 mins)

Build array, write two × facts and two ÷ facts; highlight inverse.
Do the same with 3×4; show bar model for division.

Guided Practice (15 mins)

Station A: Array to fact family (2, 5, 10 then 3, 4, 12).
Station B: Triangle cards—fill missing numbers.
Station C: Context cards—write and solve fact family equations.

Independent/Extension (10–12 mins)

Create 2 fact families of your own; include a division fact first.
Extension: mix 6, 7, 8 facts; use doubling/halving strategies.
Support: stick to 2, 5, 10; visual arrays provided.

Exit Check (5 mins)

Fact family for 3×5; write all four equations.

Place-based options

Zealandia/Tiritiri equipment kits; Hamilton Zoo keeper bags; Otago Peninsula trap sets.

Emphasize inverse thinking: every division fact is “undoing” a multiplication. Keep arrays visible.

Differentiation & Support

Scaffolds

Focus on 2, 5, 10 families first.
Use triangle cards with one number missing.
Keep arrays visible while writing facts.

Extensions

Introduce 6, 7, 8 facts with doubling/halving.
Create a fact family riddle for peers.
Connect to division with remainders (conceptually only).

Common Misconceptions

Swapping divisor and dividend. Remedy: label “total” and “groups”.
Writing only the multiplication facts. Remedy: require both division facts.
Confusing factor with product. Remedy: point to array dimensions.

Assessment & Evidence

Exit fact family correctness; fluency with 2,5,10 and intro 3,4.
Note if students reverse divisor/dividend; adjust support.

Whānau Connection

Send home a fact-family card set for quick practice.
Invite whānau to share a grouping task (packs of 5, 10).

Handout Link

Use Progression 2 core handout (facts) or generator “Multiplication/Division facts (2–10),” 24–28 items.

Back to Number Sense Journey (Progression 2)

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📋 Kaiako Planning Snapshot

Teacher planning support for this resource — learning intentions, success criteria, and inclusive practice guidance are summarised below.

Inclusion Guidance

ESOL / ELL learners: Pre-teach key vocabulary (numeracy, number, fact) using visual word walls or bilingual glossaries before the lesson. Reduce language load with diagrams and visual models. Partner-share and think-pair-share strategies encouraged.
Neurodiverse learners / ADHD: Break the lesson into clear segments with visual checkpoints. UDL principle: offer ākonga a choice in how they demonstrate understanding (verbal, written, visual/drawn). Provide anchor charts or reference cards for numeracy number p2 l5 concepts throughout.
Dyslexia: Provide audio-text alternatives for written materials. Use high-contrast fonts and generous line spacing. Allow voice recording as an alternative to written responses where possible.