Subject mastery is only half the battle.
The true test of a certified educator is knowing how to take abstract math and translate them to concepts that a young, anxious, or struggling learner can digest.
This topic evaluates your ability to dissolve math anxiety, scaffold problem-solving, and run effective remediations.
1. Concrete-Representational-Abstract (CRA) Sequence
The CRA framework is a 3-stage instructional strategy that builds deep understanding by relating maths to physical reality before moving to numbers and symbols.
| CONCRETE | (Physical Objects) |
| REPRESENTATIONAL | (Visual Pictures) |
| ABSTRACT | (Math Symbols) |
Concrete “Doing” stage
Learners interact physically with tangible objects, manipulating them to solve a math problem.
- Examples: Using real bottle caps, counting sticks, plastic beads, or base-10 blocks.
Representational “Seeing” stage
The physical objects are replaced with visual representations.
- Examples: Drawing dots, tallies, circles, or bar models on the chalkboard to represent the same quantities.
Abstract “Symbolic” stage
Learners use strictly mathematical symbols, numbers, and operational signs (+, -, ×, ÷) to compute.
Classroom Application Sample
Math problem: 3 + 2 = 5
- Concrete: Give a child 3 orange peels and 2 mango leaves. Let them count them all.
- Representational: Have the child draw 3 lines and 2 lines (||| → ||) on their slate.
- Abstract: Write the numeric equation on the board: 3 + 2 = 5.
2. Strategies for Word Problems
The biggest hurdle for students in numeracy is often not computation, but linguistic translation—turning a written word problem into an algebraic equation.
The “Singapore Math Model Drawing” (Bar Modelling) is a high-yield visual strategy to fix this.
Tape/Bar diagram method
Instead of guessing whether to add or subtract, students draw proportional bars to visualize relationships between quantities.
Sample question: Chidi and Amina shared some pencils. Amina has 15 pencils. Chidi has 8 more pencils than Amina. How many pencils do they have altogether?
Breakdown using Bar Models:
Instead of rushing into x + (x + 8), guide the student to draw:
- Draw Amina’s bar: Draw a rectangular box and label it 15.
- Draw Chidi’s bar: Draw an identical box labelled 15, plus an extra attached piece labelled 8.
- Visualize the math: The student can clearly see that to find the total, they must first calculate Chidi’s share (15 + 8 = 23) and then combine it with Amina’s share (15 + 23 = 38).
Total Pencils = 15 + 15 + 8 = 38
3. Creating a Growth Mindset in Maths
“Math anxiety” is a big barrier in schools as many students believe they lack a “math brain.”
A certified teacher uses specific psychological techniques to build resilience.
Power of “Yet”
When a student says, “I can’t solve quadratic equations,” the teacher corrects them: “You can’t solve quadratic equations yet.”
This implies that mastery is a function of time and practice, not in-born genetics.
Praising process, not outcome
Avoid telling a student “You are so smart” when they get an answer right.
Instead, say, “I like the step-by-step strategy you used to clear the brackets.”
This encourages effort rather than fixed intelligence.
Normalizing productive struggle
Redefine mistakes as data.
Teach students that mistakes are proof that the brain is forming new neural connections.
4. Lesson Remediation Framework
This is a targeted instructional intervention to correct specific math misconceptions before a student fall permanently behind.
It is not just repeating the failed lesson louder or punishing the student.
Remediation loop steps:
- Error analysis (Diagnosis): Examine a student’s script to find out where the logic broke down. Don’t just mark it wrong with a red pen.
- Example: If a student writes 1/2 + 1/3 = 2/5, the diagnosis is a conceptual error—the student is adding numerators and denominators directly instead of finding a LCM first.
- Regrouping: Group students who share the exact same math misconception together for a focused, small-group clinic.
- Scaffolding down: Drop back down the CRA sequence. If they failed at the abstract level, bring back the concrete manipulatives or pictorial bar models.
- Formative re-assessment: Give a short, low-stakes alternative quiz to verify if the misconception has been resolved before moving to the next syllabus topic.
Teaching Strategy
If an exam question asks: “A primary school teacher notices that whenever students are given abstract multiplication equations like 6 × 4, they struggle, but when given 24 physical counting stones to share into 4 groups, they do it easily. What should the teacher do next?”
Wrong: Keep drilling them on the 6 × 4 abstract multiplication table until they memorize it.
Right: Utilize the Representational stage of the CRA sequence. Bridge the gap by having them draw pictures of the stones on paper before moving back to the abstract equation symbols.


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