📐 A-Math Formula Sheet Breakdown: When, How & What to Use for Exams
💬 Introduction
💬 IntroductionStruggling to revise for A-Math without drowning in formulas? 😩
Good news — we’ve got you covered! Our A-Math Formula Sheet is a super-condensed, exam-focused revision tool designed to help you revise every chapter in 10 minutes or less. 🧠⏱️
This blog is your complete guide to understanding how to use each formula effectively, when to apply them during exams, and what tricks help you score faster and smarter.
📘 Bonus: You can download the full free formula sheet directly from Sophia Education.
Let’s jump into each topic and break it all down. 💥
📘 1. Simultaneous Equations: Solve Like a Pro
When to Use:
When you see two equations with two unknowns (x and y), often one linear and one quadratic.
How to Use:
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Isolate one variable (usually x or y).
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Substitute into the second equation.
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Always check both solutions at the end.
Formula Highlight:
Linear:2x + 3y = 7
Quadratic + Substitution:2y – x² = xy, then substitute y = x + 3
🎯 Exam Tip:
Always plug back your solutions to check for invalid roots, especially when logarithms or square roots are involved!
🧮 2. Surds: Clean and Rationalize
When to Use:
When dealing with square roots that can’t be simplified fully.
How to Use:
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Use conjugate surds to rationalize denominators.
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Multiply numerator and denominator by the conjugate.
Formula Highlight:(a + √b)(a - √b) = a² - b
Use this to eliminate surds in the denominator.
🎯 Exam Tip:
Don’t leave surds in the denominator — you’ll lose marks! Always rationalize.
🔢 3. Indices & Exponential Equations
When to Use:
Whenever variables appear as powers (exponents).
How to Use:
-
Apply index laws:
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a^m * a^n = a^(m+n) -
(a^m)^n = a^(mn)
-
-
For exponential equations, rewrite both sides with the same base.
🎯 Exam Tip:
Can’t get same base? Take logs on both sides. That brings us to the next section…
📈 4. Logarithms & Log Laws
When to Use:
Whenever variables appear inside logs or as powers.
How to Use:
-
Basic Conversion:
log_a b = c↔a^c = b -
Laws to Memorize:
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log_a(xy) = log_a x + log_a y -
log_a(x/y) = log_a x - log_a y -
log_a(x^n) = n log_a x
-
🎯 Exam Tip:
Only positive numbers are allowed inside logs. Always check the domain of your answer!
➗ 5. Quadratics & Inequalities
When to Use:
For equations in the form ax² + bx + c = 0
How to Use:
-
Quadratic Formula:
x = [-b ± √(b² - 4ac)] / 2a -
Discriminant Insight:
-
b² - 4ac > 0: 2 real roots -
= 0: 1 real root -
< 0: no real roots
-
🎯 Exam Tip:
Sketch the graph to help visualize inequalities like x² – 4x – 5 > 0.
🔣 6. Polynomials, Identities, and Theorems
When to Use:
When simplifying or factoring high-degree expressions.
How to Use:
-
Apply Remainder Theorem:
f(a)gives the remainder of dividing f(x) by (x – a) -
Factor Theorem:
Iff(a) = 0, then (x – a) is a factor.
🎯 Exam Tip:
When given a cubic polynomial, find one factor using Factor Theorem, then long divide.
🧩 7. Partial Fractions
When to Use:
For integrating rational expressions.
How to Use: Break down:
-
Distinct Linear Factors:
A/(x + a) + B/(x + b) -
Repeated Factors:
A/(x + a) + B/(x + a)² -
Irreducible Quadratic:
(Ax + B)/(x² + b)
🎯 Exam Tip:
After splitting, plug in values of x that simplify equations to solve for A and B fast!
📊 8. Modulus Function & Graphs
When to Use:
Equations or graphs with |x|.
How to Use:
-
Understand that:
|x| = xif x ≥ 0|x| = -xif x < 0
🎯 Exam Tip:
Split the modulus into cases when solving equations or sketching graphs.
🔁 9. Binomial Expansion
When to Use:
For expressions like (a + b)^n
How to Use:
-
Use combinations:
nCr = n! / [r!(n–r)!] -
General Term:
T_r+1 = nCr * a^(n–r) * b^r
🎯 Exam Tip:
Need the x⁵ term? Match the powers and solve for r!
📐 10. Coordinate Geometry
When to Use:
When finding distances, gradients, midpoints.
How to Use:
-
Midpoint:
(x₁+x₂)/2, (y₁+y₂)/2 -
Gradient:
(y₂ - y₁)/(x₂ - x₁) -
Distance:
√[(x₂ – x₁)² + (y₂ – y₁)²]
🎯 Exam Tip:
Use gradient relationships to show perpendicularity or parallel lines!
📏 11. Geometry: Triangles, Circles & Angles
Key Concepts to Use:
-
Triangle area with coordinates:
Area = 1/2 |x₁(y₂–y₃) + x₂(y₃–y₁) + x₃(y₁–y₂)| -
Circle equation:
(x – a)² + (y – b)² = r² -
Important Angle Properties:
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∠ in semicircle = 90°
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∠ at centre = 2 ∠ at circumference
-
🎯 Exam Tip:
Whenever you see circles or radii, mark all given lengths & angles immediately.
📚 12. Trigonometry & Graphs
When to Use:
Whenever dealing with angles, triangles, or periodic functions.
How to Use:
-
Special Angles: Memorize exact values for 30°, 45°, 60°
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Trig Identities to Memorize:
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sin²θ + cos²θ = 1 -
1 + tan²θ = sec²θ
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Graph Basics:
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sin, cos = amplitude ±1
-
tan = asymptotes at 90° intervals
🎯 Exam Tip:
To solve equations like 2sinθ = √3, find principal angle and check quadrant.
🧠 13. Trig Equations, Identities, and R-Formulae
When to Use:
For expressions like a sin θ + b cos θ.
How to Use:
-
Convert to single sine/cosine using:
R = √(a² + b²),tan α = b/a -
Double Angle Formulae:
-
sin 2A = 2 sin A cos A -
cos 2A = cos² A – sin² A
-
🎯 Exam Tip:
Always simplify expressions before solving — especially in MCQ!
📈 14. Differentiation: Rules, Tangents & Rates
When to Use:
Whenever you need slope, turning points, or rates of change.
How to Use:
-
Chain Rule:
dy/dx = dy/du * du/dx -
Product Rule:
(uv)' = u'v + uv' -
Quotient Rule:
(u/v)' = (v u' – u v') / v²
🎯 Exam Tip:
Turning point = where dy/dx = 0. Use second derivative to check max/min!
⏱️ 15. Integration & Area Under Curves
When to Use:
Reverse of differentiation. Used to find area under curves.
How to Use:
-
Basic:
∫ xⁿ dx = xⁿ⁺¹ / (n+1) -
Definite Integrals:
∫[a to b] f(x) dx = F(b) – F(a) -
Area under x-axis? Take absolute value!
🎯 Exam Tip:
Watch the sign of area — under x-axis areas are negative unless absolute.
🚗 16. Kinematics (Motion Math)
When to Use:
For velocity, acceleration, displacement problems.
How to Use:
-
v = ds/dt,a = dv/dt -
Displacement =
∫ v dt
🎯 Exam Tip:
When a particle is at rest, v = 0. Use that to find when or where it stops.
🔑 Final Revision Tips: How to Master the A-Math Formula Sheet
✅ Print it out — Stick it next to your study space.
✅ 10-Minute Rule — Revise one chapter a day for 10 minutes.
✅ Flashcard It — Turn formulas into flashcards.
✅ Use in Practice — Apply every formula while doing exam papers.
✅ Keep It Updated — Highlight formulas you forget or misuse during practices.
📌 Get Your FREE A-Math Formula Sheet Now!
You can download Sophia Education’s full A-Math Summary Notes for free — covering 40+ subtopics in a single glance.
✨ Why Students Love This Formula Sheet
💡 Super-condensed revision
⏱️ Saves time in last-minute prep
🎯 Focuses only on what you NEED to score
🧠 Perfect for concept recall & practice
🧑🏫 Need Help with A-Math?
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-
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🎯 Conclusion
The A-Math Formula Sheet isn’t just a study tool — it’s your exam survival guide. Use it wisely, practice strategically, and you’ll walk into your O-Level confident and ready to crush it. 💪📘
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