Algebraic Expressions

1. Basic Terminology

TermDefinitionExample
VariableA symbol (letter) that can take DIFFERENT valuesx, y, z
ConstantA quantity with a FIXED value5, -3, 2/7
TermA constant, a variable, or their PRODUCT3x, -5y², 7
CoefficientThe NUMERICAL factor of a termIn 3xy, coefficient = 3
Algebraic ExpressionA combination of terms connected by + or —3x² — 5x + 7

'In the term —4x²y, the coefficient is —4. The literal factors are x, x, and y.'


2. Types of Expressions

TypeDefinitionExample
MonomialONE term5x²y, -3ab
BinomialTWO terms2x + 3y, a² — b²
TrinomialTHREE termsx² + 2x + 1
PolynomialMANY terms (general)x³ + 2x² — 3x + 4

Degree of a polynomial: The HIGHEST power of the variable.

Degree of 4x³ — 2x² + x — 7 is 3. Degree of a²b + b²c (sum of exponents: 2+1 = 3) is 3.


3. Like and Unlike Terms

Like terms: Have the SAME literal factors (same variables with same exponents). Unlike terms: Have DIFFERENT literal factors.

Like terms: 3x²y, —5x²y, ½x²y (all have x²y) Unlike terms: 3x²y, 3xy² (different exponents)

'Only LIKE terms can be added or subtracted. Unlike terms CANNOT be combined.'


4. Addition and Subtraction of Algebraic Expressions

Method: Combine ONLY like terms by adding or subtracting their coefficients.

Worked Example: Add 3x² + 2xy — 5 and x² — 4xy + 3.

(3x² + 2xy — 5) + (x² — 4xy + 3) = 3x² + x² + 2xy — 4xy — 5 + 3 = 4x² — 2xy — 2

Worked Example: Subtract (2x² — 5x + 3) from (5x² — 2x + 7).

(5x² — 2x + 7) — (2x² — 5x + 3) = 5x² — 2x + 7 — 2x² + 5x — 3 = 3x² + 3x + 4


5. Multiplication of Algebraic Expressions

Monomial × Monomial

Multiply coefficients, then multiply variables.

(—3x²y) × (4xy³) = (—3 × 4) × (x² × x) × (y × y³) = —12x³y⁴

Monomial × Polynomial

Use DISTRIBUTIVE law: Multiply the monomial with EACH term.

2x(3x² — 4x + 5) = 6x³ — 8x² + 10x

Binomial × Binomial

Multiply each term of one with each term of the other.

(x + 2)(x + 5) = x(x + 5) + 2(x + 5) = x² + 5x + 2x + 10 = x² + 7x + 10

Worked Example: Multiply (3x — 2y)(2x + 3y)

= 3x(2x + 3y) — 2y(2x + 3y) = 6x² + 9xy — 4xy — 6y² = 6x² + 5xy — 6y²

Binomial × Trinomial

Each term of the binomial multiplies each term of the trinomial.

Worked Example: (x + 3)(x² — 2x + 5)

= x(x² — 2x + 5) + 3(x² — 2x + 5) = x³ — 2x² + 5x + 3x² — 6x + 15 = x³ + x² — x + 15


6. Division of Algebraic Expressions

Monomial ÷ Monomial

Divide coefficients and subtract exponents of like variables.

12x⁵y³ ÷ 3x²y = (12/3) × x⁵⁻² × y³⁻¹ = 4x³y²

Polynomial ÷ Monomial

Divide each term of the polynomial by the monomial.

(6x³ — 9x² + 12x) ÷ 3x = 2x² — 3x + 4


Common Mistakes and Fixes

MistakeFix
'Adding coefficients of unlike terms'Only COMBINE like terms. 3x + 2y CANNOT be combined
'—(x — y) = —x — y'—(x — y) = —x + y. The sign of EACH term inside changes
'x² × x³ = x⁶'x² × x³ = x⁵ (ADD exponents, not multiply)
'Forgetting the sign when subtracting'When subtracting, change ALL signs of the subtracted expression

ICSE Exam Focus (5–7 marks)

  • 2-mark questions: Identify type of expression, degree, coefficient
  • 3-mark questions: Add or subtract algebraic expressions
  • 4-mark questions: Multiply binomials and trinomials
  • 6-mark questions: Combined operations — simplify complex expressions

Self-Test

Q1. Classify as monomial, binomial, or trinomial: 3x²y, x + y, a² + b² + c². A1. 3x²y → monomial. x + y → binomial. a² + b² + c² → trinomial.

Q2. Add: (2a² — 3ab + b²) + (a² + 2ab — 3b²) + (—a² + ab + b²) A2. a² terms: 2a² + a² — a² = 2a². ab terms: —3ab + 2ab + ab = 0. b² terms: b² — 3b² + b² = —b². Answer: 2a² — b².

Q3. Multiply: (2x — 3y)(3x + 2y) A3. = 2x(3x+2y) — 3y(3x+2y) = 6x² + 4xy — 9xy — 6y² = 6x² — 5xy — 6y².

Q4. Simplify: (x + 2)(x² — 3x + 1) A4. = x(x²—3x+1) + 2(x²—3x+1) = x³ — 3x² + x + 2x² — 6x + 2 = x³ — x² — 5x + 2.

Q5. Divide: 15x⁴y³z² ÷ (—5x²yz) A5. = (15/—5) × x⁴⁻² × y³⁻¹ × z²⁻¹ = —3x²y²z.

Q6. Subtract (3x² — 4x + 7) from (5x² — 2x — 3). A6. (5x² — 2x — 3) — (3x² — 4x + 7) = 5x² — 2x — 3 — 3x² + 4x — 7 = 2x² + 2x — 10.

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