Maths Paper 1 and 2 Layout and Question Breakdown for Leaving Cert Higher Level

Maths isn’t a paper you can meaningfully try to predict*, so we offer you a summary of what has been on in the last number of years. It’s good to familiarise yourself with the layout and possible questions if Maths is a subject you struggle with. You may also like: Higher Level Maths for Dummies (€).

*The proofs section is the only one that appears to lend itself to recognising some patterns. This year is the first year we will – cautiously – attempt a prediction. Incircle and Theorem 11.

What came up in 2023

Paper 1

Section A – Concepts & Skills
Q1 Algebra (modulus)

Algebra (manipulating formulae)

Algebra (factorisation of polynomials)

Q2 Algebra (minimum and maximum points of quadratic graphs)

Sequences and series (limits)

Functions and graphs (transformations)

Q3 Proofs (that  is irrational)

Logs and indices

Q4 Complex numbers (De Moivre’s theorem)

Algebra (forming equation from given roots)

Complex numbers (Argand diagram)

Complex numbers (complex conjugates)

Functions and graphs (transformations)

Q5 Differentiation

Functions (composite functions)

Functions (injective/surjective/bijective)

Q6 Algebra

Functions and graphs

Integration

Section B – Contexts and Applications
Q7 Functions

Differentiation

Integration

Speed calculations ()

Q8 Financial maths

Probability (expected value)

Price calculations (cost price, selling price, profit)

Q9 Permutations and combinations

Functions and graphs

Differentiation (tangents)

Geometry (area of a triangle)

Q10 Area and volume

Sequences and series

Integration

Differentiation (related rates of change)

Paper 2

Section A – Concepts & Skills
Q1 Probability (special cases of Bernoulli trials)

Probability (expected values)

Q2 Trigonometric proofs ()

Trigonometric equations

Q3 Coordinate geometry (area of a triangle)

Coordinate geometry (midpoint)

Coordinate geometry (perpendicular bisectors)

Q4 Circles

Perpendicular distance

Q5 Statistics

Basic area and volume concepts

Q6 Geometry
Section B – Contexts and Applications
Q7 Trigonometry

Trigonometric graphs

Differentiation

Q8 Statistics

Statistics (hypothesis testing)

Probability

Probability (tree diagrams)

Q9 Area and volume

Geometry

Trigonometry

Circles

Q10 Geometry (similar triangles)

Area and volume

Area and volume (constructing a net)

Permutations and combinations

What came up in 2022

Paper 1

Section A – Concepts & Skills
Q1 Roots of quadratic equations
Q2 Integration
Simultaneous equations
Q3 Imaginary numbers
Circles
De Moivre’s theorem
Q4 Sequences and series
Rules of indices
Logs
Q5 Differentiation
Factorising cubic functions
Q6 Differentiation from first principles
Differentiation – rates of change
Section B – Contexts & Applications
Q7 Differentiation
Q8 Trigonometric functions
Integration
Q9 Logs
Sequences and series
Q10 Logs
Differentiation

Paper 2

Section A – Concepts & Skills
Q1 Probability – independent/not independent
Q2 Co-ordinate geometry – dividing a line in a given ratio

Finding where a line cuts the y-axis
Finding the slope of a line given the angle it forms with another line

Q3 Equation of a circle
Tangent to a circle
Q4 Trigonometric proofs
Triangles – sine/cosine rule
Q5 Statistics – sample proportion, margin of error, confidence intervals
Testing a hypothesis
Q6 Constructing the circumcentre of a triangle
Triangles
Section B – Contexts & Applications
Q7 Volume
Arc/radius
Similar triangles
Trigonometry
Q8 Scatterplot
Line of best fit
Correlation coefficient
Mean/median
Expected value
Q9 Triangles
Q10 Normal distribution
Z-scores
Probability

What came up in 2021

Paper 1

Section A – Concepts & Skills
Q1 Division of complex numbers

Square roots of complex numbers

De Moivre’s theorem

Q2 Modulus

Roots of cubic functions

Q3 Volume

Multiplication of surds

Roots of quadratic functions

Logs and indices

Q4 Proof by induction

Arithmetic sequences

Q5 Differentiation

Co-ordinate geometry of the line

Q6 Quadratic functions

Differentiation

Section B – Contexts & Applications
Q7 Sequences and series

Trigonometry

Q8 Cubic functions

Differentiation

Integration

Q9 Indices and logs

Differentiation

Q10 Functions

Differentiation

Trigonometry

Volume

Paper 2

Section A – Concepts & Skills
Q1 Probability
Q2 Co-ordinate geometry of the line – point on the line given the equation of the line

Perpendicular distance of a point from a line

Distance between two points

Similar triangles

Q3 Finding the radius of a circle

Circles that touch externally

Q4 Trigonometric proofs

Trigonometric equations

Q5 Volume of a cone

Volume of a sphere

Distance, velocity, time

Q6 Proof – if two triangles are similar, the lengths of their sides are proportional in order

Co-ordinate geometry of the line – axioms and corollaries

Section B – Contexts & Applications
Q7 Trigonometry

Distance, velocity, time

Area of a triangle

Perpendicular distance from a point to a line

Q8 Normal distribution

Z-scores

P-tests

Probability – Bernoulli trials

Q9 Trigonometry

Distance, velocity, time

Trigonometric functions

Q10 Probability

Bernoulli trials

Z-scores

Expected value

What came up in 2020

Paper 1

2020
Section A – Concepts & Skills
Q1 Functions – long division

Roots of a function/finding missing terms of a function

Functions with imaginary roots

Modulus

Q2 Complex numbers – simultaneous equations

Complex numbers/sequences and series – finding common ratio of a geometric sequence (dividing complex numbers)

De Moivre’s Theorem

Q3 Composite functions

Logs

Q4 Differentiation – first derivative

Functions – where a line intersects a curve

Differentiation – finding the point of inflection

Q5 Financial maths – amortisation formula to find monthly payment

Financial maths – present value and total mortgage owed

Q6 Differentiation from first principles

Differentiation of an equation containing the natural log

Integration

Section B – Contexts & Applications
Q7 Sequences and series – completing the sequence

Substituting into the formula for a sequence

Algebraic fractions

Simplifying algebraic expressions

Algebra – solving for n

Substitution into a formula

Proof by induction

Q8 Trigonometry – trigonometric identities

Area

Differentiation to find maximum area

Differentiation – rates of change

Q9 Substitution into a formula involving indices

Logs

Integration – average value

Differentiation

Differentiation/inequality

Algebra/ logs

Paper 2

2020
Section A – Concepts & Skills
Q1 Equation of a line given two points on the line

Perpendicular distance from a point to a line

Finding the slope of a line given the angle it makes with the x-axis

Angle between two lines

Q2 Finding the centre and radius of a circle

Distance between two points

Trigonometry

Circles with centres on the axes

Finding the equation of a circle given the radius and a point on the circle

Q3 Trigonometry

Sine rule

Area of a circle

Ratios

Q4 Trigonometry – solving trigonometric equations

Area of a sector

Area of a triangle

Q5 Conditional probability

Independent events

Probability of an outcome in a game

Q6 Probability

Bernoulli trials

Section B – Contexts & Applications
Q7 Pythagoras’ Theorem

Surface area of a cone

Sectors

Volume of a cone

Flow rate – cross sectional area multiplied by rate

Q8 Statistics

Z-scores

95% confidence interval

Sample proportion

Hypothesis testing

Measures of spread and central tendency

Q9 Trigonometry

Functions

Pythagoras’ Theorem

Differentiation – minimum value

What came up in 2019

Paper 1

2019
Section A – Concepts & Skills
Q1
  1. Algebra – undetermined coefficients
  2. Algebraic fractions
Q2
  1. Algebra – Plotting a linear graph given the equation/ substitution
  2. Proof by induction
Q3
  1. Factorising by grouping
  2. Substitution
  3. Differentiation
Q4
  1. Integration
  2. Finding the equation of a function from a graph/ integration/ solving a cubic function
Q5
  1. Complex numbers – cubic equations
  2. Writing complex numbers in polar forms/ De Moivre’s Theorem
Q6
  1. Algebra – irrational equations/ surds/ Statistics – mean, median
  2. Proof by contradiction
Section B – Contexts & Applications
Q7
  1. Sequences and series – geometric progressions/ finite series
  2. Geometric progressions/ limits of a series
Q8
  1. Trigonometric functions
  2. Trigonometric functions
  3. Differentiation of trigonometric functions
  4. Differentiation – show a function is increasing
  5. Differentiation – minimum point, point of inflection
Q9
  1. Perimeter/ The Circle/ Algebra
  2. Algebra/ Graphing a linear function/ Finding the slope of the graph/ Interpreting the slope
  3. Algebra/ Functions/ Area/ Differentiation of a function/ Maximum point of a function

Paper 2

2019
Section A – Concepts & Skills
Q1
  1. Probability – combinations/selections
  2. Probability – combinations/selections
Q2
  1. The Line – equation of a line
  2. The Line – Finding the equation of a line given the slope and a co-ordinate/ intersection of two lines
Q3
  1. The Circle – finding a point on the circle given the equation of the circle
  2. The Circle – circle with the axes as tangents/ finding the equation of a circle
Q4
  1. Trigonometric proof: cos2Θ = 1 – 2sin2Θ
  2. Trigonometry/ angle between two lines
Q5
  1. Construction – orthocentre of a triangle
  2. Trigonometry/ The Circle/ The Line/ Properties of triangles/ circles/ tangents
Q6
  1. Probability – independent events
  2. Probability
Section B – Contexts & Applications
Q7
  1. Pythagoras’ Theorem/ Trigonometry/ Area/ Volume
  2. Area/ Volume/ 3D shapes
Q8
  1. Statistics – hypothesis testing/ interpreting normal distributions/ z-scores
  2. Statistics – Interpreting p-values/ sample mean
Q9
  1. Trigonometry – cosine rule
  2. Sine rule
  3. Area of a triangle
  4. Area/ radius of a circle
  5. Trigonometry – angle of elevation

General patterns of LC Maths questions

Paper 1

2018 2017 2016 2015 2014
Section A – Concepts & Skills
Q1
  1. Simultaneous equations
  2. Inequalities
  1. Expressing a function as a perfect square
  2. Finding the minimum point of a function
  3. Roots of a function
  1. Complex roots of a function
  2. De Moivre’s Theorem
  3. Complex roots of a function
  1. Geometric progression
  2. Sum to finite geometric series
  3. Sum to infinity
  1. Roots of a function
  2. Finding points of intersection of two functions using algebra
  3. Graphing a function
Q2
  1. Sequences and series – geometric progression and common ratio
  2. Roots of a function
  3. Sum to infinity
  1. De Moivre’s Theorem
  2. Complex numbers
  1. Modulus inequalities
  2. Simultaneous equations
  1. Solving cubic functions
  1. Complex roots of a function
  2. Plotting complex numbers on the Argand diagram
  3. Trigonometry – finding an angle in a triangle
Q3
  1. Differentiation to find the slope of a tangent and the angle it makes with the x-axis
  2. Integration – average value
  1. Differentiation from first principles
  2. Compound functions/ differentiation
  1. Plotting natural/exponential functions
  2. Finding points of intersection of two functions using algebra
  1. Functions/ trapezoidal rule
  2. Integration – definite integral / percentage error
  1. Proof by induction
  2. Sum of a finite arithmetic series
  3. Sequences and series/ algebra – constructing an equation
Q4
  1. Proving De Moivre’s Theorem by induction
  2. Using De Moivre’s theorem
  1. Geometric progression/ inequalities
  2. Sum to infinity
  1. Proof by induction
  2. Logs
  1. Simplifying complex numbers by multiplying by the conjugate
  2. Sum of a finite geometric series
  1. Differentiation from first principles
  2. Differentiation/ slope of a tangent to the curve
Q5
  1. Arithmetic sequence
  2. Arithmetic sequence
  1. Finding the roots of a function
  2. Finding local maximum and minimum points of a function
  3. Finding missing terms of a function
  1. Pythagoras’ Theorem and Pythagorean triples
  2. Prove a function is injective/ find the inverse function
  1. Solving equations with surds
  2. Differentiation
  3. Differentiation – finding the turning points of an equation
  1. Integration of a trigonometric function
  2. Integrating a derivative to find the original function/ integration – average value
Q6
  1. Points of intersection of two functions
  2. Integration – area between two functions
  3. Inverse functions – plot on graph using symmetry
  1. Graphing an exponential function
  2. Integration – finding the area bound by two functions and a line
  1. Differentiation from first principles
  2. Differentiation of trigonometric functions
  3. Using differentiation to find the slope of the tangent to the curve at a given point
  1. Compound interest
  2. Financial maths – amortisation
  1. Proving that a sequence is arithmetic/ finding common difference
  2. Sum of an arithmetic sequence
  3. Sequences and series/ algebra
Section B – Contexts & Applications
Q7
  1. Functions – finding missing terms
  2. Functions – filling into a function
  3. Graphing a function
  4. Graphing a function
  5. Estimations using the graphs of functions
  6. Differentiation – finding maximum value
  1. Substitution/ algebra
  2. Substitution/ algebra
  3. Substitution/ algebra
  4. Using logs to find missing terms
  5. Logs/ algebra
  6. Integration – average value
  7. Differentiation – rates of change
  1. Differentiation – rates of change
  2. Functions/ Integration (average value)
  1. Functions – finding missing terms
  2. Differentiation and evaluating the derivative at a certain value of x
  3. Differentiation – finding the acute angle to the horizontal
  4. Differentiation – point of inflection
  5. Verifying points are on a curve/ finding images under symmetry in the point of inflection
  1. Pythagoras’ Theorem/ Pythagorean triples/ algebra
  2. Functions/ trigonometry/ Differentiation to find minimum value/ Algebra
Q8
  1. Co-ordinate geometry – where graph intersects the y-axis
  2. Area
  3. Differentiation- show a graph is decreasing at a certain point
  4. Differentiation – point of inflection
  1. Financial maths/ Sequences & Series -derivation of amortisation formula
  2. Financial maths – monthly repayments, APR, compound interest
  1. Differentiation to find maximum points of a function and acute angle to horizontal/ Translations/ Simultaneous equations/ Functions
  2. Algebra/ Logs
  1. Functions – plotting a function/ constructing an equation from a graph
  2. Volume of a cylinder/ differentiation – rates of change
  3. Differentiation – rates of change
  4. Area/ velocity/ time
  1. Differentiation – maximum value on a curve
  2. Functions/ algebra – finding x at a given value of y
  3. Integration – finding area
  4. Expressing a function as a perfect square
  5. Identifying a pattern/ constructing an equation
Q9
  1. Sequences and series
  2. Constructing an expression for a geometric sequence/ inequalities
  3. Inequalities/ sequences and series/ limits
  4. Geometric sequence/ limits
  1. Graphing trigonometric functions
  2. Trigonometric functions – missing terms
  3. Interpreting graph of a trigonometric function
  1. Sequences and series – sum of a finite geometric series/ sum to infinity
  2. Substituting into a given formula/ algebra
  1. Trigonometric functions (filling in)
  2. Trigonometric functions (solving for an unknown term)
  3. Differentiation of trigonometric functions
  4. Finding the maximum value of a trigonometric function
  5. Integration – average value
  1. Exponential equations – finding missing terms
  2. Exponential equations – finding missing terms
  3. Exponential equations – finding missing terms
  4. Sketching an exponential function
  5. Sketching another exponential function/ comparing the two sketches
  6. Differentiation – rates of change

Paper 2

2018 2017 2016 2015 2014
Section A – Concepts & Skills
Q1
  1. Probability – expected value
  2. Probability – expected value/ Algebra
  1. Probability – fundamental principle of counting
  2. Bernoulli trials
  3. Probability
  4. Exponential terms/ inequalities/ algebra
  1. Co-ordinate geometry – finding line perpendicular to a given line
  2. Finding co-ordinates of the orthocentre
  1. Probability – completing sample space diagram
  2. Probability of winning/ interpreting sample space
  3. Bernoulli trials
  1. Trigonometry – cosine rule/ area of a triangle
  2. Trigonometry – circumcentre
Q2
  1. Probability/ Statistics – Normal distribution + z-scores
  2. Probability/ Statistics -Standardising formula/ Algebra/ Empirical rule
  1. Correlation coefficient
  2. Drawing line of best fit
  3. Interpreting/explaining slope of line of best fit
  4. Distance, speed, time/ money
  1. Co-ordinate geometry – equation of a line
  2. Line/ circle – tangents, equation of a circle
  1. Statistics – confidence intervals
  2. Hypothesis testing
  3. P-values
  1. Trigonometry proof: cos2A = cos2A – sin2A
  2. Trigonometry – sectors/ angle/ radius
Q3
  1. Permutations
  2. Factorials/ Algebra
  1. Co-ordinate geometry – translations/ dividing a line in a given ratio
  2. Co-ordinate geometry – midpoint of a line
  3. Finding the orthocentre of a triangle
  1. Trigonometry – proving by substitution
  2. Solving a trigonometric equation
  1. Co-ordinate geometry – perpendicular lines/ equation of a line
  2. Perpendicular distance
  3. Perpendicular distance/ Algebra
  4. Perpendicular distance/ Algebra
  1. Probability
  2. Probability – expected value
  3. Bernoulli trials
Q4
  1. Trigonometry – solving trigonometric equations
  2. Trigonometry/ Algebra/ Substitution
  1. Finding the equation of a circle given 3 points on the circle
  2. Trigonometry – finding an angle in a triangle
  1. Similar triangles
  2. Construction of a line segment equal in length to the square root of a given line segment
  1. The Circle – circles touching internally/ centre/ radius
  2. Ratios/ Translations/ Finding the equation of a circle
  3. Common tangent/ Equation of a line
  1. Trigonometry – trigonometric functions/ period/ range
  2. Trigonometry – filling into trigonometric function/ Calculating standard deviation
  3. Standard deviation/ Algebra/ Trigonometric functions
Q5
  1. Co-ordinate geometry – verify a point is on a line
  2. Co-ordinate geometry – perpendicular distance/ Algebra
  3. The Circle – equation of a circle/ circles touching externally/ dividing a line in a given ratio
  1. Proving that triangle are similar
  2. Trigonometry – finding the length of a side
  3. Trigonometry – finding the length of a side
  4. Trigonometry – finding the area of a quadrilateral
  1. Probability – filling in table/ fundamental principle of counting
  2. Probability/ Sets – independent events
  1. Trigonometry proof: tan(A+B) =
  2. Solving trigonometric equations
  1. Co-ordinate geometry/ Area of a triangle
  2. Co-ordinate geometry – equation of a line/ showing a point is on a line
  3. Co-ordinate geometry/ Algebra/ Area of a triangle
Q6
  1. Proof – Theorem 12
  2. Trigonometry – ratios/ Pythagoras’ Theorem
  1. Pythagoras’ Theorem
  2. Trigonometry/ circumference of a circle/ radius
  1. Probability – fundamental principle of counting
  2. Probability – expected value
  3. Profit/ Algebra
  1. Construction – centroid of a triangle
  2. Proof – Theorem 11
  1. Proof – Theorem 13
  2. Construction of an angle of 60ᵒ without using a protractor/ set square
  3. Similar triangles
  4. Similar triangles
  5. Similar triangles/ Algebra
Section B – Contexts & Applications
Q7
  1. Volume/ geometric progression
  2. Surface area/ algebra/ arithmetic sequence
  3. Length/ radius
  4. Volume/ trigonometry/ algebra
  1. Volume/ Algebra
  2. Pythagoras’ Theorem/ similar triangles/ surface area/ Algebra
  3. Volume/ Algebra
  1. Trigonometry – Pythagoras’ Theorem/ finding an angle or length of a side using trig ratios/ Area
  2. Trigonometry – angle of elevation/ trig ratios/ Pythagoras’ Theorem
  1. The Circle/ Trigonometry
  2. Area
  3. Trigonometry – trig ratios to find an angle/ Area
  1. Interpreting data presented in a table
  2. Statistics – median/ interquartile range
  3. Interpreting data in a table/ completing a table
  4. Comparing different types of charts/ interpreting charts
Q8
  1. Probability/ z-scores/ one-sample t-test/ confidence interval
  2. Statistics – sample size/ sample proportion/ Differentiation – maximum value
  3. Financial maths/ geometric progression
  1. Statistics – normal distribution/ z-scores/ hypothesis testing
  2. Probability – filling in tree diagram/ interpreting tree diagram/ conditional probability
  1. Trigonometric function – period/ range
  2. Maximum value of a trigonometric function
  3. Differentiation – trigonometric functions/ rates of change
  4. Graphing a trigonometric function
  5. Interpreting graph of trigonometric function
  6. Interpreting graph of trigonometric function
  1. Probability – fundamental principle of counting
  2. Probability
  3. Probability
  4. Probability/ Algebra
  5. Sequences and series – geometric progression/ Inequalities
  6. Probability – independent events
  1. Probability – completing tree diagram/ interpreting tree diagram/ conditional probability
  2. Hypothesis testing
Q9
  1. Trigonometry – sine rule
  2. Trigonometry – trigonometric functions/ range/ period/ graph
  3. Trigonometry – sine rule/ cosine rule
  1. Trigonometry – angles in a triangle/ Algebra
  2. Trigonometry – angles in a triangle/ Algebra
  3. Trigonometry/ Algebra
  4. Trigonometry/ Algebra
  5. Trigonometry – using trig ratios/ Algebra
  6. Probability
  1. Probability/ Statistics – z-scores/ standardising formula/ tax/ hypothesis testing
  2. Statistics – confidence intervals
  3. Statistics – Central Limit Theorem
  4. Margin of error/ sample error
  1. Trigonometry
  2. Trigonometry – cosine rule/ Pythagoras’ Theorem
  3. Trigonometry/ Functions/ Distance, velocity and time
  4. Trigonometry
  1. The Circle – centre/ radius/ Co-ordinate geometry – distance formula/ perpendicular distance/ mid-point of a line/ Translations
  2. Construction of a circle given diameter/ Trigonometry/ The Circle/ Area