11+ Sequences Practice
(GL Assessment)

Sequences appear in two to four questions of every GL Assessment 11+ maths paper, sitting within the Algebra strand of the Year 5 and Year 6 curriculum. Unlike the "what comes next?" number series in the Verbal Reasoning paper, maths sequences go further: they ask children to find a missing term, describe the rule, work out the nth term, or solve a pattern hidden inside a word problem.

This means a child needs two things: the eye to spot a pattern quickly, and the arithmetic to apply it accurately. GL mixes friendly counting patterns (add 7 each time) with trickier ones such as square numbers, doubling, and sequences that weave two patterns together.

For a parent, the reassuring part is that sequences reward method over memory. A child who learns to write down the differences, check three gaps before deciding the rule, and recognise square, cube and triangular numbers on sight will handle most questions calmly. The skills are learnable and the formats repeat, so steady practice builds real confidence here.

Start practising free 182 sequences questions · No sign-up needed

What the GL 11+ Tests on Sequences

All questions are five-option multiple choice (A to E). Based on our analysis of GL papers and tutor resources, the maths paper tests these sequence skills in roughly this order of frequency (weightings are research estimates, not published by GL):

  • Recognising and continuing a linear sequence (around 25%): a constant step up or down.
  • Finding the term-to-term rule (around 20%): add 6, multiply by 3, and so on.
  • Generating terms from an nth term rule (around 15%): for example, "the rule is 3n + 2, what is the 8th term?".
  • Recognising special sequences (around 15%): squares, cubes, primes, triangular numbers.
  • Finding a missing term mid-sequence (around 10%).
  • Context and word problems (around 10%): patterns in tiles, savings or matchsticks.
  • Non-linear sequences (around 5%): geometric or Fibonacci-type, at the hardest level.

Difficulty ranges from simple constant-step sequences (D1) through nth term work and square numbers (D2) up to interleaved patterns, compound rules and sequences crossing into negatives (D3). The nth term and "generate the sequence" formats are directly supported by the Year 6 algebra curriculum, so they are fair game.

Sample Sequences Questions

Five questions drawn from PrepStep’s sequences bank, spanning Foundation to Challenging. Tap “Show worked explanation” to see the full method after you’ve had a go. The correct answer is highlighted on each question so you can check immediately.

Question 1 Foundation

A baker makes 3 cakes on Monday, 6 on Tuesday, 9 on Wednesday, 12 on Thursday, and 15 on Friday. If the pattern continues, how many cakes will he make on Saturday?

  1. 16
  2. 17
  3. 20
  4. 19
  5. 18
Show worked explanation

The baker makes 3 more cakes each day. 15 + 3 = 18 cakes on Saturday. ✓

Question 2 Intermediate

Tom notices the pattern: 1, 4, 9, 16, 25, ?. What is the next number?

11×142×293×3164×4255×5?6×6
  1. 30
  2. 32
  3. 36
  4. 34
  5. 38
Show worked explanation

These are square numbers: 1², 2², 3², 4², 5², 6². So 6² = 36. ✓

Question 3 Intermediate

A bouncy ball is dropped from 100 cm. Each bounce reaches half the height of the last: 100 cm, 50 cm, 25 cm, 12.5 cm. How high will the next bounce reach?

  1. 6
  2. 7
  3. 6.5
  4. 6.25
  5. 7.5
Show worked explanation

Each bounce is half the height of the one before. 12.5 ÷ 2 = 6.25 cm. ✓

Question 4 Challenging

Lucy finds the pattern: 2, 5, 11, 23, 47, ?. What comes next?

  1. 89
  2. 91
  3. 93
  4. 95
  5. 97
Show worked explanation

The rule is: double the previous number and add 1. So 47 × 2 = 94, then 94 + 1 = 95. ✓

Question 5 Challenging

On a maths challenge card, Priya sees this pattern: 1, 3, 7, 15, 31. What number comes next?

  1. 47
  2. 55
  3. 59
  4. 63
  5. 67
Show worked explanation

The rule is: double the previous number and add 1. So 31 × 2 = 62, then 62 + 1 = 63. ✓

Common Mistakes to Avoid

Common mistake 1 of 4

Writing the step instead of the next number.

Tip: A child finds the rule is "add 7" and answers 7 rather than the next term. Always apply the rule to the last number, then double-check the answer is a term in the sequence, not the gap.

Common mistake 2 of 4

Checking only the first gap.

Tip: In 7, 9, 12, 16, 21 the first jump is +2 but the rule is +2, +3, +4, +5. Always check at least three differences before deciding the rule.

Common mistake 3 of 4

nth term order-of-operations errors.

Tip: For 3n + 1 at the 6th term, children write 3 + 6 + 1 or 3(6 + 1) instead of 3 x 6 + 1 = 19. Multiply first, then add or subtract (BODMAS).

Common mistake 4 of 4

Panicking at "chaotic" sequences.

Tip: When differences jump around wildly, two patterns are usually woven together. Separate the odd and even positions and check each one on its own.

Frequently Asked Questions

What kind of sequence questions are in the GL 11+ maths exam?

GL maths sequences ask children to continue a sequence, find a missing term, describe the rule, work out the nth term, or solve a pattern in a word problem. There are usually two to four sequence questions per 50-question paper, ranging from easy to hard.

What is an nth term question in the 11+?

An nth term question gives a formula such as 3n + 2 and asks for a specific term, for example the 8th. You substitute the position number for n (3 x 8 + 2 = 26). The most common error is adding before multiplying, so BODMAS matters.

How are maths sequences different from Verbal Reasoning number series?

VR number series simply ask "what comes next?" in a bare list of numbers. The maths paper goes further, testing missing terms, rules in words, nth term formulas and patterns inside word problems, and it expects more algebraic thinking.

What sequences should my child memorise for the 11+?

Square numbers to 144 (1, 4, 9, 16, 25 and so on), cube numbers to 216, the primes to 50, triangular numbers (1, 3, 6, 10, 15) and the powers of 2. Instant recognition of these saves valuable time in the exam.

Why does my child get sequences that go below zero wrong?

Sequences like 20, 14, 8, 2 carry on into negatives (the next term is -4, not 4). Children who have not practised crossing zero either drop the minus sign or change direction. Practising negative numbers alongside sequences fixes this.

Ready to build real sequences confidence?

PrepStep has 182 sequences questions in GL Assessment format: five options, instant feedback, and step-by-step explanations. Free to start.

Start practising free No sign-up needed · Works on phone, tablet, and desktop