GCSE Maths Practice: probability-basics

Question 7 of 10

Work with basic single-event probability using a 6-sided die.

\( \begin{array}{l}\textbf{What is the probability} \\ \textbf{of rolling a 3 on a} \\ \textbf{fair 6-sided die?}\end{array} \)

Choose one option:

List all outcomes then identify the favourable one.

Understanding Probability When Rolling a Die

Probability questions involving dice appear frequently in GCSE Maths because the outcomes are clear, fixed and equally likely. A fair six-sided die has numbered faces from 1 to 6, and each face has the same chance of landing face up. This makes it simple to apply the basic probability formula and helps build confidence before moving on to more advanced ideas like combined probability, independent events and probability trees.

Why Dice Are Used in GCSE Maths

Dice are reliable probability tools because they provide a perfect example of equally likely outcomes. No number is supposed to appear more frequently than another when the die is fair and well-balanced. This symmetry is important because it allows you to calculate probabilities directly without adjusting for bias or weighting.

The Basic Probability Formula

The standard formula used in GCSE probability is:

Probability = (Number of favourable outcomes) ÷ (Total number of possible outcomes)

When rolling a die, the total number of possible outcomes is always 6. If you want the probability of a specific number—such as rolling a 3—there is only one favourable outcome.

Worked Example 1: Rolling a Single Number

If the question asks for the probability of rolling a 3, identify the favourable outcomes first. Only one face shows the number 3. Since there are six faces in total, the probability becomes 1/6. This type of question is one of the most direct forms of probability calculation in the GCSE syllabus.

Worked Example 2: Rolling an Even Number

If the event was “rolling an even number,” the favourable outcomes would be 2, 4 and 6 — three outcomes. The probability would therefore be 3/6, which simplifies to 1/2. This shows how counting favourable outcomes changes depending on the question but the method stays the same.

Worked Example 3: Rolling a Number Greater Than 4

The outcomes greater than 4 are 5 and 6. That gives 2 favourable outcomes out of 6 total possibilities. So the probability would be 2/6, which simplifies to 1/3. This reinforces the idea of filtering outcomes based on the condition in the question.

Common Mistakes

  • Forgetting that a standard die always has exactly six faces numbered 1–6.
  • Confusing total outcomes when using more than one die (for example, thinking two dice have six outcomes—they actually have 36 possible pairs).
  • Thinking some numbers are more likely because they feel “luckier”—in maths, each outcome is equally likely on a fair die.

Real-Life Applications

Dice are used frequently in games, probability simulations and mathematical modelling. Understanding dice probability helps build skills used in statistics, coding simulations and even artificial intelligence systems that rely on randomisation. Being confident with single-die probability prepares you for multi-step questions and independent events later in the GCSE course.

FAQ

Q: Does the probability change if the die is rolled many times?
No. Each roll is independent. The probability of rolling a 3 stays the same on every roll.

Q: Can the result of a previous roll influence the next one?
No. A fair die resets on each roll. Past results do not affect future outcomes.

Q: Should the final probability be simplified?
Simplify only if the question requires it. In this case, 1/6 is already in its simplest form.

Study Tip

When calculating probability with dice, always start by identifying how many outcomes are possible. Then count the specific outcomes that match the requirement. This method ensures accuracy and helps you tackle more advanced GCSE probability questions with confidence.

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