By exploring the concept of scale invariance, find the probability that a random piece of real data begins with a 1.

In the time before the mathematical idea of randomness was discovered, people thought that everything that happened was part of the will of supernatural beings. So have things changed?

Use trigonometry to determine whether solar eclipses on earth can be perfect.

Why MUST these statistical statements probably be at least a little bit wrong?

A simple spinner that is equally likely to land on Red or Black. Useful if tossing a coin, dropping it, and rummaging about on the floor have lost their appeal. Needs a modern browser; if IE then at. . . .

Can you crack these very difficult challenge ciphers? How might you systematise the cracking of unknown ciphers?

Fancy a game of cricket? Here is a mathematical version you can play indoors without breaking any windows.

Under which circumstances would you choose to play to 10 points in a game of squash which is currently tied at 8-all?

Uncertain about the likelihood of unexpected events? You are not alone!

Invent a set of three dice where each one is better than one of the others?

What do we mean by probability? This simple problem may challenge your ideas...

Explore the distribution of molecular masses for various hydrocarbons

If a coin rolls and lands on a set of concentric circles what is the chance that the coin touches a line ?

Think that a coin toss is 50-50 heads or tails? Read on to appreciate the ever-changing and random nature of the world in which we live.

The four digits 5, 6, 7 and 8 are put at random in the spaces of the number : 3 _ 1 _ 4 _ 0 _ 9 2 Calculate the probability that the answer will be a multiple of 396.

A gambler bets half the money in his pocket on the toss of a coin, winning an equal amount for a head and losing his money if the result is a tail. After 2n plays he has won exactly n times. Has. . . .

Can you work out which spinners were used to generate the frequency charts?

This article explains how tree diagrams are constructed and helps you to understand how they can be used to calculate probabilities.

All you need for this game is a pack of cards. While you play the game, think about strategies that will increase your chances of winning.

Chris and Jo put two red and four blue ribbons in a box. They each pick a ribbon from the box without looking. Jo wins if the two ribbons are the same colour. Is the game fair?

Can you devise a fair scoring system when dice land edge-up or corner-up?

To win on a scratch card you have to uncover three numbers that add up to more than fifteen. What is the probability of winning a prize?

You have two bags, four red balls and four white balls. You must put all the balls in the bags although you are allowed to have one bag empty. How should you distribute the balls between the two. . . .

Use combinatoric probabilities to work out the probability that you are genetically unique!