Probability theory helps us understand and predict how likely things are to happen in situations with uncertainty. π
Imagine you're trying to guess if it will rain tomorrow or if you'll win a game of cards. Probability theory gives us tools to make smart guesses about uncertain events, just like weather forecasters use it to tell us the chance of rain. It's the mathematical way of dealing with uncertainty, helping us make better decisions in everything from games to business. π²
Probability is measured from 0 (impossible) to 1 (certain). It's like a scale where 0 means something will never happen (like finding a real unicorn), and 1 means it's guaranteed (like the sun rising tomorrow). A 50% chance (0.5) is like flipping a coin - equally likely to happen or not happen.
Some events don't affect each other (like flipping a coin twice), while others do (like drawing cards without replacing them). It's like picking marbles from a bag - if you put each marble back after picking it, each pick is independent; if you don't, they're dependent because the number of marbles changes.
This shows all possible outcomes and their chances. It's like having a recipe book where each recipe has a different chance of being chosen for dinner. Some might be favorites (high probability), while others are rarely picked (low probability).
This tells us what to expect on average over many tries. It's like knowing that if you play a game 1000 times, roughly how many times you might win. For example, if a game has a 30% win rate, you'd expect about 300 wins in 1000 games.