Probability Part 2 - Tree Diagrams

Slightly more complicated probability events including compound events. Tree diagrams are used to map out all the possible outcomes and to determine the final probability.

• How do you know the probability of pulling different colored balls from a bag if you get two picks?
• What is a tree diagram in probability?
• How can you use a tree diagram to find probability of a compound event?
• If a bag has 5 red balls and 3 white balls, what is the chance of picking 1 ball of each color if you replace the first ball?
• How can you draw a tree diagram to map out possible outcomes?
• How can you determine the probabilities on the branches of a tree diagram?
• What does it mean for outcomes to be mutually exclusive in probability?
• What are some properties of tree diagrams?
• Why are different paths on a tree diagram mutually exclusive?
• If a bag has 5 red balls and 3 white balls, what is the probability of picking a red ball on your second pick if you do not replace the first ball?
• If a bag has 9 blue balls and 7 green balls, what is the probability of picking at least 1 green ball in 2 picks?