Independent red blue First Choice Second Choice red blue red blue Tree diagrams can be used to help solve problems involving both dependent and.

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Probability 2: constructing tree diagrams

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Presentation transcript:

Independent red blue First Choice Second Choice red blue red blue Tree diagrams can be used to help solve problems involving both dependent and independent events. The following situation can be represented by a tree diagram. Peter has ten coloured cubes in a bag. Three of the cubes are red and 7 are blue. He removes a cube at random from the bag and notes the colour before replacing it. He then chooses a second cube at random. Record the information in a tree diagram. Probability (Tree Diagrams)

Q1 beads Question 1 Rebecca has nine coloured beads in a bag. Four of the beads are black and the rest are green. She removes a bead at random from the bag and notes the colour before replacing it. She then chooses a second bead. (a) Draw a tree diagram showing all possible outcomes. (b) Calculate the probability that Rebecca chooses: (i) 2 green beads (ii) A black followed by a green bead (iii) 2 beads that are the same colour. Probability (Tree Diagrams) black green First Choice Second Choice black green black green

Q3 Sports Becky Win Question 3 Peter and Becky run a race and play a tennis match. The probability that Peter wins the race is 0.4. The probability that Becky wins the tennis is 0.7. (a) Complete the tree diagram below. (b) Use your tree diagram to calculate (i) the probability that Peter wins both events. (ii) The probability that Becky loses the race but wins at tennis. Probability (Tree Diagrams) Peter Win Becky Win Race Tennis Peter Win x 0.3 = x 0.7 = x 0.3 = x 0.7 = 0.42 P(Win and Win) for Peter = 0.12 P(Lose and Win) for Becky = 0.28

Dependent red blue First Choice Second Choice red blue red blue The following situation can be represented by a tree diagram. Peter has ten coloured cubes in a bag. Three of the cubes are red and seven are blue. He removes a cube at random from the bag and notes the colour but does not replace it. He then chooses a second cube at random. Record the information in a tree diagram. Probability (Tree Diagrams) Dependent Events

Q4 beads Question 4 Rebecca has nine coloured beads in a bag. Four of the beads are black and the rest are green. She removes a bead at random from the bag and does not replace it. She then chooses a second bead. (a) Draw a tree diagram showing all possible outcome (b) Calculate the probability that Rebecca chooses: (i) 2 green beads (ii) A black followed by a green bead. Probability (Tree Diagrams) Dependent Events black green First Choice Second Choice black green black green

Q5 Chocolates Question 5 Lucy has a box of 30 chocolates. 18 are milk chocolate and the rest are dark chocolate. She takes a chocolate at random from the box and eats it. She then chooses a second. (a) Draw a tree diagram to show all the possible outcomes. (b) Calculate the probability that Lucy chooses: (i) 2 milk chocolates. (ii) A dark chocolate followed by a milk chocolate. Probability (Tree Diagrams) Dependent Events Milk Dark First Pick Second Pick Milk Dark Milk Dark