Let's look at calculating theoretical probabilities for situations with multi-stage trials. Such as tossing a coin three times, rolling two dice or passing through multiple intersections.
Two events are independent if the occurrence of one does not affect the probability of the occurrence of the other. When tossing an unbiased coin repeatedly the probability of the occurrence of a tail on any individual toss is $0.5$0.5. This probability remains unchanged, regardless of whether there has been a run of heads or tails in previous tosses, since the coin has no memory. So each coin toss is an independent event. The events of tossing a coin and then rolling a die are independent, because they use completely different objects. The die is not affected by the coin and vice versa.
If events $A$A and $B$B are independent the following property allows us to calculate the probability of both $A$A and $B$B occurring, in other words $P\left(A\cap B\right)$P(A∩B).
Caution: This only applies to independent events. We will look at dependent events in detail next lesson.
If two dice are rolled, what is the probability of rolling snake eyes (double ones)?
(Note: It does not matter if two separate dice were rolled or a single die was rolled twice)
The two rolls are independent events, so we can multiply the probability of rolling a one on each die.
$P\left(\text{Double Ones}\right)$P(Double Ones) | $=$= | $\frac{1}{6}\times\frac{1}{6}$16×16 |
$=$= | $\frac{1}{36}$136 |
If one ball is selected from bag 1 and one from bag 2 above, what is the probability that both selected balls are red?
The two selections are independent events, so we can multiply the probability of selecting a red from each bag.
$P\left(\text{Red, Red}\right)$P(Red, Red) | $=$= | $\frac{1}{6}\times\frac{1}{2}$16×12 |
$=$= | $\frac{1}{12}$112 |
Tree diagrams can be very useful to display the outcomes in a multi-stage events. Particularly if the number of options and stages is low. We can summarise the information by putting the probability of each stage on the branch and the outcome at the end of the branch. Probabilities of each outcome can be found by multiplying along a branch.
The following probability tree diagram shows the outcomes of playing two games of tennis where the probability of winning is $\frac{3}{10}$310 and the probability of losing is $\frac{7}{10}$710. (The probabilities can be written as fractions, decimals or percentages).
a) Find the probability of the player winning both games.
$P\left(\text{WW}\right)$P(WW) | $=$= | $P\left(W\right)\times P\left(W\right)$P(W)×P(W) |
$=$= | $0.3\times0.3$0.3×0.3 | |
$=$= | $0.09$0.09 |
b) Confirm the sum of the probabilities of all the outcomes is equal to $1$1.
$P\left(\text{WW or WL or LW or LL}\right)$P(WW or WL or LW or LL) | $=$= | $P\left(WW\right)+P\left(WL\right)+P\left(LW\right)+P\left(LL\right)$P(WW)+P(WL)+P(LW)+P(LL) |
$=$= | $0.09+0.21+0.21+0.49$0.09+0.21+0.21+0.49 | |
$=$= | $1$1 |
c) Find the probability of the player winning only one game.
$P\left(\text{WL or LW}\right)$P(WL or LW) | $=$= | $P\left(WL\right)+P\left(LW\right)$P(WL)+P(LW) |
$=$= | $0.3\times0.7+0.7\times0.3$0.3×0.7+0.7×0.3 | |
$=$= | $0.42$0.42 |
d) Find the probability of the player winning at least one game.
$P\left(\text{WW or WL or LW}\right)$P(WW or WL or LW) | $=$= | $P\left(WW\right)+P\left(WL\right)+P\left(LW\right)$P(WW)+P(WL)+P(LW) |
$=$= | $0.3\times0.3+0.3\times0.7+0.7\times0.3$0.3×0.3+0.3×0.7+0.7×0.3 | |
$=$= | $0.51$0.51 |
Or alternatively, use the complementary event of losing both games and calculate:
$P\left(\text{At least 1 win}\right)$P(At least 1 win) | $=$= | $1-P\left(LL\right)$1−P(LL) |
$=$= | $1-0.7\times0.7$1−0.7×0.7 | |
$=$= | $0.51$0.51 |
Reflect: Would these events be independent in real life? Might winning the first game impact the probability of winning the second game?
Things to note from using probability trees to calculate probabilities of multiple trials:
What is the probability of drawing a green counter from a bag of $5$5 green counters and $6$6 black counters, replacing it and drawing another green counter?
A coin is tossed, then the spinner shown is spun.
The blue segment is twice as big as the yellow one.
Create a probability tree that represents all possible outcomes.
What is the probability of throwing a heads and spinning a yellow?
What is the probability of throwing a heads, or spinning a yellow , or both?
Lucy has a box of Favourites chocolates. In this box there are $30$30 chocolates, $5$5 of which are Picnics.
Lucy takes and eats a chocolate without looking until she gets a Picnic.
What is the probability she only eats one chocolate? Express your answer as a simplified fraction.
What is the probability she eats only two chocolates? Give your answer correct to the nearest percent.
What is the probability she eats five chocolates? Give your answer correct to the nearest percent.
As she eats more and more chocolates, is the probability of the next chocolate being a Picnic getting higher or lower?
The probability is getting lower
The probability is getting higher.
The probability stays the same.
How many chocolates must Lucy have eaten to be certain that the next chocolate will be a Picnic?