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6 votes
6 votes
The table shows the probabilities of winning or losing when the team is playing away

Home
Away
Total
Win
0.63
0.27
0.9
Loss
0.07
0.03
0.1
Total
0.7
0.3
1.00
(a) Are the events "winning" and "playing at home independent? Show your calculations to justify why or why not
(b) Are the events "losing" and "playing away" independent? Show your calculations to justify why or why
not.

The table shows the probabilities of winning or losing when the team is playing away-example-1
User David Mohundro
by
2.7k points

1 Answer

28 votes
28 votes

From the given table, we can deduce the following:

P(win) = 0.9

P(loss) = 0.1

P(Playing at home) = 0.7

P(Playing away) = 0.3

P(win at home) = 0.63

P(win away) = 0.27

P(Loss away) = 0.03

P(loss home) = 0.07

• (a) Are the events winning and playing at home independent.

Independent events are events that do not affect the probability of each other occuring.

We have:

P(winning) = 0.9

P(playing at home) = 0.7

P(win and playing at home) = 0.63

To determine if the events winning and playing at home is independent, we have:

P(win and playing at home) = P(win) x P(playing at home) = 0.9 x 0.7 = 0.63

0.63 = 0.9 x 0.7

0.63 = 0.63

Since the equation is true, the events winning and playing at home are independent.

• (b) Are the events "losing" and "playing away" independent? Show your calculations to justify why or why not.

From the table, we hae:

P(losing) = 0.1

P(Playing away) = 0.3

P(Losing and playing away) = 0.03

To determine if the events are independent or not, we have:

P(losing and playing away) = P(losing) x P(playing away)

0.03 = 0.1 x 0.3

0.03 = 0.03

SInce the equation is true, both events are independent.

ANSWER:

(a) The events are indepedent

(b) The events are indepedent

User Vinoth Gopi
by
3.3k points
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