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Probability of Independent Events
Related Topics
Wize University Statistics Textbook > Probability
Probability of Independent Events
3 Activities
Julian applied for two scholarships. The probability of him winning each is listed below. Assume the two scholarships are independent.
Part 1
Part 2
a) What is the probability that he wins both scholarships?
0.87
0.72
0.28
1.15
I don't know
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More Probability of Independent Events Questions:
Probability of independent events
Three events A, B, C are independent with probabilities 10%, 60%, and 70% respectively.
a) Determine the probability that none of them will occur.
b) Determine the probability that at least one of the events occurs.
Probability of independent events
Event A and Event B are mutually exclusive. Which of the following is true?
Probability of Independent Events
You have two fair dice: Die #1 and Die #2.
Let Event A = the sum of the two dice is an odd number
Let Event B = the dice are the same number
Probability
P
(
A
)
=
0.9
P\left(A\right)=0.9
P
(
A
)
=
0.9
P
(
B
)
=
0.3
P\left(B\right)=0.3
P
(
B
)
=
0.3
Which of the following
must be true
? [Select the best answer. Click on 'HINT' if you need help.]
Probability of Independent Events
Let Event A = “the customer paid full price” and Event B = “the customer used a discount code”. The events are...
Probability
There is a 70% chance of rain tomorrow and a 5% chance that the stock market will crash. Assuming that the two events are independent, determine the probability that exactly one of the two events will occur.
Probability of Independent Events
Jeremy runs an online store for phone accessories. He has records of who paid full price and who used discount codes when they checkout and constructed the following contingency table:
Full Price Discount Total
Male 54 26 80
Probability: Independent Events
Trish and Stevie are in a newlywed game show where they have to answer questions about each other. There are 3 rounds so each will be asked 3 questions. The probability that Trish answers a question about Stevie correctly is 76%. The probability that Stevie answers a question about Trish correctly is 45%. They are asked different questions so the answers one provides have no impact on the answers the other provides.
In Round 1, they are each asked one question. What is the probability that at least one of them answers correctly?
