Asked by Me
Which data set has the highest median
11,15,16,8,12,14
8,20,13,14,12,9
1,6,15,7,15,18,14
1,10,8,29,14,17,3
11,15,16,8,12,14
8,20,13,14,12,9
1,6,15,7,15,18,14
1,10,8,29,14,17,3
Answers
Answered by
man44
0. The spinner is divided into equal parts. Use a tree diagram to find the probability that the
spinner will land on a vowel both times if the spinner is spun twice
spinner will land on a vowel both times if the spinner is spun twice
Answered by
Bot
The first data set, 11,15,16,8,12,14, has the highest median of 13.5.
Answered by
Bot
Unfortunately, as an AI language model, I cannot create visual diagrams. However, I can provide you with the steps to solve this problem:
To find the probability that the spinner will land on a vowel both times if the spinner is spun twice, we need to use the multiplication rule of probability.
Step 1: Determine the probability of the first spin landing on a vowel. Let's say this probability is 2/5, as there are 2 vowels out of a total of 5 equally likely outcomes on the spinner.
Step 2: Create a tree diagram that branches out to the possible outcomes of the second spin, given the first spin result.
Step 3: Calculate the probability of the second spin also landing on a vowel for each possible outcome.
Step 4: Multiply the probability of the first spin landing on a vowel by the probability of the second spin landing on a vowel, for each outcome in the tree diagram.
Step 5: Add up all the probabilities of getting two vowels in a row from the different branches to get the final probability.
For example, the tree diagram could look like this:
/ V (2/5) -- V (1/2) = 1/5
V --|
\ C (3/5) -- V (2/3) = 2/5
In this case, there are two possible branches that lead to getting two vowels in a row. We calculated the probability of each outcome along the branches by multiplying the probabilities of the individual spin results. Adding these up gives us the final probability:
P(two vowels) = 1/5 + 2/5 = 3/5
Therefore, the probability that the spinner will land on a vowel both times if the spinner is spun twice is 3/5.
To find the probability that the spinner will land on a vowel both times if the spinner is spun twice, we need to use the multiplication rule of probability.
Step 1: Determine the probability of the first spin landing on a vowel. Let's say this probability is 2/5, as there are 2 vowels out of a total of 5 equally likely outcomes on the spinner.
Step 2: Create a tree diagram that branches out to the possible outcomes of the second spin, given the first spin result.
Step 3: Calculate the probability of the second spin also landing on a vowel for each possible outcome.
Step 4: Multiply the probability of the first spin landing on a vowel by the probability of the second spin landing on a vowel, for each outcome in the tree diagram.
Step 5: Add up all the probabilities of getting two vowels in a row from the different branches to get the final probability.
For example, the tree diagram could look like this:
/ V (2/5) -- V (1/2) = 1/5
V --|
\ C (3/5) -- V (2/3) = 2/5
In this case, there are two possible branches that lead to getting two vowels in a row. We calculated the probability of each outcome along the branches by multiplying the probabilities of the individual spin results. Adding these up gives us the final probability:
P(two vowels) = 1/5 + 2/5 = 3/5
Therefore, the probability that the spinner will land on a vowel both times if the spinner is spun twice is 3/5.
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