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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. 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 twice0. The spinner is divide
d into equal parts, with 4 sections labeled A, E, I, and O. The probability of spinning a vowel on the first spin is 4/4 = 1.
Using a tree diagram, we can show the possible outcomes when spinning the spinner twice:
A E I O
/ \ / \ / \ / \
A E A E A E A E
/ \ / \ / \ / \ / \ / \ / \ / \
A E A E A E A E A E A E A E A E
The probability of landing on a vowel on the second spin is also 4/4 = 1.
Using the multiplication rule of probability, we can find the probability of landing on a vowel both times:
P(vowel on first spin) x P(vowel on second spin) = 1 x 1 = 1
Therefore, the probability of landing on a vowel both times if the spinner is spun twice is 1 or 100%.
To find the probability that the spinner will land on a vowel both times if it is spun twice, we can use a tree diagram. Since the problem states that the spinner is divided into equal parts, we assume that there are an equal number of vowels and consonants on the spinner.
Let's start by drawing the tree diagram:
S
/ \
V C
/ \ / \
V C V C
In the tree diagram, S represents the first spin, with V representing a vowel and C representing a consonant. Since the spinner is divided into equal parts, there is a 50% chance of spinning a vowel or a consonant for each spin.
Now, let's calculate the probabilities:
- The probability of landing on a vowel on the first spin is 0.5 (50%).
- If the first spin lands on a vowel (V), there is a 50% chance of landing on a vowel on the second spin.
- If the first spin lands on a consonant (C), there is also a 50% chance of landing on a vowel on the second spin.
To find the probability of both spins landing on a vowel, we multiply the probabilities together:
P(Vowel on first spin and second spin) = P(Vowel on first spin) × P(Vowel on second spin | Vowel on first spin)
= 0.5 × 0.5
= 0.25
Therefore, the probability that the spinner will land on a vowel both times if it is spun twice is 0.25, or 25%.