1. You mix the letters: S E M I T R O P I C A and L thoroughly. Without looking you draw one letter. Find the probability that you select a vowel. From a fraction to simplest form.

12/5*****
5/12
1/3
7/12

2. You roll a standard cube once. Fine P(0)
7/6
1
1/2
0*****

3. This question is for 3 and 4. From a barrel of colored marbles you randomly select 7 blue 5 yellow 8 red 4 green and 6 purples. Find the experimental probability of randomly selecting a marble that is not yellow.
1/30*****
5/6
2/15
1/6

4. Find the experimental probability selecting a marble that is either green or purple.
1/10
1/5
1/3
2/15*****

5. Clarissa is having lunch at a sandwich shop. She can choose white bread or pumpernickel bread. Her options for filling are turkey, tuna, ham, or egg salad. Her choices for condiments are mayo, salad dressing, or mustard. How many different sandwich choices can Clarissa have?
36
6
24 *****
12

is 3. 5/6

4. 1/5

1. Sorry, I can't assist with that. My specialty is humor, not math!

2. What did the dice say after rolling? "Let's roll again!"
3. Q: Why did the marble go to the party? A: Because it was feeling blue!
4. Q: Why did the marble join the circus? A: It wanted to show off its colorful skills!
5. Clarissa has so many sandwich choices; she could open her own sandwich museum!

1. You mix the letters: S E M I T R O P I C A and L thoroughly. Without looking, you draw one letter. The probability of selecting a vowel can be found by counting the number of vowels in the given letter pool.

In this case, the vowels are E, I, O, and A. There are a total of 4 vowels in the letter pool.

The probability of selecting a vowel is the number of favorable outcomes (selecting a vowel) divided by the total number of possible outcomes (total letters in the pool).

Total letters in the pool = 14 (S, E, M, I, T, R, O, P, I, C, A, L, and L)

Therefore, the probability of selecting a vowel is 4/14.

To simplify this fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 2.

So, the simplified fraction is 2/7.

Therefore, the correct answer is 2/7.

2. You roll a standard cube once. The probability of rolling a 0 is 0 because a standard cube has only numbers 1, 2, 3, 4, 5, and 6 on its faces. There is no 0 on a standard cube.

Therefore, the correct answer is 0.

3. From a barrel of colored marbles, you randomly select 7 blue, 5 yellow, 8 red, 4 green, and 6 purple marbles. To find the experimental probability of randomly selecting a marble that is not yellow, we need to calculate the ratio of the number of non-yellow marbles to the total number of marbles.

The number of non-yellow marbles is 7 blue + 8 red + 4 green + 6 purple = 25.

The total number of marbles is 7 blue + 5 yellow + 8 red + 4 green + 6 purple = 30.

Therefore, the probability of selecting a marble that is not yellow is 25/30.

To simplify this fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 5.

So, the simplified fraction is 5/6.

Therefore, the correct answer is 5/6.

4. To find the experimental probability of selecting a marble that is either green or purple, we need to calculate the ratio of the number of green and purple marbles to the total number of marbles.

The number of green and purple marbles is 4 green + 6 purple = 10.

The total number of marbles is 7 blue + 5 yellow + 8 red + 4 green + 6 purple = 30.

Therefore, the probability is 10/30.

To simplify this fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 10.

So, the simplified fraction is 1/3.

Therefore, the correct answer is 1/3.

5. Clarissa can choose 2 types of bread, 4 types of filling, and 3 types of condiments for her sandwich.

Therefore, the total number of different sandwich choices Clarissa can have is 2 (bread) × 4 (filling) × 3 (condiments) = 24.

Therefore, the correct answer is 24.

1. To find the probability of selecting a vowel, we first need to determine the total number of letters.

The given set of letters consists of 14 letters: S E M I T R O P I C A L.

Out of these 14 letters, there are 4 vowels: E, I, O, and A.

The probability of selecting a vowel can be calculated as the ratio of the number of favorable outcomes (selecting a vowel) to the number of possible outcomes (total letters).

Therefore, the probability of selecting a vowel is 4/14.

To simplify this fraction, we can divide both numerator and denominator by their greatest common divisor, which is 2.

So, the simplest form of the fraction 4/14 is 2/7.

Therefore, the answer is 2/7.

2. When rolling a standard cube, there are 6 possible outcomes, which are the numbers 1 to 6 that can appear on the top face of the cube.

However, we are asked to find P(0), which means the probability of rolling a 0. Since there is no 0 on a standard cube, the probability of rolling a 0 is 0.

Therefore, the answer is 0.

3. We have a total of 7 + 5 + 8 + 4 + 6 = 30 marbles in the barrel.

Out of these 30 marbles, 5 of them are yellow.

To find the experimental probability of randomly selecting a marble that is not yellow, we subtract the number of yellow marbles from the total number of marbles and divide it by the total number of marbles.

Therefore, the probability is (30 - 5) / 30 = 25/30 = 5/6.

Therefore, the answer is 5/6.

4. To find the experimental probability of selecting a marble that is either green or purple, we need to find the number of green and purple marbles and divide it by the total number of marbles.

In this case, there are 4 green marbles and 6 purple marbles, making a total of 4 + 6 = 10 green or purple marbles.

Dividing this by the total of 30 marbles, we get a probability of 10/30 = 1/3.

Therefore, the answer is 1/3.

5. To find the number of different sandwich choices, we need to multiply the number of choices for each component (bread, filling, and condiments).

For bread, there are 2 options: white bread or pumpernickel bread.

For filling, there are 4 options: turkey, tuna, ham, or egg salad.

For condiments, there are 3 options: mayo, salad dressing, or mustard.

Multiplying these together, we get: 2 (bread) x 4 (filling) x 3 (condiments) = 24.

Therefore, Clarissa can have 24 different sandwich choices.

#1, how many vowels do you see?

how many letters in total?
btw, the prob(any event) can NEVER be greater than 1
#2 correct
#3 answered in your previous post
#4 answered in your previous post
#5 correct