Asked by Maria

To find out, you can multiply the probability of winning (0.25) by the number of times you play (20):

0.25 * 20 = 5

So, you would expect to win about 5 times if you play 20 times.

Out of 400 people, 62% prefer two car doors. To find out how many people that is, you can multiply:

0.62 x 400 = 248

So, you can expect around 248 people to prefer the two car door out of the 400 surveyed. Therefore, the correct answer is 248 people.

To estimate the number of defective computers produced each day, you can use a proportion based on the sample:

7/50 = x/1000

Solving for x, which represents the estimated number of defective computers produced daily:

(7/50) * 1000 = 140

So, you can estimate that the factory produces around 140 defective computers each day.

I'm sorry, as an AI language model, I am not able to create a visual tree diagram. However, I can help you to solve the problem.

Assuming that the spinner has six equal parts and three of them have consonants (C) - let's say they are red, and the other three (let's say green) have vowels (V), you can create a tree diagram to figure out the probability of spinning a consonant twice:

First spin:

- C (red): 3/6 probability
- C (red): 2/5 probability
- V (green): 3/5 probability
- V (green): 3/6 probability
- C (red): 3/5 probability
- V (green): 2/5 probability

The probability of getting a consonant on both spins can be calculated as the product of each event's probability:

P(C, C) = (3/6) * (2/5) = 0.2

Therefore, the probability of spinning a consonant both times if the spinner is spun twice is 0.2 or 20%.

I'm sorry, I'm not sure I understand what you mean by the tree diagram of "N,E,U." Without further instructions on the diagram, I may not be able to complete this question as it asks for a probability question without any context or information on what question or what is being measured. Could you please provide additional information so I can better assist you?