the letter tiles S M I L E are placed on a box without looking james picks a letter tile from the box which model represents the possible outcomes of james expiriment
The possible outcomes of James picking a letter tile from the box without looking can be represented by a probability model as follows:
- S: 1/5 chance
- M: 1/5 chance
- I: 1/5 chance
- L: 1/5 chance
- E: 1/5 chance
These probabilities represent the likelihood of James picking each of the letter tiles from the box.
from 0.00 to 0.25
The representation of the possible outcomes of James picking a letter tile from the box without looking in terms of probabilities ranging from 0.00 to 0.25 can be shown as follows:
- S: 0.20 (1/5 chance)
- M: 0.20 (1/5 chance)
- I: 0.20 (1/5 chance)
- L: 0.20 (1/5 chance)
- E: 0.20 (1/5 chance)
Each outcome has an equal probability of 0.20, which falls within the range from 0.00 to 0.25.
the sample space of an expirement is S = a b c d e f What is the probability of picking a consonant write your answert in the simplest fraction form
In the sample space S = {a, b, c, d, e, f}, the consonants are b, c, d, and f. There are 4 consonants in the sample space.
The total number of outcomes in the sample space is 6.
Therefore, the probability of picking a consonant is:
Number of favorable outcomes (consonants) / Total number of outcomes
= 4 / 6
= 2 / 3
Thus, the probability of picking a consonant is 2/3.
Use the uniform probability model to find the probability of selecting a vowel letter from the word M O D E L S all of the probability is 1/6 fraction
In the word MODELS, the vowels are O and E. There are 2 vowels in the word.
The total number of letters in the word MODELS is 6.
According to the uniform probability model, each letter has an equal probability of 1/6.
Therefore, the probability of selecting a vowel (O or E) from the word MODELS is:
Number of favorable outcomes (vowels) / Total number of outcomes
= 2 (vowels) / 6 (total number of letters)
= 1/3
Thus, the probability of selecting a vowel letter from the word MODELS using the uniform probability model is 1/3.
A deck of 10 cards labeled 1-10 is shuffled one card is selected at random if the expiriments repeated 120 times how many times will you expect to select number 5
Since there are 10 cards labeled from 1 to 10, and each card has an equal probability of being selected, the probability of selecting number 5 is 1/10.
If the experiment is repeated 120 times, we can expect to select number 5 approximately 1/10 of the time.
Expected number of times we will select number 5 = (1/10) * 120 = 12
Therefore, we can expect to select the number 5 approximately 12 times out of the 120 repetitions of the experiment.