Students in the 7th and 8th grade at lamawinner Middle School or going on a field trip to the aquarium if a student actively participates in the activities fair entered into a raffle to win a free lunch
Seventh grade homeroom a 8 students
Seventh grade homeroom b 10 students
Seventh grade homeroom c 7 students
Eighth grade homeroom a 9 students
Eighth grade homeroom b 10 students
Eighth grade homeroom c 9 students
What is the probability of the winner being a 7th grader in homeroom c
There are a total of 43 students participating in the activities fair (8+10+7+9+10+9=43).
The probability of the winner being a 7th grader in homeroom c is calculated by taking the number of students in that specific homeroom and dividing it by the total number of students participating in the fair, which is 7/43.
Therefore, the probability of the winner being a 7th grader in homeroom c is approximately 0.163 or 16.3%.
Fraction answers only
The fraction answer is 7/43.
The answers are 7/9
7/25
7/16
7/53
Apologies for the error in the initial response.
The correct fraction answer is 7/43.
What is the probability of the winner not in homeroom b
To find the probability of the winner not being in homeroom b, we need to calculate the total number of students in homeroom b and then subtract that from the total number of students participating in the activities fair.
Total number of students in homeroom b = 10
Total number of students participating in the fair = 43
Number of students not in homeroom b = Total number of students - Number of students in homeroom b
Number of students not in homeroom b = 43 - 10 = 33
Therefore, the probability of the winner not being in homeroom b is 33/43.