it's a new semester! students are grouped into three clubs, which each has 10,4 and 5 students. in how many ways can teachers select 2 students from all these clubs so that they are from different clubs
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Answers
Here we must see in how many different ways we can select 2 students from the 3 clubs, such that the students do not belong to the same club. We will see that there are 110 different ways in which 2 students from different clubs can be selected.
So there are 3 clubs:
Club A, with 10 students.
Club B, with 4 students.
Club C, with 5 students.
The possible combinations of 2 students from different clubs are
Club A with club B
Club A with club C
Club B with club C.
The number of combinations for each of these is given by the product between the number of students in the club, so we get:
Club A with club B: 10*4 = 40
Club A with club C: 10*5 = 50
Club B with club C. 4*5 = 20
For a total of 40 + 50 + 20 = 110 different combinations.
This means that there are 110 different ways in which 2 students from different clubs can be selected.
If you want to learn more about combination and selections, you can read:
brainly.com/question/251701
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