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Probability (1 Viewer)
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kawaiipotato
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- HSC
- 2015
Count the ways to fix the boys in a circle first. Then count the ways to place the girls between the boys.
This will be your desired outcomes, and your total outcomes is just 7!.
This will be your desired outcomes, and your total outcomes is just 7!.
The question's wording is such that it wants us to assume we have already picked 4 boys and 4 girls.But the question states "Chosen"
So if thats the case and we choose from the original 6 boys and 6 girls shouldnt you get this?
i) 12C8
ii) 6C4 x 6C4
iii) 4!3! / 7!
Draw a circle with 8 spots.
We 'fix' in 1 boy. 3 boys left. Now, we're going to place the boys making sure to leave a seat empty between each boy. 3 boys can go in 1st of those seats, 2 in the second, 1 in the last.
Now we will fill in the blanks with the girls. 4 girls can go in first of the empty spots, 3 in the second, etc.
therefore: 4! x 3!
Since they've asked us the probability, we need to answer in terms of total possible ways to arrange these 8 students in a circle, which is 7!.
Hence 4!3! / 7!
Note: HeroWise has done this visually in his/her drawing above
ii) 6C4 x 6C4
iii) 4!3! / 7!
Draw a circle with 8 spots.
We 'fix' in 1 boy. 3 boys left. Now, we're going to place the boys making sure to leave a seat empty between each boy. 3 boys can go in 1st of those seats, 2 in the second, 1 in the last.
Now we will fill in the blanks with the girls. 4 girls can go in first of the empty spots, 3 in the second, etc.
therefore: 4! x 3!
Since they've asked us the probability, we need to answer in terms of total possible ways to arrange these 8 students in a circle, which is 7!.
Hence 4!3! / 7!
Note: HeroWise has done this visually in his/her drawing above
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