Terry Lee combinations question (1 Viewer)

porcupinetree · Aug 26, 2015

Could somebody please point out the flaw in my method for this question from Terry Lee? If it's hard to understand from the picture, my idea was to choose 1 ball from each colour set (hence [11C1]^4), and choose 2 more from any of the remaining 40.

InteGrand · Aug 26, 2015

porcupinetree said:
Could somebody please point out the flaw in my method for this question from Terry Lee? If it's hard to understand from the picture, my idea was to choose 1 ball from each colour set (hence [11C1]^4), and choose 2 more from any of the remaining 40.

Your way over-counts, because when you say you choose 1 ball from each set, then choose 2 more randomly, the 2 you choose randomly may be ones that in another case you counted as choosing as "1" from a set.

E.g. Say ball X is the orange ball #2. In your method, you count the following as different, when they should be considered the same:

• Pick X as the "1" to be orange, then pick 2 randomly after picking "1" for each other colour, and say one of these two picked is Ball Y, which is a different orange ball (say #6).

• Pick ball Y as the "1" to be orange, and pick X as one of the 2 randomly picked, with the other balls picked the same as the previous dot point.

porcupinetree · Aug 26, 2015

InteGrand said:
Your way over-counts, because when you say you choose 1 ball from each set, then choose 2 more randomly, the 2 you choose randomly may be ones that in another case you counted as choosing as "1" from a set.

E.g. Say ball X is the orange ball #2. In your method, you count the following as different, when they should be considered the same:

• Pick X as the "1" to be orange, then pick 2 randomly after picking "1" for each other colour, and say one of these two picked is Ball Y, which is a different orange ball (say #6).

• Pick ball Y as the "1" to be orange, and pick X as one of the 2 randomly picked, with the other balls picked the same as the previous dot point.

Ah, thankyou so much, I see now. One final question: what is the reason for the 2C1 in Terry's solution? I understand all of his other working but I don't see what the 2C1 is there for

InteGrand · Aug 26, 2015

porcupinetree said:
Ah, thankyou so much, I see now. One final question: what is the reason for the 2C1 in Terry's solution? I understand all of his other working but I don't see what the 2C1 is there for

$I don't see why it's there either. The $\binom{4}{2}$ is clearly there because that is the no. of ways to choose which colours will have 2 and which will have 1. Then once we have chosen this, there are $\binom{11}{1}$ ways to pick from colour $A$, $\binom{11}{1}$ ways to pick from colour $B$, $\binom{11}{2}$ ways to pick from colour $C$ and $\binom{11}{2}$ ways to pick from colour $D$, where $A$ is a colour that has only 1 picked, etc.$

porcupinetree · Aug 27, 2015

InteGrand said:
$I don't see why it's there either. The $\binom{4}{2}$ is clearly there because that is the no. of ways to choose which colours will have 2 and which will have 1. Then once we have chosen this, there are $\binom{11}{1}$ ways to pick from colour $A$, $\binom{11}{1}$ ways to pick from colour $B$, $\binom{11}{2}$ ways to pick from colour $C$ and $\binom{11}{2}$ ways to pick from colour $D$, where $A$ is a colour that has only 1 picked, etc.$

Yeah that's what I was thinking. Cheers for your help

Terry Lee combinations question (1 Viewer)

porcupinetree

not actually a porcupine

InteGrand

Well-Known Member

porcupinetree

not actually a porcupine

InteGrand

Well-Known Member

porcupinetree

not actually a porcupine

Users Who Are Viewing This Thread (Users: 0, Guests: 1)