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3u Mathematics Marathon V 1.1 (1 Viewer)
- Thread starter Riviet
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P
pLuvia
Guest
[spoiler ]*text*[ /spoiler]
But without the spaces
Edit: Meh
But without the spaces
Edit: Meh
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hyparzero
BOS Male Prostitute
15onebytwo said:
Next Question:
Mr. Jones's bathtub leaks water at a rate that is proportional to the volume of water in the tub. Continuously adding 5L/minute into the tub will just balance the loss through the leak when the tub contains 105 L of water.
One day, Mr. Jones could only allow the water to run for 15minutes before the tub was full. Determine the volume of water initally.
onebytwo
Recession '08
for the comb. question, apparently the answer is 15, so you guys are right
P
pLuvia
Guest
So would it be the same if lets say, 6 people were divided up into 3 groups, with groups of 2, so it was 6C2/3?
Sorry - just realised I called you Riviet 
I think that's a different case because you have to choose three groups. You would choose two from 6 for the first group, then have four left for the second and third groups. So I think you'd have 6C2 * 4C2/3! = 15 The 3! comes in because each different combination can happen in 3! different ways ie if you had AB, CD and EF you could arrange those groups in 3! different ways, but for our purposes they are all equivalent
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P
pLuvia
Guest
Ah ok, I sort of understand it now. So with that previous question, it's 5C1*4C2/2!, because you can arrange the two groups in 2! ways?
I looked at this solution. this solution is excellent but I have a shorter solution and I thought You might like this:Riviet said:
let n be an even integer. we consider (1+x)^n and (1-x)^n
(1+x)^n=1+nc1 x+nc2 x^2+nc3 x^3+...+ncn x^n
(1-x)^n=1-nc1 x+nc2 x^2-nc3 x^3+...+ncn x^n
(1+x)^n-(1-x)^n=2{nc1 x+ nc3 x^3+...}
let x=1
2^(n-1)=nc1+nc3+...
onebytwo
Recession '08
im probably wrong...but 9!/5!
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P
pLuvia
Guest
The vowels can only be in that order so 1 way
4! ways of arranging the other letters
So 4! ways?
4! ways of arranging the other letters
So 4! ways?
onebytwo
Recession '08
oh dear, 3 different answers!
i didnt give my reasoning, so here it is...
i didnt give my reasoning, so here it is...
the arrangement AEIOU is one arrangement out of 5!(120) arrangements
the arrangement AEIOU occurs just as many times as the others arrangements like AEUIO, EIUOA, OIUEA etc. so the total number of arrangemnts are 9!(because 9 different letters) and to have the vowels in one particular order we divide by 5!(120)........does that even make sense?......how times did i write "arrangement"?
the arrangement AEIOU occurs just as many times as the others arrangements like AEUIO, EIUOA, OIUEA etc. so the total number of arrangemnts are 9!(because 9 different letters) and to have the vowels in one particular order we divide by 5!(120)........does that even make sense?......how times did i write "arrangement"?
BIRUNI said:
I think I agree with onebytwo's logic - the probability of that arrangement is 1/5! so 9!/5! appears right.
Alternative method - Set the vowels in order
A E I O U
THen four of the remaining nine spots are left so you can place the consonants in 9P4 ways which is the same as 9!/5! = 3024
Alternative method - Set the vowels in order
A E I O U
THen four of the remaining nine spots are left so you can place the consonants in 9P4 ways which is the same as 9!/5! = 3024
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