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Constip8edSkunk

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hmm i got 1- n^(1-n) which is same as tornado... me check now...

edit: changed mind... got it wrong... should be n! cuz there are n! arrangments for n peope choosing n doors... damn:(
 
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freaking_out

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Originally posted by underthesun
Just curious.

I got i) n^n

and for the second, (n^n - n!)/n^n

is that what yous got?
i got the same, but i was scared, coz that looked simple-relative to the whole exam ofcourse. :D
 

enak

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Originally posted by Constip8edSkunk
should be n! cuz there are n! arrangments for n peope choosing n doors... damn:(
That's what I put down, I hope you're right :D
 

yeeha89

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What? I am pretty sure that the first part was n^2, which is n square man.
 

Constip8edSkunk

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i meant the n! in the numerator... like underthesun's answer instead of n... 1st part is n^n
 

Toodulu

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hmm i think it's meant to be n^n
like 5 people and 5 doors.. each person has 5 choices.. so 5.5.5.5.5
ie. 5^5
 
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I misread the second part... i thought it said "one door will not be chosen", missed the "at least" part.
 

freaking_out

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Originally posted by underthesun
yeah, i was thinking that too. Had a good 15 seconds thinking "I've got a bad feeling about this" :D
lucky i read the question though....i was treating it as a counting problem, at the start. :rolleyes:
 
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Can someone tell me how they got the solution to ii)? This is what i would have done (had i read the question properly):

Consider a particular door, the probability that it will be walked through is 1/(n^n). There are n doors so probability is n/(n^n)=1/n^(n-1).
 

Constip8edSkunk

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heres waht i thought

let x be the number of doors not opened
P(x>=1) = 1 - P(x=0)
P(x=0) = number of arrangements wif all doors chosen / total arrangments
=n!/n^n
.'. P(x>=1) = 1 - n!/n^n

i got n! mixed up with n :(
 

nerdd

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oh damn
i said n factorial for the first one and the second one was 1 - 1 on factorial to the n hahaha
so 1 - (1/n!)^n
 

walla

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hang on a sec
surely its quite simple
P(at least one door not chosen) = 1 - p(all doors chosen)
since there are n people and n doors,
the first person can choose n, the second person can choose (n-1) etc
then p(all doors chosen) = n!
then p(at least one door not chosen) = 1 - n!
 

walla

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oh god i really want to delete that post :)
 

ghoolz

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I put:
i) n! because n ppl can choose the first door then (n-1)ppl can choose the second and (n-2) the third and so on which makes n!
ii) 1 - (1/n!)
which then = (n! - 1)/n!

not sure how i got the second one but i sounded good in the exam room

thinking about it now it could actually be n^n because the n ppl can all go thru the one door. <shit>

confusing at 12:45am maybe tomorrow (or later today) to do it.
 

hagun

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Originally posted by Constip8edSkunk
heres waht i thought

let x be the number of doors not opened
P(x>=1) = 1 - P(x=0)
P(x=0) = number of arrangements wif all doors chosen / total arrangments
=n!/n^n
.'. P(x>=1) = 1 - n!/n^n

i got n! mixed up with n :(
In addition to that, I just wanna say that:
N! is the number of ways that each people through the same door
and from point i) N^N is the total number of ways...
 

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