Perms (1 Viewer)

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
The letters of the word CALCULUS are arranged in a row
(i) How many different arrangements are possible? (I can do this) = 5040
(ii) If one of these arrangements is selected at random, what is the probability that it begins with 'U' and ends in 'U'?

I can do (ii) using 2U level probability (ie. 2/8 * 1/7), but surely there must a be a 3U way that incorperates the answer in (i)?

Thanks
 
Last edited:

lychnobity

Active Member
Joined
Mar 9, 2008
Messages
1,292
Gender
Undisclosed
HSC
2009
The betters of the word CALCULUS are arranged in a row
(i) How many different arrangements are possible? (I can do this) = 5040
(ii) If one of these arrangements is selected at random, what is the probability that it begins with 'U' and ends in 'U'?

I can do (ii) using 2U level probability (ie. 2/8 * 1/7), but surely there must a be a 3U way that incorperates the answer in (i)?

Thanks
ii) You're 2u level method is wrong imo

It should be something like:

(6!/(3!2!))/5040
 

Timothy.Siu

Prophet 9
Joined
Aug 6, 2008
Messages
3,449
Location
Sydney
Gender
Male
HSC
2009
The betters of the word CALCULUS are arranged in a row
(i) How many different arrangements are possible? (I can do this) = 5040
(ii) If one of these arrangements is selected at random, what is the probability that it begins with 'U' and ends in 'U'?

I can do (ii) using 2U level probability (ie. 2/8 * 1/7), but surely there must a be a 3U way that incorperates the answer in (i)?

Thanks
i)8!/2!2!2!
ii)(6!/2!2!)/(8!/2!2!2!)
 

Timothy.Siu

Prophet 9
Joined
Aug 6, 2008
Messages
3,449
Location
Sydney
Gender
Male
HSC
2009
ii) You're 2u level method is wrong imo

It should be something like:

(6!/(3!2!))/5040
its right.
its basically the same thing.
his way, you're doing the probability of having a word with first U and last U.
2/8 x 1/7. its definitely right.
 

mchew92

New Member
Joined
Nov 14, 2008
Messages
13
Gender
Male
HSC
2010
Hey min?
Its pretty much CALCULUS ignoring the Us

so its 6!/(2!2!) / 5040

where 8!/2!2!2!= 5040
 

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

Top