tehsky
so lyk yeh.
Can anyone show me the full expansion..? as in what cancles with what factorial etc..the addition bit is confusng me :S
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Binomial help (1 Viewer)
- Thread starter tehsky
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vulgarfraction
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1- draw out a corresponding pascal's triangle. link- http://mathworld.wolfram.com/PascalsTriangle.html
2 (arrows bit)- note that a! = a* (a-1)!, and put in a common denominator.. Stuff cancels.
2 (arrows bit)- note that a! = a* (a-1)!, and put in a common denominator.. Stuff cancels.
tehsky
so lyk yeh.
yeah i know stuff cancels..
but i just want to see how and what cancels out; not automatically know it cancels =/
but i just want to see how and what cancels out; not automatically know it cancels =/
mmhmm i had this problem... but i fink i understand how they cancelled out...
you know the (n - k +1) ! i fink dey broke it up into (n -k)! x (n-k+1)
they then equated demoniators..... blah blah blah... and cancelled out..
im pretty sure.... thats what happened
you know the (n - k +1) ! i fink dey broke it up into (n -k)! x (n-k+1)
they then equated demoniators..... blah blah blah... and cancelled out..
im pretty sure.... thats what happened
Buiboi
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you understand how they got the denominator right?? (its just common denominator crap)tehsky said:Can anyone show me the full expansion..? as in what cancles with what factorial etc..the addition bit is confusng me :S
but heres some data:
r! = r (r-1)(r-2)(r-3)....= r (r-1)! hence, r!>(r-1)! by r
so basically of the r!, the (r-1)(r-2)... all cancel out which is = to (r-1)! thats why yo ucancel them, the r! is larger by r...you get me?
(n-r+1)!= (n-r+1) (n-r) (n-r-1)....= (n-r+1) (n-r)! hence (n-r+1)! >(n-r)! by (n-r+1)
same thing as i said b4?
oh shit i dunno how to explain lol.....but like can you work it out from what ive shown?
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From: n! / [r!.(n - r)!] + n! / [(r - 1)!.(n - r + 1)!]
Break the r! into r.(r - 1)! and the (n - r + 1)! into (n - r + 1).(n - r)!
= n! / [r.(r - 1)!.(n - r)!] + n! / [(r - 1)!.(n - r + 1).(n - r)!]
To make life easier, factorise out: n! / [(r - 1)!.(n - r)!]
= n! / [(r - 1)!.(n - r)!] { 1 / r + 1 / (n - r + 1) }
Now for the expression in { }, put over a common denominator:
= n! / [(r - 1)!.(n - r)!] x { [(n - r + 1) + r] / r.(n - r + 1) }
Now put the factor back in:
= [n!.(n - r + 1) + r.n!] / [r.(r - 1)!.(n - r + 1)(n - r)!]
= [n!.(n - r + 1) + r.n!] / [r!.(n - r + 1)!]
Break the r! into r.(r - 1)! and the (n - r + 1)! into (n - r + 1).(n - r)!
= n! / [r.(r - 1)!.(n - r)!] + n! / [(r - 1)!.(n - r + 1).(n - r)!]
To make life easier, factorise out: n! / [(r - 1)!.(n - r)!]
= n! / [(r - 1)!.(n - r)!] { 1 / r + 1 / (n - r + 1) }
Now for the expression in { }, put over a common denominator:
= n! / [(r - 1)!.(n - r)!] x { [(n - r + 1) + r] / r.(n - r + 1) }
Now put the factor back in:
= [n!.(n - r + 1) + r.n!] / [r.(r - 1)!.(n - r + 1)(n - r)!]
= [n!.(n - r + 1) + r.n!] / [r!.(n - r + 1)!]
tehsky
so lyk yeh.
Trebla said:
ahhhh
you sir are a genii
thank you so much