How can I write this sequence in terms of factorials?

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The discussion focuses on expressing the mathematical sequence n(n^2 - 1) in terms of factorials. The correct expression is identified as (n + 1)! / (n - 2)!. Participants discuss the method to derive this expression by expanding the numerator and denominator and canceling common factors. The importance of understanding factorial notation and its application in this context is emphasized. The thread concludes with an encouragement to explore the cancellation process to clarify the solution.
martinrandau
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Can anybody help me solving this?

Write in terms of factorials

n((n^2)-1)

The correct answer is
(n+1)!/(n-2)!

but I don't know how to get there, and since it's week- end I have no chance to ask anyone teachers, etc.
//Martin
 
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n(n2-1) = n(n-1)(n+1)
 
Originally posted by martinrandau
Can anybody help me solving this?

Write in terms of factorials

n((n^2)-1)

The correct answer is
(n+1)!/(n-2)!


Please notice the expression marks (!). The task is not to factorise it by "normal" means, but to find an expression as a sequence.
ex. 7! = 1 x 2 x 3 x 4 x 5 x 6 x 7 = 5040
n!= 1 x 2 x 3 x...x n

It's called the factorial r (!).
Thank you for your help anyway!
 
Originally posted by martinrandau
The correct answer is
(n+1)!/(n-2)!

I'll give you a hint.

Expand the numerator and denominator of the above ratio and cancel the factors common to both. For instance, the numerator is:

(n+1)!=(n+1)(n)(n-1)(n-2)...

Get the idea?
 
Yes!:smile:
Thank you!

//Martin
 

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