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I have the following:

(p^a q (-1 + q^b))/(-p^a q - q^b + p^a q^b + q^(1 + b))

I want to do two things:

1) both the numberator and denominator factor out p and q so that they can cancel

2) force -1 + q^b to be shown as 1 - q^b

3) I also need to simplify the denominator one further step by merging -q^b+q^(1+b)=q^b(1-q) since 1-q->p

Would appreciate your help and suggestions.

share|improve this question
    
But -1 + q^b is not the same as 1 - q^b ... imagine q^b is 42, for a simple counter. –  user166390 Jan 22 '11 at 4:32
    
but you can multiply both numerator and denominator by -1 –  Qiang Li Jan 22 '11 at 4:37

1 Answer 1

For the second one, you could do:

expr = (p^a q (-1 + q^b))/(-p^a q - q^b + p^a q^b + q^(1 + b)) //. 
       {x__ (-1 + q ^b) -> -x (1 - q^ b)}  

Out:

-((p^a*q*(1 - q^b))/(-(p^a*q) - q^b + p^a*q^b + q^(1 + b)))

As for the first one, I don't see any gain ...

HTH!

Edit

Answering your comment:

I'm still not sure what are you trying to achieve with the first tranformation, but here is a try:

Numerator@expr/q/Collect[Distribute[Denominator@expr/q], q^(b - 1)]  

(p^a (1 - q^b))/(-p^a + (-1 + p^a) q^(-1 + b) + q^b)

alt text

Anyway, I think a warning is a must here: Forcing Mathematica to show results in an "elegant" way can be very tricky for large expressions. I suggest trying to learn how to do it only after you master Mma quite a bit. Then, as a simple exercise to get started you may try several ways to force Mma to show

-1+a

as

 a-1 
share|improve this answer
    
thanks. :) for the first Q, factoring out another p and q from both the denominator and numerator will make the expression look slicker. –  Qiang Li Jan 22 '11 at 16:26
    
thanks a lot. I haven't really thought about how to force mma to show expressions the way I want it to even though i have used mma for years. could you please list the methods to force mma to show -1+a as a-1, as I really do not know how to. thank you again! –  Qiang Li Jan 22 '11 at 19:52
    
@Qiang I think that is a very nice question to post as an independent one. Also, you may get better answers than mine by experienced Mma fellow users. –  belisarius Jan 22 '11 at 20:14

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