Solving Binomial Expansions: Coefficient of x^k in (2x-1/x)^2007

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Homework Help Overview

The discussion revolves around finding the coefficient of x^k in the binomial expansion of (2x - 1/x)^2007. Participants are exploring the implications of the binomial theorem and the behavior of terms involving powers of x.

Discussion Character

  • Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • The original poster attempts to derive the coefficient using the binomial expansion formula but encounters difficulties with the variable x in the expression. Other participants clarify the relationship between the terms and the powers of x involved.

Discussion Status

The conversation is progressing with participants providing clarifications on the manipulation of terms within the binomial expansion. There is an acknowledgment of the original poster's confusion, and some participants are helping to clarify the correct interpretation of the powers of x.

Contextual Notes

The original poster is working under the constraints of a homework assignment, which may limit the exploration of alternative methods or deeper insights into the problem.

brunie
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Hi,
Im having some troubles with this binomial expansion...

Determine the coefficient of x^k, where k is any integer, in the expansion of (2x - 1/x)^2007.

I figured it would just be
C(2007,k) * (2x)^2007-k * (-1/x)^k
= C(2007,k) * (2)^2007-k * x^2007-k * (-1/x)^k

therefore the coefficient would only be the constant terms with no variables

but when i tried it on a smaller scale (ie small exponent), and factored it out, the equation i found doesn't work

i think it is due to the common variable x

anyone kno what to do?
 
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x doesn't drop out of that expression. The power is x^(2007-2*k).
 
so
(2x)^2007-k isn't equivalent to (2)^2007-k * x^2007-k ??
 
Sure it is. But x^(2007-k)*(1/x)^k=x^(2007-2*k).
 
ok yes that makes sense
thanks for ur help
 

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