Series Expansion: Finding Limit x→0 of 1/(Sin^2(x))-1/x^2

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Homework Help Overview

The discussion revolves around finding the limit as x approaches 0 for the expression 1/(sin^2(x)) - 1/x^2 using series expansion techniques. The subject area involves calculus and series expansions related to trigonometric functions.

Discussion Character

  • Exploratory, Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • The original poster attempts to use a series expansion for sin^2(x) but is questioned about the omission of higher order terms and their impact on the limit. Some participants suggest ensuring that enough terms are included to accurately capture the behavior of the expression as x approaches 0.

Discussion Status

The discussion is ongoing, with participants exploring the implications of including higher order terms in the series expansion. There is a focus on understanding how these terms affect the limit, and some guidance has been provided on factoring and expanding the expression.

Contextual Notes

Participants are navigating the constraints of series expansion and the need to justify the omission of certain terms in the limit process. There is an emphasis on ensuring that the approach remains valid as x approaches 0.

Physicist_FTW
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use series expansion to fine the limit as x--->0 of

1/(sin^2)(x) - 1/x^2






Sin^2(x)=(X-X^3/3!)^2 I've assumed this gave me
Sin^2(x)=X^2-2X^4/6+X^6/36
flip this over is that equivalent to 1/Sin^2(x)?
 
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It's not totally equivalent because you omitted higher order terms. Can you show you have enough terms to capture the behavior of 1/sin^2(x)-1/x^2 in the sense that terms that you omitted will go to zero as x->0?
 
Im sorry I am not quite sure what you mean by that?
 
I'm just saying sin(x) isn't equal to x-x^3/3!. You omitted the higher order terms, like x^5/5!. As you work out the limit you'll want to convince yourself that including them doesn't affect the limit as x->0. Do you know how to find the limit of 1/(x-x^3/3!)^2-1/x^2?
 
Actually no i dont, maybe you could explain to me how?
 
Factor the denominator of x-x^3/6 as x*(1-x^2/6). So you've got (1/x)*(1/(1-x^2/6)). Use that 1/(1-a)=1+a+a^2+a^3+... (the usual geometric series thing) to move the second factor into the numerator.
Now you've got (1/x)^2*(1+x^2/6+...)^2-1/x^2. Expand it. Now go back and figure out why I didn't need to keep any higher powers of x than I did.
 

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