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Hey, i am stuck on this question, although i think i have done a bit of it already...

 

here is what i have done so far....

 

we want an [math] N_\epsilon [/math] such that if [math] n \geq N [/math] then [math] |\frac{1}{x_n}-\frac{1}{x}| \leq \epsilon [/math]

 

we know (by the denition of a limit of a sequence)

[math]

|x_n - x| < \epsilon_2

[/math]

 

now

[math]

|\frac{1}{x_n}-\frac{1}{x}| = |\frac{x-x_n}{x \times x_n}| = |\frac{x_n-x}{x \times x_n}| = |x_n-x| \times |\frac{1}{x \times x_n}|

[/math]

 

so

[math]

|x_n-x| \times |\frac{1}{x \times x_n}| < \epsilon_2 \times \frac{1}{x \times x_n}

[/math]

 

 

but i am unsure of what to do next.

 

-Sarah :)

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