How do you find $lim (x-1)/(x-2sqrtx+1)$ as $x->1^+$ ?

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How do you find $lim (x-1)/(x-2sqrtx+1)$ as $x->1^+$ ?

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Answer 1 · 2017-03-02T01:29:52

See below.

Explanation:

$(x-1)/(x-2sqrtx+1) = ((sqrtx+1)(sqrtx-1))/(sqrtx-1)^2$

$= (sqrtx+1)/(sqrtx-1)$ $" "$ for $x != 1$

$lim_(xrarr1^+) (x-1)/(x-2sqrtx+1) = lim_(xrarr1^+) (sqrtx+1)/(sqrtx-1)$

$= 2/0^+ = oo$

The notation in the last line is intended to indicate that the numerator approaches $2$ and the denominator goes to $0$ through positive values.
The result is a quotient that is increasing without bound.

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How do you find $lim (x-1)/(x-2sqrtx+1)$ as $x->1^+$ ?

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Explanation:

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How do you find $lim (x-1)/(x-2sqrtx+1)$ as $x->1^+$ ?