How do you find the limit of $(x-4)/(sqrt(x-3)-sqrt(5-x))$ as x approaches 4?

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Answer 1 · 2015-04-13T18:25:58

The answer is: $1$ .

This limit shows up in the $0/0$ indecision form, so we have to rationalise.

$lim_(xrarr4)(x-4)/(sqrt(x-3)-sqrt(5-x))=$

$=lim_(xrarr4)[(x-4)/(sqrt(x-3)-sqrt(5-x))*(sqrt(x-3)+sqrt(5-x))/(sqrt(x-3)+sqrt(5-x))]=$

$=lim_(xrarr4)[(x-4)(sqrt(x-3)+sqrt(5-x))]/(x-3-5+x)=$

$=lim_(xrarr4)[(x-4)(sqrt(x-3)+sqrt(5-x))]/(2x-8)=$

$=lim_(xrarr4)[(x-4)(sqrt(x-3)+sqrt(5-x))]/[2(x-4)]=$

$=lim_(xrarr4)[(sqrt(x-3)+sqrt(5-x))]/2=(sqrt(4-3)+sqrt(5-4))/2=1$ .

Answer 2 · 2015-04-13T18:27:36

Rationalize the denominator by multiplying the fraction by $1$ in the form:

$(sqrt(x-3)+sqrt(5-x))/(sqrt(x-3)+sqrt(5-x))$

This works because $(a-b)(a+b) = a^2-b^2$ ,

so $(sqrta-sqrtb)(sqrta+sqrtb) = a-b$ . It looks like this:

$((x-4))/((sqrt(x-3)-sqrt(5-x))) ((sqrt(x-3)+sqrt(5-x)))/((sqrt(x-3)+sqrt(5-x)))$

$=((x-4) (sqrt(x-3)+sqrt(5-x)))/((x-3)-(5-x)$

$=((x-4) (sqrt(x-3)+sqrt(5-x)))/(2x-8)$

$=((x-4) (sqrt(x-3)+sqrt(5-x)))/(2(x-4))$

$=(sqrt(x-3)+sqrt(5-x))/2$

So, we have:

$lim_(x rarr 4) (x-4)/(sqrt(x-3)-sqrt(5-x))=lim_(xrarr4) (sqrt(x-3)+sqrt(5-x))/2$

$= 2/2=1$

How do you find the limit of (x-4)/(sqrt(x-3)-sqrt(5-x))(x-4)/(sqrt(x-3)-sqrt(5-x)) as x approaches 4?