How do you find the limit of $(sqrt(3x - 2) - sqrt(x + 2))/(x-2)$ as x approaches 2?

Question

How do you find the limit of $(sqrt(3x - 2) - sqrt(x + 2))/(x-2)$ as x approaches 2?

2 Answers

Impact of this question

17906 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-03-11T23:06:09

$lim_(x->2)(sqrt(3x-2)-sqrt(x+2))/(x-2)=1/2$

Explanation:

The first thing we do in limit problems is substitute the $x$ value in question and see what happens. Using $x=2$ , we find:
$lim_(x->2)(sqrt(3x-2)-sqrt(x+2))/(x-2)=(sqrt(3(2)-2)-sqrt((2)+2))/((2)-2)=(sqrt(4)-sqrt(4))/0=0/0$

You may be wondering how this helps us. Well, because we have $0/0$ , this problem becomes fair game for an application of L'Hopital's Rule. This rule says that if we evaluate a limit and get $0/0$ or $oo/oo$ , we can find the derivative of the numerator and denominator and try evaluating it then.

So, without further ado, let's get to it.

Derivative of Numerator
We're trying to find $d/dx (sqrt(3x-2)-sqrt(x+2))$ here. Using the sum rule, we can simplify this to $d/dxsqrt(3x-2)-d/dxsqrt(x+2)$ . Taking the derivative of the first term, we see:
$d/dxsqrt(3x-2)=(3x-2)^(1/2)=3/(2sqrt(3x-2))->$ Using power rule and chain rule

For the second term,
$d/dxsqrt(x+2)=(x+2)^(1/2)=1/(2sqrt(x+2))->$ Using power rule

Thus, our new numerator is: $3/(2sqrt(3x-2))-1/(2sqrt(x+2))$ .

Derivative of Denominator
This one is fairly easy: $d/dx(x-2)=1$ . Yep, that's it.

Put it all Together
Combining these two results into one, our new fraction is $(3/(2sqrt(3x-2))-1/(2sqrt(x+2)))/1=3/(2sqrt(3x-2))-1/(2sqrt(x+2))$ . We can now evaluate it at $x=2$ and see if anything changes:
$lim_(x->2)(3/(2sqrt(3x-2))-1/(2sqrt(x+2)))=3/(2sqrt(3(2)-2))-1/(2sqrt((2)+2))=3/(2sqrt(4))-1/(2sqrt(4))=1/2$

And there you have it! We can confirm this result by looking at the graph of $(sqrt(3x-2)-sqrt(x+2))/(x-2)$ :
graph{(sqrt(3x-2)-sqrt(x+2))/(x-2) [-0.034, 3.385, -0.205, 1.504]}

Answer 2 · 2016-03-14T21:18:31

If your calculus course has not yet covered derivatives and l'Hospital's rule, use algebra to rationalize the numerator.

Explanation:

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

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

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

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

So we have

$lim_(xrarr2)(sqrt(3x-2)-sqrt(x+2))/(x-2) = lim_(xrarr2)2/(sqrt(3x-2)+sqrt(x+2))$

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

$= 2/(sqrt(4)+sqrt(4)) = 2/(2+2) = 1/2$

Science

Math

Humanities

... and beyond

How do you find the limit of $(sqrt(3x - 2) - sqrt(x + 2))/(x-2)$ as x approaches 2?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you find the limit of (sqrt(3x - 2) - sqrt(x + 2))/(x-2) (sqrt(3x - 2) - sqrt(x + 2))/(x-2) as x approaches 2?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question

How do you find the limit of $(sqrt(3x - 2) - sqrt(x + 2))/(x-2)$ as x approaches 2?