Question

How do you find the limit `(sqrt(x+1)-1)/(sqrt(x+4)-2)` as `x->0`?

Answer 1

Change the way the ratio is written.

Explanation:

By the time this problem is assigned, I assume students have seen things like

`lim_(xrarr0)(sqrt(9+x)-3)/x` which is found by 'rationalizing' the numerator:

`lim_(xrarr0)((sqrt(9+x)-3))/x*((sqrt(9+x)+3))/((sqrt(9+x)+3)) = lim_(xrarr0)1/((sqrt(9+x)-3)) = 1/6`

In this problem, use the same trick on both the numerator and denominator

`(sqrt(x+1)-1)/(sqrt(x+4)-2) = ((sqrt(x+1)-1))/((sqrt(x+4)-2)) * ((sqrt(x+1)+1)(sqrt(x+4)+2))/((sqrt(x+1)+1)(sqrt(x+4)+2))`

`= ((x+1-1)(sqrt(x+4)+2))/((x+4-4)(sqrt(x+1)+1))`

`= (x(sqrt(x+4)+2))/(x (sqrt(x+1)+1))`

`= (sqrt(x+4)+2)/ (sqrt(x+1)+1)` `" "` (for `x != 0`)

`lim_(xrarr0)(sqrt(x+1)-1)/(sqrt(x+4)-2) = lim_(xrarr0)(sqrt(x+4)+2)/ (sqrt(x+1)+1)`

`= (sqrt4+2)/(sqrt1+1) = 4/2=2`