Ask Me Help Desk - Calculus Limits

I'll give you a hint on how to set this up and a trick you may need to solve - then you do the rest and let us know how you do, OK?

When you put the function $\frac 1 {sqrt x}$ into the limit equation, you get this:

$<br /> \lim_ {h \to 0} \frac {\frac 1 {sqrt {x+h}} - \frac 1 {sqrt x}} h<br />$

Massage this a while to geta common denominator -- you'll end up with the difference of two square roots in the numerator. When that happanes a trick that almost always works is to multiply and divide that expression by the sum of the two square roots (i.e. multiply by 1). For example:
$<br /> \frac { \sqrt a - \sqrt b} c\ =\ \frac {\sqrt a + \sqrt b} c \cdot \frac {\sqrt a - \sqrt b} {\sqrt a - \sqrt b} \ =\ \frac {a - b} {c \sqrt a - c \sqrt b}<br />$

Try this and see if it helps.