L'Hopitals rule and application in limits and limits

[moocav]

Homework Statement

http://img227.imageshack.us/img227/9792/hopitalsruleandlimits.png
Ive added a picture of the question. I know that L'hopitals rule is lim x->a f(x)/g(x) = lim x->a f'(x)/g'(x) but I don't understand how to apply it in this situation >< and the other questions I don't understand how to start off and what to get to. If anyone could please help me with ANY of the questions i would be so grateful!

Homework Equations

The Attempt at a Solution

progress so far
a) I don't know how get it from positive and from the negative side using the rule, but I used values and from below 1/2 and it approaches 0 from the positive and from above 1/2 it approaches 0

b) i) I've shown its an even function using x= 1 and x= -1
ii) uses stuff from a) so I don't know how to do it. but i assume it does has a limit.. i don't know an explanation though
iii) wild guess.. limit at -1/2 and 1/2 should be.. 0? but why? (if it does = 0)

c) i) I know how to find the derivative using the product rule but I don't understand why its x > 1/2 and -1/2 < x < 1/2
ii) similar to a) don't know how to do that
iii) don't know
iv) f'(3/4) i subbed in the value to upper derivative from above and i get to log [ (5/4)^1/4 / 4^5/4 ] and I am not sure how to go from there
f'(5/6) = log [ (4/3)^1/3 / 3^4/3 how can i simplify that..?
and i don't know what the second part of the question means
v) don't know

d) any easy way of finding f"(x)? or do i have to find the equ using quotient rule and not sure what the explanation should be

e) same with a), not sure how to calculate from infinity from +side and -side.. sub values?

 

[zachzach]

Your link does not work

 

[gabbagabbahey]

a) I don't know how get it from positive and from the negative side using the rule, but I used values and from below 1/2 and it approaches 0 from the positive and from above 1/2 it approaches 0

Right, the limit will indeed be zero from both sides. To show this explicitly, use the hint they provided.

For x&gt;\frac{1}{2},

\begin{aligned}\ln\left|x-\frac{1}{2}\right|\ln\left|x+\frac{1}{2}\right| &amp;= \ln\left(x-\frac{1}{2}\right)\ln\left(x+\frac{1}{2}\right) \\ &amp;=\left(\frac{\ln\left(x-\frac{1}{2}\right)}{\frac{1}{x-\frac{1}{2}}}\right)\left(\frac{\ln\left(x-\frac{1}{2}\right)}{x-\frac{1}{2}}\right) \end{aligned}

If you simply substitute x=\frac{1}{2} into this expression, you get \left(\frac{\infty}{\infty}\right)\left(\frac{0}{0}\right) and so it is in one of the forms that allows you to use L'Hopitals rule.

b) i) I've shown its an even function using x= 1 and x= -1

But that doesn't show its even...it only shows that f(1)=f(-1)...to show its even for all x (except x=\pm\frac{1}{2}), you need to show that \ln\left|(-x)-\frac{1}{2}\right|\ln\left|(-x)+\frac{1}{2}\right|=\ln\left|x-\frac{1}{2}\right|\ln\left|x+\frac{1}{2}\right|. That should be fairly easy because of the absolute values (use the fact that |-a|=|a|).

ii) uses stuff from a) so I don't know how to do it. but i assume it does has a limit.. i don't know an explanation though

In part a, you should end up with \lim_{x\to \frac{1}{2}}f(x)=0...using the substitution u=-x, you can write this as

\lim_{(-u)\to \frac{1}{2}}f(-u)=\lim_{u\to -\frac{1}{2}}f(-u)=0

If f(x) is even, what does that tell you? (keep in mind, that in this limit, u is essentially a dummy variable and can be replaced by x, which should make the result easier to see)