How do you take the limit of a radical function if x is under a radical on both the numerator and denominator...

If x is going to infinity then that is an end behavior basically.

To put it simply (math major's pls don't kill me I'm engi) because infinity is fucking big and sqrt(infinity) is infinity for all intents and purposes, because infinity is so large we can also neglect the other constants we have.

so we basically have infinity^2 over infinity, which is basically infinity.

So as x - > infinity f(x) goes to infinity

but from what i was told by my prof infinity/infinity is of indeterminate form and so you have to say there's no limit or you have to find a way to cancel it out by factoring out x or h.

like in the case of x+1/x+1 you can say it's infinity/ over infinity but it's actually 1/1 because you cancel it out and just say x's domain is such that it can't have -1. or am i wrong?

It's indeterminant because it's a bitch to cancel the radicals but common sense tells you the limit of sqrt(x^2+4)/sqrt(3x+7) is approaching infinity at infinity.

If you divide everything by x, the leading term, you should be able to cancel out some terms on the bottom. The terms left with a constant over x are going to be basically zero because x is going to infinity. Doing this you're left with the answer being infinity

However only do this if the limit is going to infinity

You have infinity^2 over infinity for your radical function in the OP.

Or
Lim x - > infinity (x^2 / x) which is:
lim x - > infinity (x/1)
lim x - > infinity x
infinity

>like in the case of x+1/x+1
lim x - > infinity (x+1/x+1) is infinity/infinity which is an indeterminate form.

Without finding the oblique asymptotic we can actually redefine the function in an alternate form of (x^2 + x + 1) / x which means when we take the limit of x tending to infinity we get f(x) going to infinity and x tending to negative infinity f(x) tending to negative infinity.

WAIT I'M DUMB

It's not x+1 + 1/x

So (x+1)/(x+1) would be a point on a number line at 1. Which is why it has no end behaviors, which is why it returns indefinite forms for x tending to either infinity.

I think our teacher gave you the solution.

If you're still in school

>lim h-> infinity of [f(x+h)-f(x)]/h is the derivative
are you actually retarded or just pretending

well you didn't say what x value you're approaching, so i'll assume you mean as x approaches x. in that case, it is simply f(x).

no it's x approaches infinity. my problem is that infinity/infinity as my teach said was "useless from an analytical standpoint"; it tells us nothing so we need a way to cancel it out. so he showed me how i can just multiply by 1 via sqrt/sqrt of the above term and it lets out the x.

but my problem is, how do i get the denominator to rationalize? it's still stuck...

>Veeky Forums unironically helps people with homework now

Veeky Forums sure has changed for the worse

>helping by not being able to find the limit

lmao

If you know what the graph of 1/x looks like, you can derive the value that way. It's not easy to solve this limit algebraically

Lmao I didn't even notice that. It was like 4am.

I'll take pretending for 400, Alex.

wth i keep getting the wrong answer. the correct answer is 1/sqrt(3) according to wolfram alpha by l'hopital's. but i assume you can't use it yet.

Multiply by the conjugate:
[math] \sqrt{3x+7} - 9 [\math]
Then you get something with x^3 on the top, which is the highest term. The highest term on the bottom is an x^2 term. so the answer i get is infinity by looking at the degrees of the x terms.

You can rip the x out of the radicals by deviding the inside by x^2 or something and putting the x on the outside. Do it on the bottom too so can cancel them out. Then you sould have something like sqrt(1+1/x) which would just be sqrt (1) as x->infinity