Asked by Zel
Find the limit of this calculus problem.?
(5x-3)/(ln(5+4e^(x))
x=inf
(5x-3)/(ln(5+4e^(x))
x=inf
Answers
Answered by
Reiny
Intuitive approach
for large values of x, the 5 of (5 + e^x) becomes insignificant , so for all practical purposes
we just have to look at ln(4e^x)
which is ln4 + lne^x
= ln4 + x
Also for very large values of x, the constant ln4 is relatively insignificant, so the denominator
approaches x for large values of x
Now look at the top.
Again for large values of x , the -3 becomes meanignless compared to the size of 5x
So for large values of x
our expression becomes
lim 5x/x as x ----> infinity
= 5
for large values of x, the 5 of (5 + e^x) becomes insignificant , so for all practical purposes
we just have to look at ln(4e^x)
which is ln4 + lne^x
= ln4 + x
Also for very large values of x, the constant ln4 is relatively insignificant, so the denominator
approaches x for large values of x
Now look at the top.
Again for large values of x , the -3 becomes meanignless compared to the size of 5x
So for large values of x
our expression becomes
lim 5x/x as x ----> infinity
= 5
Answered by
liliane
5x+2xa-6ab
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.