SOLUTION: Hi, I am having some issues with limits and am trying to get my homework done. I had 30 problems and was able to do all but the below. …if you have time, can you please help me
Algebra.Com
Question 669898: Hi, I am having some issues with limits and am trying to get my homework done. I had 30 problems and was able to do all but the below. …if you have time, can you please help me with this.
Thanks.
Bob
1. The limit as X approaches 4 of the absolute value of (X - 4) divided by
the quantity (X^2 - 16).
2. The limit of f(x) as x approaches 9 if the square root of (X + 7) <=
f(x) <= (x - 1)/2 using the squeeze theorem.
3. The limit as x approaches 1 of (x-1)^2 times the cos(1/(x-1)) using the
squeeze theorem.
Answer by solver91311(24713) (Show Source): You can put this solution on YOUR website!
Is the indeterminate form 
, so use L'Hôpital's Rule. Take the derivative of numerator and denominator, then evaluate the limit again.
John
My calculator said it, I believe it, that settles it
RELATED QUESTIONS
I am having issues understanding how and when to "reorder the operations". It appears... (answered by MathLover1)
Hi i am trying to do my algebra homework, and i am having the biggest problem ever I have (answered by aaaaaaaa)
My son is a student at the Virginia School of Deaf and has brought home 5 pages of... (answered by checkley71,josmiceli)
Hi. I am trying to help my daughter with her homework and I can't help. How do you solve... (answered by Alan3354,Tatiana_Stebko)
I am having some issues with logarithm equations and need some help.
first problem: 2 (answered by lwsshak3)
Hi I am trying to help my son with his geometry homework. I never took geometry. He is... (answered by xinxin)
I am trying to help my son with his algebra and am unable to figure out how to work the... (answered by jim_thompson5910)
I'm trying to help my daughter with her algebra homework and want to make sure I've done... (answered by MathTherapy)
I am having trouble with the addition and multiplication principles of solving... (answered by Earlsdon)
