To show that 
is not the limit of 
as 
we should show that:
A) There exists 
such that for any 
there exists a solution to the inequalities 
and 
.
B) There exists 
such that for any 
there exists a solution to the inequalities 
and 
.
C) There exists 
such that for any 
, if 
then 
.
D) For any 
and 
if 
then 
.
E) A and D are correct.
Correct Answer:
Verified
Q85: Assume Q86: Which of the following statements show that Q87: Suppose there exists Q88: Which of the following functions has a Q89: Which of the following properties can be Q91: Compute the following limits: Q92: The Intermediate Value Theorem guarantees that the Q93: The polynomial Q94: The following function is a counterexample for Q95: To show that Unlock this Answer For Free Now! View this answer and more for free by performing one of the following actions Scan the QR code to install the App and get 2 free unlocks Unlock quizzes for free by uploading documents
A)
