If and then does not converge to a finite limit as .
For proving, we assume that exists and is finite. Then
By the Quotient Rule and by the Product Rule .
Which of the statements below completes the proof?
A) From , it follows that 1=0, which is a contradiction.
B) From , we can conclude that , which contradicts our assumption.
C) From , we can conclude that , which contradicts our assumption.
D) From , we can conclude that , which contradicts our assumption.
E) A and C are correct.

Question

If  and  then  does not converge to a finite limit as  .
For proving, we assume that  exists and is finite. Then
By the Quotient Rule  and by the Product Rule  .
Which of the statements below completes the proof?
A) From , it follows that 1=0, which is a contradiction. 
B) From , we can conclude that , which contradicts our assumption. 
C) From , we can conclude that , which contradicts our assumption. 
D) From , we can conclude that , which contradicts our assumption. 
E) A and C are correct.

Quizplus · Accepted Answer

The Answer of If  and  then  does not converge to a finite limit as  .
For proving, we assume that  exists and is finite. Then
By the Quotient Rule  and by the Product Rule  .
Which of the statements below completes the proof?
A) From , it follows that 1=0, which is a contradiction. 
B) From , we can conclude that , which contradicts our assumption. 
C) From , we can conclude that , which contradicts our assumption. 
D) From , we can conclude that , which contradicts our assumption. 
E) A and C are correct.

If and Then Does Not Converge to a Finite