Anonymous11
New member
- Joined
- Sep 21, 2017
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- 3
So there are given two sequences (xn)n>=1 and (yn)n>=1 of real and nonzero numbers which both converge to zero.
I have to calculate lim as x approches infinity of [(xn)2*yn]/ [3*(xn)2-2*xnyn+(yn)2].
(The first paranthesis is the numerator and the second one is the denominator.)
I tried to do it but I can't figure how I can prove it generally without using any specific sequence like 1/n .
Any ideas?
Thanks!
I have to calculate lim as x approches infinity of [(xn)2*yn]/ [3*(xn)2-2*xnyn+(yn)2].
(The first paranthesis is the numerator and the second one is the denominator.)
I tried to do it but I can't figure how I can prove it generally without using any specific sequence like 1/n .
Any ideas?
Thanks!
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