Answer Happy

Posted: **Wed Jul 06, 2022 11:45 am**

: Find The Limit If It Exists Of The Sequence X N Where X N 2 3n 4n 2 1 2n 3n 2 Find The Limit If It Exists 1 (3.46 KiB) Viewed 14 times

Find the limit (if it exists) of the sequence (x_n) where x_n = (2+3n-4n^2)/(1-2n+3n^2).
Find the limit (if it exists) of the sequence (x_n) where x_n = sqrt(3n+2)-sqrt(n).

Answer Happy

Find the limit (if it exists) of the sequence (x_n) where x_n = (2+3n-4n^2)/(1-2n+3n^2). Find the limit (if it exists)

Find the limit (if it exists) of the sequence (x_n) where x_n = (2+3n-4n^2)/(1-2n+3n^2). Find the limit (if it exists)