Courses in Math. Sequence. Limit. Analytic Examples.
This page helps you learn how to find the limit of a sequence in an analytic way.
Sequence Limit - Analytic Examples.
Example 1. Find the limit of a sequence:
[(2n + 1)/(2n - 2)](5n-1)
when n tends to +∞
sequence limit:
Example 2. Find the limit of a sequence:
n[(n + 1)1/2 - n1/2]/(n + 1)
when n tends to +∞
sequence limit:
Example 3. Find the limit of a sequence:
(n!)2/n2n
when n tends to +∞
sequence limit:
Example 4. Find the limit of a sequence:
[(2n2 - n)/(2n2 + 1)]n2
when n tends to +∞
sequence limit:
Example 5. Find the limit of a sequence:
[(n+1)/(n-2)]3n-1
when n tends to +∞
sequence limit:
Example 6. Find the limit of a sequence:
n2/3/[n+1]
when n tends to +∞
sequence limit:
Example 7. Find the limit of a sequence:
ln(n)/n
when n tends to +∞
sequence limit (Stolz theorem):
Example 8. Find the limit of a sequence:
n1/n
when n tends to +∞
sequence limit:
Example 9. Find the limit of a sequence:
[ln(n)]1/n
when n tends to +∞
sequence limit:
Example 10. Find the limit of a sequence:
an/n
when n tends to +∞ and a > 1
sequence limit (Stolz theorem):
Example 11. Find the limit of a sequence:
e(1 - 1/(n+1))n
when n tends to +∞
sequence limit:
Example 12. Find the limit of a sequence:
[n! en/nn]1/n
when n tends to +∞
sequence limit:
Example 13. Find the limit a sequence:
when n tends to +∞
lim sin(n)/n = 0
Example 14. Find the limit
when n tends to +∞
lim arctg(1/n1/2)/[1/n1/2] = 1
Example 15. Find the limit of a sequence:
[n(n - (n2 - 1)1/2)]1/2
when n tends to +∞
sequence limit:
Example 16. Find the limit a sequence:
when n tends to +∞
(-1)(n + 1) → there is no limit, however see cases below
Sub-sequences – limit.
Example 1. Find the limit of a sequence:
(-1)n-1(2 + 3/n)
when n tends to +∞. Let us consider cases:
sub - sequence limit for n = 2k (even numbers):
sub - sequence limit for n = 2k+1 (odd numbers):
Example 2. Find the limit of a sequence:
1 + n/(n + 1) cos(nπ/2)
when n tends to +∞
sub - sequence limit for n = 2k (even numbers):
sub - sequence limit for n = 2k+1 (odd numbers):
Example 3. Find the limit of a sequence:
(n - 1)/(n + 1) cos(2nπ/3)
when n tends to +∞
sub - sequence limit for n = 3k:
sub - sequence limit for n = 3k + 1:
Example 4. Find the limit of a sequence:
(-1)nn
when n tends to +∞
sub - sequence limit for n - even numbers:
sub - sequence limit for n - odd numbers:
Example 5. Find the limit of a sequence:
n[(-1)nn]
when n tends to +∞
sub - sequence limit for n - even numbers:
sub - sequence limit for n - odd number:
Example 8. Find the limit of a sequence:
1 + n sin(nπ/2)
when n tends to +∞
sub - sequence limit for n = 2k:
sub - sequence limit for n = 2k + 1 (k - even number):
sub - sequence limit for n = 2k + 1 (k - odd number):
Example 7. Find the limit of a sequence:
n2/[1 + n2] cos(2nπ/3)
when n tends to +∞
sub - sequence limit for n = 3k:
sub - sequence limit for n = 3k + 1 (k - even number):
sub - sequence limit for n = 3k + 1 (k - odd number):
Example 8. Find the limit of a sequence:
[1 + 2[n(-1)n]]1/n
when n tends to +∞
sub - sequence limit for n - even numbers:
sub - sequence limit for n - odd numbers:
Example 9. Find the limit of a sequence:
cosn(2nπ/3)
when n tends to +∞
sub - sequence limit for n = 3k:
sub - sequence limit for n = 3k+1:
Function. Limit.
If you want to find more analytic examples how to calculate limits go to the page
function - limits - analytic examples.
Series. Convergence.
To train another analytic examples containing limits calculations go to the page
series - convergence - analytic examples.