Limits properties
Published in
2 min readJan 23, 2019
Refer to Khan academy: Limit properties
The limit of a SUM of functions is the SUM of the INDIVIDUAL limits:
Limits of Combined Functions
Refer to Khan academy: Limits of combined functions
Example
Solve:
Example
Solve:
- The limit for each function DOES NOT exists.
- However, the
one-side limits
of each graph DO exist
- We can use the fact that the limit of a sum of functions is the sum of the individual limits:
- Calculate each side’s combined limits: