Given that ,
what is ?
The first thing we do is break the limit into several pieces:
Now we pull out constants, and evaluate the limits of x and 4:
Since ,
.
What is ,
given that ?
Time to break out the addition rule for limits.
The limit of the sum is the sum of the limits:
We know
,
therefore
Solving the equation to get the limit all by itself on one side, we find
Find ,
given that .
Since the limit of the difference is the difference of the limits,
so putting it all together we find
Rearranging,
Assuming that ,
Since all the necessary limits exist for the limit of a sum (or difference) to be the sum (or difference) of the limits,
Pulling out the constants, and then using our rules about limits of x and of constants,
Putting things together, we now have the equation
Rearranging gives us
which means
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