QuestionQuestion
Evaluate the indefinite integral given below.
Provide your answer below:
Studdy Solution
STEP 1
What is this asking?
We need to find the *indefinite integral* of a function that's a mix of a polynomial divided by and an exponential term.
Basically, we're looking for a function whose *derivative* is the one given to us!
Watch out!
Don't forget the "+C" for indefinite integrals – it represents that *family of functions* that all have the same derivative!
Also, be careful with the signs when simplifying the polynomial fraction.
STEP 2
1. Simplify the Integrand
2. Integrate Term by Term
3. Combine and Simplify
STEP 3
Let's **rewrite** the integrand to make it easier to integrate.
We can **split the fraction** and **simplify** each term:
So, our integral becomes:
This is much easier to work with now!
STEP 4
Now, we can **integrate each term separately**.
Remember, the power rule for integration is (where ).
Also, and .
STEP 5
Let's **tackle** the first term:
STEP 6
Next, the second term:
STEP 7
Finally, the exponential term:
STEP 8
Let's **put it all together**.
We can combine the constants of integration (, , and ) into a single constant, .
STEP 9
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