QuestionFind
Studdy Solution
STEP 1
1. We are dealing with an indefinite integral.
2. The integrand is a polynomial expression raised to a power.
3. We will use substitution to simplify the integration process.
STEP 2
1. Use substitution to simplify the integrand.
2. Integrate the simplified expression.
3. Substitute back to the original variable.
STEP 3
To simplify the integration process, use substitution. Let:
Then, differentiate with respect to :
This implies:
Therefore, we can express in terms of :
Substitute and into the integral:
STEP 4
Now, integrate the simplified expression:
The integral of with respect to is:
where is the constant of integration.
Thus, the integral becomes:
STEP 5
Substitute back the original expression for :
So, the integral becomes:
The indefinite integral is:
Was this helpful?