- #1
BZ908
- 1
- 0
An integral with a fraction in it--need help finding the antiderivative
I have the integral \int(\frac{20}{1+x^2} - 2)dx where x = ± 3. To solve, I need to find the antiderivative of \frac{20}{1+x^2} - 2
Now, the worksheet actually gives the answer to the problem: The antiderivative is 37.961 or 37.962. However, I'm having trouble actually reaching that answer on my own; I have trouble with the antiderivatives of fractions.
Lessee... I know that the antiderivative of 1/x is ln x. When it gets any more complex than that I get confused.
First, I took \int(\frac{20}{1+x^2} - 2)dx and turned it into \int(20(1+x^2)^-^1 - 2)dx
Then, I tried to take the antiderivative. I thought it would be: 20ln(1+x^2)-2x.
Then I plugged in the x values, 3 and -3. With positive 3 plugged in, it came out to 40.052, with a negative 3 it came out to 52.052. I don't even have to finish it off with the subtraction to know that my final answer isn't right and that I missed a step (or two) somewhere. Only question is: What step did I miss? I have a feeling I was supposed to do something with the 20... And I think that there might have been more to taking the antiderivative of (1+x^2)^-1 then just turning it into a natural logarithm. Would someone please help me figure out what I forgot?
Homework Statement
I have the integral \int(\frac{20}{1+x^2} - 2)dx where x = ± 3. To solve, I need to find the antiderivative of \frac{20}{1+x^2} - 2
Now, the worksheet actually gives the answer to the problem: The antiderivative is 37.961 or 37.962. However, I'm having trouble actually reaching that answer on my own; I have trouble with the antiderivatives of fractions.
Homework Equations
Lessee... I know that the antiderivative of 1/x is ln x. When it gets any more complex than that I get confused.
The Attempt at a Solution
First, I took \int(\frac{20}{1+x^2} - 2)dx and turned it into \int(20(1+x^2)^-^1 - 2)dx
Then, I tried to take the antiderivative. I thought it would be: 20ln(1+x^2)-2x.
Then I plugged in the x values, 3 and -3. With positive 3 plugged in, it came out to 40.052, with a negative 3 it came out to 52.052. I don't even have to finish it off with the subtraction to know that my final answer isn't right and that I missed a step (or two) somewhere. Only question is: What step did I miss? I have a feeling I was supposed to do something with the 20... And I think that there might have been more to taking the antiderivative of (1+x^2)^-1 then just turning it into a natural logarithm. Would someone please help me figure out what I forgot?
