How Do You Integrate Using Logarithms for \(\int \frac{3}{3x-2} \, dx\)?

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Homework Help Overview

The discussion revolves around evaluating the integral \(\int \frac{3}{3x-2} \, dx\). Participants are exploring the integration techniques involving logarithmic functions and substitution methods.

Discussion Character

  • Exploratory, Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • The original poster attempts to evaluate the integral directly but encounters issues with undefined expressions. Some participants suggest using substitution to simplify the integral. Others express concerns about algebraic misunderstandings that may affect the integration process.

Discussion Status

There is a mix of attempts to clarify the integration method and address algebraic misconceptions. Some participants have provided guidance on substitution, while others are questioning foundational algebraic principles. The discussion is ongoing with no explicit consensus yet.

Contextual Notes

Participants are navigating potential algebraic errors that could complicate the integration process. The original poster's confusion regarding limits and undefined expressions is noted, as well as the emphasis on reviewing algebraic rules.

kuahji
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Evaluate the integral.

\int3/(3x-2) dx from 0 to -1 (top to bottom).

I change the equation to [tex(1/x - 3/2) dx[/tex]
then integrated ln x-3/2x, but ln x at 0 is undefined.

The textbook shows it as becoming ln (3x-2), but I'm not completely understanding how to get to that.
 
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substitute y = 3x-2
 
Thanks, that worked. I'm just a bit rusty I reckon.
 
Caution: you are going to find it very difficult to do Calculus if you cannot do basic algebra.

a/(b+c) is not equal to (a/b)+ (a/c)!

You had better review your algebra.
 
HallsofIvy said:
Caution: you are going to find it very difficult to do Calculus if you cannot do basic algebra.

a/(b+c) is not equal to (a/b)+ (a/c)!

Hmm, guess you're right. I've always used (a+b)/c=a/c+b/c but guess I just assumed it would work vice versa. Is there any combination it does equal?
 
My 1st help in answering !

1- You have to use change of variables method.
2- Substitute den with a variable and take derivative of this wrt x
3- Using this var the limits will change
4- Once you do 2 and with new limits from 3, the integral will be easy.

Thanks

Asif
 

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