Integral of 2t / (16t^4 + 1) - Need Help Solving!

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In summary, the conversation revolved around finding the integral of 2t / (16t^4 + 1). The participants discussed various methods, such as long division, u-substitution, and using inverse trigonometric functions. They also worked through a similar problem with dx on top and discussed completing the square and factoring. Ultimately, the conversation concluded with the suggestion to use the integral of arctan to solve the original problem.
  • #1
BuBbLeS01
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Find the integral...Please HELP!

Homework Statement


Find the integral...
2t / (16t^4 + 1)


Homework Equations





The Attempt at a Solution


I am stuck on this problem...I have tried long division but that didn't work out for me. I don't know how to solve this.
 
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  • #2
Long division should be reserved for improper fractions.

[tex]\int\frac{2t}{(4t^2)^2+1}[/tex]

Can you take it from here?
 
  • #3
oh ok so i can use u substitution
u = 4t^2
du = 8t dt
1/4du = 2t
1/4 ln (4t^2)^2 + 1
is that right?
 
  • #4
You're substitutions were right. But that is not correct.

[tex]\frac 1 4 \int \frac{du}{u^2+1}[/tex]
 
  • #5
On my paper it says hint: use inverse trig functions. But I don't know how to use one of them because they don't resemble that.
 
  • #6
Keep searching! It's very common! Sine, Cosine, or Tangent.
 
  • #7
I can't use arctan because on the bottom it is a^2 + u^2 and u has to have the x in it right?
 
  • #8
It doesn't matter! You used a substitution and swapped variables.

a, is simply a constant.

[tex]\int\frac{dx}{x^2+a^2}=\int\frac{du}{u^2+1^2}[/tex]
 
  • #9
oh ok so I have...
1/4 *1/1 arctan |4t^2| / 1 + C
1/4 Arctan |4t^2| + C
 
  • #10
Good!
 
  • #11
oh yay thanks!
One more question...
how do you find the integral of something with dx on top like...
dx / (x^2 - 4x + 20)
 
  • #12
It doesn't matter what variables you're using, just pay attention to what you're Integrating with respects to and treat the others as constants.

[tex]\int\frac{dx}{x^2-4x+20}[/tex]

Try completing the square.
 
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  • #13
I get...
(x^2 - 4x + 4) - 4 + 20
(x - 2)^2 + 16
 
  • #14
What does this Integral look like?

[tex]\int\frac{dx}{(x-2)^2+16}[/tex]

If you don't plan on using an Integral table, factor out a 16 from the denominator b/c you need a constant of 1.
 
  • #15
how do i factor out 16?? and why do I need a constant of 1?? I am so confused and I don't know why...I did all of the homework just fine.
 
  • #16
B/c before you can integrate this integral, you need to have it in the form similar to ...

[tex]\int\frac{dx}{x^2+1}[/tex]

Rather than factoring out a 16, divide both numerator & denominator by 16.
 
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  • #17
Can anyone help me with this problem...I have a test Thursday and I am freaking out because I thought I understood this stuff!
 
  • #18
[tex]\int\frac{dx}{(x-2)^2+16}[/tex]

To factor out a 16 ...

[tex]\frac{1}{16}\int\frac{dx}{\frac{(x-2)^2}{16}+1}[/tex]

[tex]\frac{1}{16}\int\frac{dx}{\left(\frac{x-2}{4}\right)^2+1}[/tex]
 
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  • #19
Is there any other way to solve this problem? I am only asking because we have never done anything like that in class or on any homework and I find it hard to believe our teacher giving us something we haven't done before. So I was just curious if there was another solution?
 
  • #20
It's no different from any of your other problems? You should be able to handle problems that are not 100% similar to what you have done b4. It's basically the integral of arctan.

Completing the square and factoring is something you learned prior to Calculus, so those 2 initial steps should not bother you.
 

FAQ: Integral of 2t / (16t^4 + 1) - Need Help Solving!

What is the integral of 2t / (16t^4 + 1)?

The integral of 2t / (16t^4 + 1) is (1/8)ln(16t^4 + 1) + C.

What is the process for solving this integral?

The process for solving this integral involves using the substitution method and then applying the power rule for integration.

What is the substitution method for solving an integral?

The substitution method involves substituting a variable for a part of the integral that can be considered as a function of that variable, and then using the chain rule to solve the integral.

What is the power rule for integration?

The power rule for integration states that the integral of x^n is (x^(n+1)) / (n+1) + C, where n is any real number except -1.

What is the constant of integration, and why is it necessary?

The constant of integration is the "+ C" that is added at the end of the integral. It is necessary because when we take the derivative of the integral, the constant will disappear, and we need to account for all possible values of the original function.

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