The antiderivative of 1/(x^4+1): Index

John Quintanilla Precalculus, Theorems January 20, 2016October 12, 2015 1 Minute

I’m doing something that I should have done a long time ago: collecting a series of posts into one single post. The following links comprised my series on the computation of

$\displaystyle \int \frac{dx}{x^4+1}$

Part 1: Introduction.

Part 2: Factoring the denominator using De Moivre’s Theorem.

Part 3: Factoring the denominator using the difference of two squares.

Part 4: The partial fractions decomposition of the integrand.

Part 5: Partial evaluation of the resulting integrals.

Part 6: Evaluation of the remaining integrals.

Part 7: An apparent simplification using a trigonometric identity.

Part 8: Discussion of the angles for which the identity holds.

Part 9: Proof of the angles for which the identity holds.

Part 10: Implications for using this identity when computing definite integrals.

Published by John Quintanilla

I'm a Professor of Mathematics and a University Distinguished Teaching Professor at the University of North Texas. For eight years, I was co-director of Teach North Texas, UNT's program for preparing secondary teachers of mathematics and science. View all posts by John Quintanilla

Published January 20, 2016October 12, 2015

One thought on “The antiderivative of 1/(x^4+1): Index”

Joseph Nebus says:

January 20, 2016 at 2:12 pm

Good doing. I’ve been surprised how useful the couple of times I’ve bundled posts together like this has been.

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