Evaluate the following integrals.
∫ eˣ/(e²ˣ + 2eˣ + 17) ...

Question

Evaluate the following integrals.

∫ eˣ/(e²ˣ + 2eˣ + 17) dx

Accepted Answer

Hello. In this video, we are going to be evaluating the given integral. Now, we are given the integral of E to the power of X, divided by E to the power of 2X minus 4 E X plus 13DX. Now, in order to approach this problem, the first thing we're going to do is we're going to try to simplify the denominator. Let's go ahead and allow you to equal to EDD power of X. Then that means D U will equal to EDXDX, which we have in the numerator of the integrand. So, by applying these substitutions, we can simplify the integral to be the integral of 1 divided by U quad minus 4 U plus 13DU. Now, there isn't much that we can do with the current form of the integrand, but what we can do is we can further simplify the denominator by completing the square. In the denominator we have U2 minus 4 u plus 13. Let's go ahead and group up the first two terms. Now what is a term that we can add to u2 minus 4u in order to make it a factorable trinomial? But we will have to add 4. So if we add 4 into the denominator, we can group up the three terms to be U squared minus 4 u plus 4. And in order to balance the equation, we must also subtract 4. Now U2 minus 4 U plus 4 is going to simplify to be U minus 2 quantity squared, and 13 minus 4 is going to simplify to be 9. So by completing the square, we can further simplify the integral to be the integral of 1 divided by U minus 2 squared plus 9DU. Now let's go ahead and use a 2nd substitution. Let's allow W to equal to U minus 2, then DW will equal to DU. This will allow us to rewrite the integral to be the integral of 1 divided by U W squared. Plus 9 DW Now we can solve this integral by using integration of the arc tangent function or tangent inverse. Now this integral is of the form 1 divided by X2 plus A2, which is a squared quantity. This is going to simplify to be 1 divided by a multiplied by tangent inverse of X divided by A plus C. So here, our A square term is equal to 9, which means that A is equal to 3. And our X2 term is currently equal to W2, so our X term will equal to W. By using this identity, we can simplify the integral to the integral of 1 divided by 3, multiplied by tangent inverse of W divided by 3 plus C. Now what we need to do is we just need to back substitute. Now, we are said that W is equal to U minus 2. So by substituting W back in terms of U, we can rewrite the solution to be 1/3 multiplied by tangent inverse of U minus 2 divided by 3 plus C. And now what we need to do is we need to back to substitute U into terms of X. Now, earlier, we stated that U is equal to E to the power of X. So by applying the substitution, the final form of the solution to the integral will be 1/3, multiplied by tangent inverse of E to the power of X minus 2 divided by 3 plus C. And this is going to be the simplest solution to the given integral, and the overall solution is going to be D. So I hope this video helps you in understanding how to approach this problem, and we will go ahead and see you all in the next video.

Evaluate the following integrals.
∫ eˣ/(e²ˣ + 2eˣ + 17) dx

Key Concepts

Integration Techniques

Exponential Functions

Rational Functions

Watch next