Evaluate the integrals in Exercises 67–74 in terms of
b....

Question

Evaluate the integrals in Exercises 67–74 in terms of

b. natural logarithms.

67. ∫(from 0 to 2√3)dx/√(4+x²)

Accepted Answer

Hello. In this video, we are going to be evaluating the following integral. Now, the integral given to us is the definite integral from 0 to 4 of 1 divided by the square root of 16 + X 2 DX. Now we can go ahead and approach this problem by using trigonometric substitution. Now the form of the trigonometric substitution we can use in this case is of the form x is equal to a tangent of theta. Now in this case here, our a square term is equal to 16, so A is going to equal to 4. And our X2 term has a coefficient of 1, so we're just going to have X on the left-hand side of the substitution. So, in total, our trigonometric substitution is going to be X is equal to 4 tangent of theta. And that means DX is equal to 4 sequin square theta D theta. Now at this point, we also have to apply our boundaries to the trigonometric substitution. So if we were to apply our boundaries with respect to X is equal to 4 tangent of theta, our lower boundary is going to equal to 0, and our upper boundary is going to be pi divided by 4. So by applying our substitutions we can rewrite the integral as the integral from 0 to pi divided by 4. Of 4 sequin square theta. Divided by the square root of 16 + 16 tangent squared theta. D theta. Now here what we need to do is we need to go ahead and simplify. First, in the denominator, notice that we can factor out a 16. If we factor out a 16, we can rewrite the inside of the square root to be 16 multiplied by 1 plus tangent squared theta. And if we use a Pythagorean identity, we can rewrite the inside of the square root to be 16 sequent squared theta. So by applying these substitutions, we can rewrite the integral to be the integral from 0 to 0 to pi divided by 4. Of 4 sequin squared theta. Divided by the square root. Of 16 multiplied by sequent squared of theta d theta. Now here, if we simplify the square root, we can further simplify the integral to be from 0 to pi divided by 4, a 4 multiplied by sequin square of theta divided by 4 sequent of theta. The theta And this will further simplify to be the integral from 0 to pi divided by 4 of sequent of theta. D theta Now here, what we can go ahead and do is we can use the table of integrals to simplify this integral. By the table of integrals, the general integral of sequent of theta is defined as the natural logarithm of sequent of theta plus tangent of theta. So, this integral is going to simplify to be the natural logarithm. Of sequent of theta plus tangent of theta. And this is going to be evaluated from 0 to pi divided by 4. Now if we expand and evaluate at the boundaries, our integral is going to simplify to be the natural logarithm of sequin of pi divided by 4. Plus tangent Of pi divided by 4. Minus the natural logarithm. Of sin of 0. Plus tangent of 0. Now let's go ahead and simplify each of these independently. Set of pi divided by 4 will simplify to be square root of 2, and tangina pi divided by 4 simplifies to be 1. 2 of 0 will simplify to be 1, and tangent at 0 is just 0. So we are left with the natural logarithm of the square root of 2 + 1. Minus the natural logarithm of 1. But in this case here, the natural logarithm of 1 simplifies to be zero, so the final area for our definite integral is just going to be the natural logarithm of the square root of 2 + 1. This is going to be the final solution to our given definite integral. And with that being said, the correct solution to this problem is going to be option C. So I hope this video helps you in understanding on how to approach this problem, and we will go ahead and see you all in the next video.

Evaluate the integrals in Exercises 67–74 in terms ofb. natural logarithms.67. ∫(from 0 to 2√3)dx/√(4+x²)

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Evaluate the integrals in Exercises 67–74 in terms of
b. natural logarithms.
67. ∫(from 0 to 2√3)dx/√(4+x²)