Evaluate the integrals in Exercises 9–28. It may be necessary ...

Question

Evaluate the integrals in Exercises 9–28. It may be necessary to use a substitution first.

∫ [cos(θ) / (sin²(θ) + sin(θ) − 6)] dθ

Accepted Answer

Hello, in this video, we are going to be evaluating the given integral by using the table of integrals. Now, the integral given to us is the integral of sine theta divided by cosine squared plus cosine theta minus 6. Now, in order to approach this integral, the first thing we can do is we can go ahead and simplify by using a substitution. Let's go ahead and allow you to equal the cosine of theta. Then the substitution for d theta or DU is going to be negative sign of theta d theta. And here, if we move the negative sign to the left hand side of the substitution, we get negDU is equal to sin of theta d theta. So here we have sin of theta d theta in the numerator, so it's going to be substituted with negativeDU. And everywhere that we have a cosine, it's going to be substituted with you. So we just simplified the integral to be the integral of negative DU all divided by U2 plus U minus 6. Now here what we can go ahead and do is we can move the negative sign to the front of the integral as a constant. So doing so will simplify the numerator to just be du u. And we could factor the denominator, and if we were to factor the denominator, we can rewrite the integral to be the negative integral of 1 divided by U minus 2. Multiplied by U plus 3 DU. Now, in order to further simplify this integral, we can use integration by parts. Let's just go ahead and pay attention to the integrand for now. So in the integrand, we have the fraction 1 divided by U minus 2 multiplied by U + 3. This can be broken down into two linear partial fractions, so we are going to have a divided by u minus 2 plus B divided by U + 3. Now, if we were to multiply the entire equation by the common denominator, we can simplify the equation to be 1 is equal to A multiplied by U + 3 + B multiplied by U minus 2. And multiplying and collecting like terms together allows us to rewrite the equation to be 1 is equal to A + B multiplied by U + 3A. -2 B Now here we can create two linear equations. Setting the coefficients of the u terms on both the left and right hand side equal to each other gives us a plus b is equal to zero, and setting the constant values equal to each other on both the left and right hand side leaves us with 3 A minus 2b is equal to 1. Now here, if we were to solve the linear system, we will end up with two coefficients for A and B. We will have A is equal to 1/5 and B is equal to -15. So what this means is that we can break down the original integral into the integral of two partial fractions. So applying this substitution allows us to rewrite the integral to be the negative integral. Of 15th. Divided by u minus 2. 1/5 divided by u + 3. And if we were to factor out a 1/5 from the equation, we get -15 multiplied by the integrals of the integral of 1 divided by u minus 2 minus the integral. Of 1 divided by u plus 3 Now if we were to integrate both parts, we will be left with the following integral. We will have 1/5 multiplied by the natural logarithm. Of u minus 2. Minus the natural logarithm of u + 3, and we will add a generic constant c. We can combine. Well, the first thing we can do is we can remove the negative sign by only substituting the negative into the natural logarithms, so we can reorder this to be 1/5 multiplied by the natural logarithm of U + 3 minus the natural logarithm of u minus 2 plus the generic constant c. And if we were to use our natural logarithm properties, we can use the difference property to combine both of them together. So we will be left with 1/5 multiplied by the natural logarithm of U + 3 divided by U minus 2 plus the generic constant C. Now recall that in the beginning of the problem, we deter we substituted U to be U is equal to cosine of theta. So resubstituting back this value of U allows us to get the integral or the antiderivative of 1/5 multiplied by the natural logarithm of cosine of theta plus 3 divided by cosine of theta minus 2, plus the generic constant C. This is going to be the simplest form of the integram by using integration. By using partial fraction integration. And this is going to be the solution to the problem with the overall solution being 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 9–28. It may be necessary to use a substitution first.∫ [cos(θ) / (sin²(θ) + sin(θ) − 6)] dθ

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Evaluate the integrals in Exercises 9–28. It may be necessary to use a substitution first.
∫ [cos(θ) / (sin²(θ) + sin(θ) − 6)] dθ