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Hi! I was absent today and did not understand this lesson please I will be really grateful if you help me ! I appreciate it this is classwork assignment does not count as a test, I did the first question and it was right but the second one I do not know how to solve it

Hi! I was absent today and did not understand this lesson please I will be really-example-1
User Pescolino
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1 Answer

8 votes
8 votes

Answer:

sin(α + β) = -84/205

tan(α + β) = 84/187

Step-by-step explanation:

To find sin(α + β), we will use the following identity


\begin{gathered} \sin ^2\theta+\cos ^2\theta=1 \\ \text{Then} \\ \sin ^2(\alpha+\beta)^{}+\cos ^2(\alpha+\beta)^{}=1 \end{gathered}

So, solving for sin(α + β), we get:


\sin (\alpha+\beta)=\pm_{}\sqrt[]{1-\cos^2(\alpha+\beta)}

Now, we can replace cos(α + β) = -187/205 to get:


\begin{gathered} \sin (\alpha+\beta)=\pm\sqrt[]{1-((187)/(205))^2} \\ \sin (\alpha+\beta)=\pm(84)/(205) \end{gathered}

Then, α + β is on quadrant III. It means that the sine of the angle is negative. Therefore

sin(α + β) = -84/205

Finally, to add tan(α + β), we will use the following


\tan (\alpha+\beta)=(\sin (\alpha+\beta))/(cos(\alpha+\beta))

Replacing the values, we get:


\tan (\alpha+\beta)=(-(84)/(205))/(-(187)/(205))=(-84*205)/(205*(-187))=(84)/(187)

Therefore

tan(α + β) = 84/187

User MrDerp
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