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In Exercises 63 - 74, use inverse functions where needed to find all solutions of the equation in the interval .
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Text solutionVerified
Step by Step Solution:
Step 1. Factor out the common term .
Step 2. We get .
Step 3. Applying zero product property we get, or .
Step 4. Solving for , we get .
Step 5. Solving for , we get .
Step 6. Using the identity , we get .
Step 7. Solving the above equation we get .
Step 8. Taking square root on both sides we get, .
Step 9. For , lies in the second and fourth quadrants, thus or .
Step 10. For , lies in the third and first quadrants, thus or .
Final Answer:
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Question Text | In Exercises 63 - 74, use inverse functions where needed to find all solutions of the equation in the interval .
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Topic | All Topics |
Subject | Pre Calculus |
Class | Class 12 |
Answer Type | Text solution:1 |