Textbook Question
Use the given information to find each of the following.
sin y, given cos 2y = -1/3 , π/2 < y < π
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6. Trigonometric Identities and More Equations
Introduction to Trigonometric Identities
Problem 5.RE.48
Textbook Question
Graph each expression and use the graph to make a conjecture, predicting what might be an identity. Then verify your conjecture algebraically.
csc x - cot x
Verified step by step guidance1
Recall the definitions of the cosecant and cotangent functions in terms of sine and cosine: \(\csc x = \frac{1}{\sin x}\) and \(\cot x = \frac{\cos x}{\sin x}\).
Rewrite the expression \(\csc x - \cot x\) using these definitions: \(\frac{1}{\sin x} - \frac{\cos x}{\sin x}\).
Combine the terms over the common denominator \(\sin x\): \(\frac{1 - \cos x}{\sin x}\).
Graph the original expression \(\csc x - \cot x\) and the simplified expression \(\frac{1 - \cos x}{\sin x}\) over a suitable domain (avoiding points where \(\sin x = 0\)) to observe if they coincide, which suggests an identity.
To verify algebraically, try to manipulate \(\frac{1 - \cos x}{\sin x}\) into a known trigonometric expression or use conjugates to simplify and confirm the identity.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Reciprocal and Quotient Identities
Understanding that cosecant (csc x) is the reciprocal of sine (1/sin x) and cotangent (cot x) is the quotient of cosine over sine (cos x/sin x) is essential. These identities allow rewriting expressions involving csc and cot in terms of sine and cosine, facilitating algebraic manipulation and verification.
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Graphing Trigonometric Functions
Graphing functions like csc x and cot x helps visualize their behavior, including asymptotes and periodicity. By plotting csc x - cot x, one can observe patterns or simplifications that suggest possible identities, providing an intuitive basis before algebraic proof.
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Algebraic Verification of Trigonometric Identities
After conjecturing an identity from the graph, algebraic verification involves manipulating one side of the equation using known identities to prove equality. This process requires skill in factoring, common denominators, and applying fundamental trigonometric identities to confirm the conjecture rigorously.
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