Even and Odd Trigonometric Functions & Identities - Evaluating Sine, Cosine, & Tangent | Summary and Q&A

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June 24, 2017
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Even and Odd Trigonometric Functions & Identities - Evaluating Sine, Cosine, & Tangent

TL;DR

Even and odd trigonometric functions have distinct properties, such as symmetry and sign changes, which can be applied to find values of specific trigonometric functions.

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Key Insights

  • 🔠 Even trigonometric functions, such as cosine and secant, remain unchanged when their input is negated.
  • 🤘 Odd trigonometric functions, such as sine and tangent, change sign when their input is negated.
  • 👻 The properties of even and odd functions allow for simplification of trigonometric function evaluations.
  • 🔨 The unit circle is a valuable tool for determining trigonometric function values at specific angles.
  • 🦕 Understanding the properties of even and odd functions can help in visualizing and understanding the behavior of trigonometric functions.
  • 🦕 Applying the even and odd properties of trigonometric functions can help find values of specific trigonometric functions with given inputs.
  • 🤘 Tangent, a common trigonometric function, exhibits odd behavior, changing sign when the input is negated.

Transcript

now let's talk about even and odd functions let's go over the even functions first cosine is an even function cosine of negative x is equal to cosine of x and the reciprocal of cosine which is secant is also an even function secant of negative x is equal to secant x so those are the even functions the other four are odd trigonometric functions so f... Read More

Questions & Answers

Q: What are the properties of even and odd trigonometric functions?

Even trigonometric functions, like cosine and secant, maintain their values when their input is negated. Odd trigonometric functions, such as sine and tangent, change sign when their input is negated.

Q: How can we apply the knowledge of even and odd functions to find trigonometric function values?

By understanding the properties of even and odd functions, we can simplify the evaluation of trigonometric functions. For example, when evaluating cosine of a negative angle, we can simply take the cosine of the positive angle, as they will have the same value.

Q: What is the significance of the unit circle in determining trigonometric function values?

The unit circle provides a visual representation of angles and their corresponding points on the circle. By referencing the unit circle, we can determine the values of trigonometric functions at specific angles.

Q: Why do tangent three pi over four and tangent negative three pi over four have different signs?

Tangent is an odd function, so it changes sign when the input is negated. At three pi over four, in quadrant two, tangent is negative. However, at negative three pi over four, in quadrant three, tangent is positive, resulting in different signs.

Summary & Key Takeaways

  • Even functions in trigonometry, such as cosine and secant, remain unchanged when their input is negated.

  • Odd functions in trigonometry, such as sine and tangent, change sign when their input is negated.

  • By utilizing the even and odd properties of trigonometric functions, one can find the values of various trigonometric functions with specific inputs.

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