In Exercises 33–42, let sin t = a, cos t = b, and tan t = c. Write each expression in terms of a, b, and c. sin(-t - 2𝜋) - cos(-t - 4𝜋) - tan(-t - 𝜋)

Trigonometric identities are equations that involve trigonometric functions and are true for all values of the variable. Key identities include the Pythagorean identity, reciprocal identities, and co-function identities. Understanding these identities is essential for simplifying trigonometric expressions and solving equations, especially when dealing with negative angles and periodic functions.

In trigonometry, sine and tangent are odd functions, while cosine is an even function. This means that sin(-t) = -sin(t) and tan(-t) = -tan(t), while cos(-t) = cos(t). Recognizing these properties allows for the simplification of expressions involving negative angles, which is crucial for rewriting the given expression in terms of a, b, and c.

Trigonometric functions are periodic, meaning they repeat their values in regular intervals. For example, sin(t) and cos(t) have a period of 2π, while tan(t) has a period of π. This property is important when evaluating trigonometric functions at angles like -t - 2π or -t - π, as it allows us to express these angles in terms of their equivalent angles within one period.