zeion said:The proof for the addition/subtraction formula from my textbook seems completely arbitrary to me ~_~. I have found other proofs online that involve Euler's formula which I have not learned yet, as well as one that involves drawing two right angled triangles on top of each other. Which of the addition/subtraction formula proofs makes the most sense to you guys?
Compound angle formulas are mathematical equations used to find the values of trigonometric functions of angles that are formed by combining two or more angles.
Understanding compound angle formulas is important in solving complex problems involving angles, especially in the field of trigonometry. These formulas are also used in various real-life applications such as architecture, engineering, and navigation.
Compound angle formulas are derived using basic trigonometric identities and the addition and subtraction formulas for sine, cosine, and tangent. These identities and formulas can be found in most trigonometry textbooks or online resources.
Some common compound angle formulas include the double angle formulas, triple angle formulas, and half angle formulas. These formulas involve the combination of two or more angles and can be used to find the values of trigonometric functions of these angles.
Compound angle formulas can be applied in various real-life situations, such as calculating the height of a building, determining the distance between two points, or finding the direction of a moving object. These formulas are also used in many fields of science and engineering, including physics, astronomy, and surveying.