The term √3 refers to the square root of three, which is an important irrational number approximately equal to 1.732. It plays a significant role in various mathematical contexts, especially in trigonometry, where it appears in the values of sine and cosine for certain angles, as well as in relationships derived from the sum and difference identities. Understanding √3 helps in simplifying expressions and solving trigonometric equations.
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√3 is commonly encountered in trigonometric calculations, particularly when dealing with 30° and 60° angles.
In a 30-60-90 triangle, the lengths of the sides can be expressed as ratios involving √3: specifically, if the shortest side is 1, then the longer leg is √3.
The value of √3 can be derived from the sum and difference identities, especially when calculating values like sin(60°) and cos(30°).
When working with radians, √3 corresponds to specific angles that are critical in trigonometric equations and graphs.
Being an irrational number, √3 cannot be expressed as a fraction, which means it has an infinite number of non-repeating decimals.
Review Questions
How does √3 relate to the sine and cosine functions for common angles?
√3 is directly related to both sine and cosine values for angles like 30° and 60°. For example, sin(60°) equals √3/2, while cos(30°) also equals √3/2. This connection shows how √3 appears in the context of triangles formed by these angles, helping to understand their relationships better.
Discuss how you can use the sum and difference identities to find trigonometric values involving √3.
Using the sum and difference identities, we can express trigonometric functions involving angles such as 30° and 60°. For instance, using sin(a + b) = sin(a)cos(b) + cos(a)sin(b), you can calculate sin(90°) using sin(60°) = √3/2 and cos(30°) = √3/2. This shows how manipulating identities can incorporate √3 into calculations effectively.
Evaluate how understanding √3 contributes to solving more complex trigonometric equations.
Understanding √3 is crucial when solving complex trigonometric equations because it appears frequently in fundamental identities and relationships. By knowing its approximate value and its connection to specific angles, you can simplify expressions more easily and solve equations that require knowledge of both sine and cosine functions. This foundational knowledge allows for more advanced problem-solving strategies that involve angular relationships.