In Exercises 35–38, find the exact value of the following under the given conditions: a. sin(α + β) 3 𝝅 12 𝝅 sin α = ------- , 0 < α < -------- , and sin β = --------- , --------- < β < 𝝅. 5 2 13 2

The sine addition formula states that sin(α + β) = sin(α)cos(β) + cos(α)sin(β). This formula is essential for finding the sine of the sum of two angles, as it allows us to express it in terms of the sine and cosine of the individual angles. Understanding this formula is crucial for solving problems involving the addition of angles in trigonometry.

Trigonometric ratios relate the angles of a triangle to the lengths of its sides. For sine, it is defined as the ratio of the length of the opposite side to the hypotenuse in a right triangle. Knowing how to calculate sine values from given ratios is fundamental for solving trigonometric problems, especially when working with specific angle measures.

Understanding the quadrants of the unit circle and the ranges of angles is vital in trigonometry. The sine function is positive in the first and second quadrants, which affects the signs of the sine and cosine values based on the angle's location. This knowledge helps in determining the correct values of sin(α) and sin(β) based on the given conditions in the problem.