Find cos(s + t) and cos(s - t).
sin s = 2/3 and sin t = -1/3, s in quadrant II and t in quadrant IV​​

Trigonometric identities are equations that involve trigonometric functions and are true for all values of the variables involved. The cosine addition and subtraction formulas, cos(s + t) = cos s cos t - sin s sin t and cos(s - t) = cos s cos t + sin s sin t, are essential for solving problems involving the sum or difference of angles.

The unit circle is divided into four quadrants, each affecting the signs of the sine and cosine functions. In quadrant II, sine is positive and cosine is negative, while in quadrant IV, sine is negative and cosine is positive. Understanding the quadrant locations of angles s and t helps determine the signs of their respective cosine values.

To find the cosine of an angle when the sine is known, we can use the Pythagorean identity: sin²(θ) + cos²(θ) = 1. By rearranging this identity, we can calculate cos(θ) as ±√(1 - sin²(θ)). The sign is determined by the quadrant in which the angle lies, ensuring accurate results for cos(s) and cos(t).