Find values of the sine and cosine functions for each angle measure.
2y, given sec y = -5/3, sin y > 0

The secant function, denoted as sec(y), is the reciprocal of the cosine function. It is defined as sec(y) = 1/cos(y). In this problem, sec(y) = -5/3 indicates that the cosine of angle y is negative, which helps determine the quadrant in which angle y lies.

The sine and cosine functions are related through the Pythagorean identity: sin²(y) + cos²(y) = 1. This relationship allows us to find the sine value once we have the cosine value. Given that sin(y) > 0, we can deduce that angle y is in the first or second quadrant, influencing the signs of sine and cosine.

The angle doubling formula for sine and cosine states that sin(2y) = 2sin(y)cos(y) and cos(2y) = cos²(y) - sin²(y). These formulas are essential for finding the sine and cosine of the angle 2y based on the values of sin(y) and cos(y) derived from the given sec(y).