Use the given information to find each of the following.
sin y, given cos 2y = -1/3 , π/2 < y < π

The double angle formula for cosine states that cos(2y) can be expressed in terms of sin(y) and cos(y) as cos(2y) = cos²(y) - sin²(y) or alternatively as cos(2y) = 2cos²(y) - 1 or cos(2y) = 1 - 2sin²(y). This formula is essential for relating the cosine of a double angle to the sine and cosine of the angle itself, which is crucial for solving the given problem.

The sine and cosine functions are related through the Pythagorean identity, sin²(y) + cos²(y) = 1. This relationship allows us to find one function if we know the other. In this problem, once we find cos(y) from cos(2y), we can use this identity to determine sin(y), which is necessary for solving the question.

Understanding the unit circle and the corresponding signs of sine and cosine in different quadrants is crucial. The given range π/2 < y < π indicates that y is in the second quadrant, where sine is positive and cosine is negative. This information helps in determining the correct value of sin(y) after calculating it, ensuring that the solution adheres to the properties of trigonometric functions in that specific quadrant.