If m�ÚT = m�ÚPUQ, which lines are parallel?

Without a figure to refer to, I have no clue.

The measure of PQR is 45°. The length of radius QR is 3 inches. What is the area of sector PQR? (Use 3.14 for .)

To determine which lines are parallel, we need to understand the relationship between angles and parallel lines.

When a transversal intersects two parallel lines, corresponding angles are congruent. In other words, if two angles formed by a transversal are equal, it means that the lines the transversal intersects are parallel.

Given the statement m�ÚT = m�ÚPUQ, it implies that the angle measure of angle T is equal to the angle measure of angle PUQ. By the transitive property of equality, we can infer that angle T is congruent to angle PUQ.

Since angle T and angle PUQ are congruent, it suggests that the lines containing those angles could be parallel. However, we need more information to confirm if they are indeed parallel.