Final answer:
The combined measure of angles T, V, and W in triangle TVW is 180°, which is the sum of the individual measures of 20°, 25°, and 135°.
Step-by-step explanation:
In triangle TVW, you're asked to find the combined measure of angles T, V, and W. According to the fundamental properties of triangles, the sum of the internal angles in any triangle is always 180°. You're given that the measure of angle T is 20°, the measure of angle V is 25°, and the measure of angle W is 135°. To find the combined measure of these three angles, you simply add them up.
Therefore, the total measure of angles T, V, and W is:
20° + 25° + 135° = 180°.
This confirms that the sum of the angles adheres to the properties of triangles.