To determine how many angles are adjacent to angle \( DOC \) in the illustration described, we first need to understand the concept of adjacent angles. Adjacent angles share a common vertex and a common side but do not overlap.
From the arrangement of the rays and the points:
- Points \( D \) and \( C \) form angle \( DOC \).
- The angles adjacent to angle \( DOC \) would be the angles that share the vertex \( O \) and one side along ray \( OD \) or ray \( OC \).
Given the counterclockwise arrangement of points A, B, C, D, and E:
- The rays are arranged such that:
- Angle \( AOD \) is adjacent to angle \( DOC \).
- Angle \( BOC \) is adjacent to angle \( DOC \).
Therefore, angle \( DOC \) has two adjacent angles:
- Angle \( AOD \)
- Angle \( BOC \)
In total, there are two angles adjacent to angle \( DOC \).