The angles AOB and BOC form a straight line AD. Therefore, they are supplementary angles, meaning their sum is 180 degrees.
We are given that \( \angle BOC = 130^{\circ} \).
The relationship between the angles is:
\( \angle AOB + \angle BOC = 180^{\circ} \)
Substitute the given value of \( \angle BOC \):
\( \angle AOB + 130^{\circ} = 180^{\circ} \)
To find \( \angle AOB \), subtract 130 degrees from both sides:
\( \angle AOB = 180^{\circ} - 130^{\circ} \)
\( \angle AOB = 50^{\circ} \)
Ответ: \( \angle AOB = 50^{\circ} \).