Identify a pair of alternate exterior angles. At the intersection of line a and line h, angle 1 is in the upper left, angle 2 is in the upper right, angle 3 is in the lower right, angle 8 is in the lower left. At the intersection of line b and line h, angle 7 is in the upper left, angle 4 is in the upper right, angle 5 is in the lower right, angle 6 is in the lower left. (1 point) Responses 3 and 4 Image with alt text: Image of an angle symbol 3 and Image with alt text: Image of an angle symbol 4 1 and 2 Image with alt text: Image of an angle symbol 1 and Image with alt text: Image of an angle symbol 2 1 and 6 Image with alt text: Image of an angle symbol 1 and Image with alt text: Image of an angle symbol 6 2 and 6
The pair of alternate exterior angles is angle 2 and angle 6.
The pair of alternate exterior angles is angle 2 and angle 6.
To identify a pair of alternate exterior angles, we need to first understand what alternate exterior angles are. Alternate exterior angles are formed when a transversal intersects two or more lines. They are located on opposite sides of the transversal and on the outside of the two lines being intersected.
In the given scenario, we have two intersecting lines: line h and line a, as well as line h and line b. The angles on the outside of these lines, which are also on opposite sides of the transversal (line h), are the alternate exterior angles.
Looking at the angles given, we can identify the pair of alternate exterior angles as follows:
At the intersection of line a and line h:
- Angle 1 is in the upper left position.
- Angle 4 is in the upper right position.
At the intersection of line b and line h:
- Angle 6 is in the lower left position.
- Angle 3 is in the lower right position.
Therefore, the pair of alternate exterior angles in this scenario is angle 4 and angle 6.