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Utilize the axis of symmetry to determine the reflection of each point.

A. The reflection of (-3, -3) is ( , ).
B. The reflection of (-2, -2) is ( , ).
C. The reflection of (-1, 1) is ( , ).

User Helder
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Final answer:

The reflection of each point using the axis of symmetry can be determined by finding the point that is equidistant from the axis. The x-value of the reflection will have the opposite sign of the original point.

Step-by-step explanation:

To determine the reflection of a point using the axis of symmetry, we can use the property that the reflection of a point is equidistant from the axis of symmetry.

Let's consider each point:

A. The reflection of (-3, -3) is (3, -3). Since the x-value of the point is negative, the reflection will have the same y-value but the opposite x-value.

B. The reflection of (-2, -2) is (2, -2). Again, since the x-value of the point is negative, the reflection will have the same y-value but the opposite x-value.

C. The reflection of (-1, 1) is (1, 1). Since the x-value of the point is negative, the reflection will have the same y-value but the opposite x-value.

User Grant Castner
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