Reflection Across the X-Axis
When we reflect a point across the x-axis, we essentially flip it over the x-axis. In this case, we are asked to find the reflection of the point (-3, 5) across the x-axis.
What Does Reflection Across the X-Axis Mean?
Reflecting a point across the x-axis means that we change the sign of the y-coordinate, while keeping the x-coordinate the same. In other words, if we have a point (a, b), its reflection across the x-axis would be (a, -b).
Applying Reflection to (-3, 5)
Using the rule mentioned above, we can reflect the point (-3, 5) across the x-axis by changing the sign of the y-coordinate. Therefore, the reflection of (-3, 5) across the x-axis is:
(-3, -5)
Conclusion
In conclusion, the reflection of the point (-3, 5) across the x-axis is (-3, -5). This is achieved by changing the sign of the y-coordinate, while keeping the x-coordinate the same.