To determine which ordered pairs would complete a square including the two points shown (the specific points are not provided in your question), we can analyze the options given.
Assuming the two points you're referring to are part of a square's vertices, we can look for combinations that fit the properties of a square:
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A square has equal side lengths: The distances between each pair of consecutive vertices should be the same.
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The angles between adjacent sides are right angles: The dots should be arranged such that the angle formed by adjacent vertices is 90 degrees.
Taking these facts into account, let's analyze the pairs:
- (3, 3) and (-4, -3)
- (3, 4) and (-4, -3)
- (4, 3) and (-3, -4)
- (4, 4) and (-3, -3)
To choose the correct pair, you can visualize the coordinates on a Cartesian plane or calculate the distances between the listed points. Without knowing specific coordinates, we must infer from the choices:
- Check if the pairs yield the right distance to uphold the square property with the existing points.
- Use grid logic to see if they could align correctly with the original points forming two diagonal corners.
If you can specify which points are already given, I can provide a better analysis and determine which of the pairs creates a square!