Question
Edwidge draws a parallelogram STUV with a center at O. What must be true to prove that STUV is a parallelogram.
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GPT-4o mini
To prove that a quadrilateral STUV is a parallelogram, we can use several properties or criteria. Here are the most commonly accepted conditions that, if satisfied, will prove that STUV is indeed a parallelogram:
1. **Opposite Sides are Equal**: If both pairs of opposite sides (ST and UV, SU and TV) are equal in length, then STUV is a parallelogram.
2. **Opposite Angles are Equal**: If both pairs of opposite angles (∠S and ∠U, ∠T and ∠V) are equal, then STUV is a parallelogram.
3. **One Pair of Opposite Sides are Equal and Parallel**: If one pair of opposite sides (say ST and UV) is both equal in length and parallel, then STUV is a parallelogram.
4. **Diagonals Bisect Each Other**: If the diagonals (SU and TV) of STUV bisect each other at point O, then STUV is a parallelogram.
5. **Using Vectors**: If you can assign position vectors to the points S, T, U, and V such that the vector representations show that the vector from S to T is equal to the vector from V to U, and the vector from S to U is equal to the vector from T to V.
Any of these criteria can be used to prove that a quadrilateral STUV is a parallelogram.
1. **Opposite Sides are Equal**: If both pairs of opposite sides (ST and UV, SU and TV) are equal in length, then STUV is a parallelogram.
2. **Opposite Angles are Equal**: If both pairs of opposite angles (∠S and ∠U, ∠T and ∠V) are equal, then STUV is a parallelogram.
3. **One Pair of Opposite Sides are Equal and Parallel**: If one pair of opposite sides (say ST and UV) is both equal in length and parallel, then STUV is a parallelogram.
4. **Diagonals Bisect Each Other**: If the diagonals (SU and TV) of STUV bisect each other at point O, then STUV is a parallelogram.
5. **Using Vectors**: If you can assign position vectors to the points S, T, U, and V such that the vector representations show that the vector from S to T is equal to the vector from V to U, and the vector from S to U is equal to the vector from T to V.
Any of these criteria can be used to prove that a quadrilateral STUV is a parallelogram.
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