Congruent figures
Congruent figures are two or more geometric shapes that have the same shape and size
Congruent figures are two or more geometric shapes that have the same shape and size. In other words, they are identical in every way. When two figures are congruent, it means that they can be superimposed on top of each other and completely overlap.
Here are some key properties of congruent figures:
1. Corresponding sides: All corresponding sides of congruent figures are equal in length. For example, if two triangles are congruent, then their corresponding sides, such as side AB of triangle A and side AB’ of triangle B, will have the same length.
2. Corresponding angles: All corresponding angles of congruent figures are equal in measure. For example, if two triangles are congruent, then their corresponding angles, such as angle A of triangle A and angle A’ of triangle B, will have the same measure.
3. Shape: Congruent figures have the same shape. For example, if two triangles are congruent, then their interior angles will have the same measures and their sides will have the same lengths, resulting in the same shape.
4. Size: Congruent figures have the same size. This means that all corresponding sides and angles of congruent figures are equal in measure, resulting in shapes that have the same dimensions.
5. Reflection symmetry: Congruent figures have reflection symmetry. This means that if you can reflect one figure over a line of symmetry, it will overlap perfectly with the other figure.
When working with congruent figures, there are several methods to prove their congruence. These include using congruence postulates, such as Side-Side-Side (SSS), Side-Angle-Side (SAS), Angle-Side-Angle (ASA), and Angle-Angle-Side (AAS). By using these postulates, you can establish that the corresponding sides and angles of two figures are congruent, proving their overall congruence.
Overall, congruent figures play a fundamental role in geometry as they help establish similarity, symmetry, and relationships between different geometric shapes.
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