Symmetric Property of Congruence
The Symmetric Property of Congruence is one of the fundamental properties in geometry that deals with congruent figures
The Symmetric Property of Congruence is one of the fundamental properties in geometry that deals with congruent figures. In simple terms, it states that if two figures, such as line segments, angles, or polygons, are congruent to each other, then the order in which they are compared does not matter.
Mathematically, the statement of the Symmetric Property of Congruence is as follows:
If segment AB is congruent to segment CD, then segment CD is also congruent to segment AB.
This property can be written symbolically as:
If AB ≅ CD, then CD ≅ AB.
To understand the Symmetric Property, let’s consider a practical example:
Suppose we have two line segments, AB and CD. We are given that AB is congruent to CD, which can be written as AB ≅ CD. This means that the lengths of AB and CD are equal.
According to the Symmetric Property of Congruence, we can reverse the order and say that CD is congruent to AB, written as CD ≅ AB. This implies that the lengths of CD and AB are still equal.
In other words, the Symmetric Property of Congruence allows us to interchange the names or labels of the congruent line segments, without changing their equality.
The Symmetric Property is not limited to line segments; it can also be applied to angles, triangles, or any other figures that can be classified as congruent. The property remains the same: if two figures are congruent, their congruence can be written in either order.
Overall, the Symmetric Property of Congruence is a useful tool in geometry, allowing us to rearrange and compare congruent figures more flexibly, without altering their equality.
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