Answer:-
The transitive property of congruence states that if two figures or objects are congruent to a third figure, they must also be congruent to each other. In mathematical terms, if figure A is congruent to figure B, and figure B is congruent to figure C, then figure A is congruent to figure C. This property is often used in geometry when proving the equality of angles or sides in triangles or other shapes. It helps establish relationships between geometric objects by linking their congruence through a common third object. Essentially, congruence "passes through" a shared element.
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