# Which Composition Of Similarity Transformations Maps Polygon Abcd To Polygon A’b’c’d’?

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## INTRO:

Similarity transformations play a crucial role in preserving the shape and size of objects during transformations. They are particularly useful when mapping one polygon to another. This article explores the various combinations of similarity transformations that can be employed to transform polygon ABCD into polygon A’B’C’D’.

## Understanding the Transformations

Similarity transformations encompass three fundamental types of transformations: translations, rotations, and scaling. Translations involve shifting an object in a specific direction while maintaining its shape and size. Rotations entail rotating an object around a fixed point while preserving its shape and size. Scaling encompasses resizing an object, either enlarging or reducing its dimensions, while preserving its shape.

## Combining Transformations for Polygon Mapping

To map polygon ABCD onto polygon A’B’C’D’, a combination of similarity transformations is required. Initially, polygon ABCD must be translated so that its vertices align with those of polygon A’B’C’D’. Subsequently, a rotation is applied to polygon ABCD to orient its sides in the same manner as those of polygon A’B’C’D’. Finally, a scaling transformation is applied to polygon ABCD to ensure its sides have the same length as those of polygon A’B’C’D’.

By applying these transformations in sequence, polygon ABCD will become an identical match to polygon A’B’C’D’. Employing this combination of transformations represents the sole method of mapping one polygon to another while maintaining their respective shapes and sizes.

## OUTRO:

To summarize, a combination of similarity transformations—translation, rotation, and scaling—can be employed to map polygon ABCD onto polygon A’B’C’D’. Through the application of these transformations, both polygons will become identical in terms of shape and size.