Mostly, the concept of congruent figures proves its utility when multiple items of the same specifications are to be developed at a mass level. Such practical examples tell us that congruence helps attain a level of mastery and prepares us for jobs where we apply it to meet certain objectives. The idea of congruence may further amaze you when you come across things of daily utility based on it. Below are three sets of congruent geometric figures. For example, line segments with the same length are congruent, and angles with the same measure are congruent. I suggested some congruent games to help you with applying this concept. In Geometry, two or more figures or objects are congruent if they have the same size and shape, usually referring to line segments, shapes/figures, and angles. Just like we read about the equality of numbers in elementary arithmetic class, we come across congruence while comparing two figures in a geometry session. This concept is useful in fields of:īesides practical utility, the congruence builds up the base for the learners and enables them to form a smoother understanding of the concepts of areas and volumes. For shapes to be congruent they must satisfy both the following conditions. If the sides match up, then it would be congruent. Plane shapes which have the same shape and are the same size are called congruent. The same intelligence helps understand the concept of congruent figures.Īlso, the figures may be in different planes still, they will be congruent when the sides, areas covered and the volume occupied are the same. In order to find if two shapes are congruent, you would manipulative one of the shapes to try and fit in on the other one. When you find two buildings, things, or products completely identical to each other, it is because of the spatial intelligence developed. Learning about congruence in figures is necessary to build our understanding of structures. When you place them one above the other, the congruent figures overlap point-to-point. Two angles are congruent if they have the same measure. In simple words, two figures are objects that are carbon-copy of each other are said to be congruent. Two figures are congruent if they have the same shape and size. Moving forth, you delve deeper and find a bit more interesting topics like congruence. ![]() It is when you come across terms like symmetry, parallel and intersecting lines, etc. ![]() Once you are through with elementary geometry and learn about measurements, you are all set to understand the relationships between two figures.
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