Two triangles ABC and PQR are such that AB = 3.5 cm, BC = 7.1 cm, AC = 5 cm, PQ = 7.1 cm, QR = 5 cm and PR = 3.5 cm. Check whether the triangles are congruent. Triangle ABC and PQR are congruent ( △ ABC ≅△ PQR) if length ∠ BAC = ∠ PRQ, ∠ ACB = ∠ PQR. The Angle – Side – Angle rule (ASA) states that: Two triangles are congruent if their corresponding two angles and one included side are equal. Triangle ABC and PQR are said to be congruent ( △ ABC ≅△ PQR) if length AB = PR, AC = QP, and BC = QR. The side – side – side rule (SSS) states that: Two triangles are congruent if their corresponding three side lengths are equal. ∠ BAC = ∠ QPR, ∠ AC B = ∠ RQP and length AB = QR, then triangle ABC and PQR are congruent ( △ ABC ≅△ PQR). The Angle – Angle – Side rule (AAS) states that two triangles are congruent if their corresponding two angles and one non-included side are equal. Given that length AB = PR, AC = PQ and ∠ QPR = ∠ BAC, then Triangle ABC and PQR are congruent ( △ ABC ≅△ PQR). Remember that the included angle must be formed by the two sides for the triangles to be congruent. Side Angle Side (SAS) is a rule used to prove whether a given set of triangles are congruent. In this case, two triangles are congruent if two sides and one included angle in a given triangle are equal to the corresponding two sides and one included angle in another triangle. You will see in the diagrams below that the sides with one tic mark are of the same measurement, the sides with two tic marks also have the same length, and the sides with the tic marks are equal. You will often see the sides and angles of a triangle are marked with little tic marks to specify the sets of congruent angles or congruent sides. There are more ways to prove the congruency of triangles, but in this lesson, we will restrict ourselves to these postulates only.īefore going into the detail of these postulates of congruency, it is important to know how to mark different sides and angles with a certain sign which shows their congruency. Side – Side – Side ( SSS), Side – Angle – Side ( SAS), Angle – Side – Angle ( ASA), and Angle – Angle – Side ( AAS). These four criteria used to test triangle congruence include: Two triangles are said to be congruent if and only if we can make one of them superpose on the other to cover it exactly. Triangle congruences are the rules or the methods used to prove if two triangles are congruent. Triangles can become congruent in three different motions, namely, rotation, reflection, and translation. In triangles, we use the abbreviation CPCT to show that the Corresponding Parts of Congruent Triangles are the same.Ĭongruency is neither calculated nor measured but is determined by visual inspection. In other words, Congruent triangles have the same shape and dimensions.Ĭongruency is a term used to describe two objects with the same shape and size. Two or more triangles are said to be congruent if their corresponding sides or angles are the same. You must be well aware of a triangle by now - that it is a 2-dimensional figure with three sides, three angles, and three vertices. If you cut both the photocopies in the same manner, you will see both of them form the same kind of a triangle, which has the same sets of angles and sides. We can say the pages are similar or congruent.įurther, the A4 page is in a rectangular shape, so when you cut it diagonally, you will get the triangle. Even if you cut them out, you can line them up again easily. If you rotate or flip the page, it will remain the same as the original page. When you put an A4 page inside the machine and activate it, you get an identical copy of that page. You must be well aware of the photocopy machine. Congruent Triangles – Explanation & Examples
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