![]() Two triangles are congruent if two angles and the included side are the same for both triangles. Our third shortcut to proving triangle congruence is the angle-side-angle (ASA) condition. As such (by SSS, if you like!), the triangle that is formed, XYZ, and the triangle ABC are congruent. But if we connect points X and Z, we end up with a line segment that is exactly the same length as segment AC. Note that figure XYZ corresponds exactly to the portion of the triangle ABC that omits side AC: if we were to set XYZ on top of the triangle, they would overlap perfectly. Consider again some triangle ABC, and let's copy two sides (sides AB and BC) and the angle between them (angle B) and construct the corresponding figure. ![]() We can demonstrate this congruence condition with a little more ease. Two triangles are congruent if two sides and the angle between them are the same for both triangles. ![]() Our second shortcut is the side-angle-side (SAS) condition. Interested in learning more? Why not take an online Geometry course? Now, consider the line segment congruent to side BC let's attach the other two sides at either end of this line segment, but we'll otherwise leave them dangling. Consider triangle ABC below, and let's construct line segments that are equal to each side of ABC. Let's take a little look at why this works. Two triangles are congruent if their sides are all congruent. Our first shortcut to proving that two triangles (we'll use triangles ABC and XYZ for the purposes of discussion) are congruent is called the side-side-side (SSS) condition. For each shortcut, we will demonstrate intuitive reasons why it works. Nevertheless, we don't need to demonstrate all six of these relationships to prove that triangles are congruent a number of shortcuts are available. Thus, these two triangles are similar.Īs mentioned above, congruent triangles must have all sides of equal length and all angles of equal measure. Note that although the sides are of different lengths, the same three interior angle measures are shared by both triangles. A pair of congruent triangles is shown below. The term congruent also applies to other figures: for instance, if two line segments are the same length, they are congruent, and if two angles are of the same measure, they are congruent. If two triangles have sides of the same length and angles of the same measure, then we say that they are congruent triangles. In the case of triangles, we can apply various techniques to show that two triangles are the same or that they are similar. Doing so, in some cases, allows us to acquire additional information for our analysis. When analyzing groups of figures or figures composed of several smaller parts, it is sometimes helpful to show that two particular figures or parts of a figure are the same or similar. O Learn how to prove that two triangles are congruent O Recognize the various conditions under which two triangles are congruent and know how to justify these conditions O Know the difference between congruent and similar triangles We will discuss a number of conditions that can be used to prove that two triangles are congruent (that is, prove that they are the "same" triangle), and we present intuitive geometric proofs for why these conditions work.
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