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Download Definition: A triangle is the union of three segments (called its sides
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Transcript
Definition: A triangle is the union of three segments (called its sides), whose endpoints (called its vertices) are taken, in pairs, from a set of three noncollinear points. Thus, if the vertices of a triangle are A, B and C, then its sides are , , and , and the triangle is then the set defined by c c , denoted by ªABC. The angles of ªABC are pA = pBAC, pB = pABC, and pC = pACB. There are another of associated terms that we could formally define. These include: A side opposite an angle A vertex opposite a side An angle included between two sides A side included between two angles Definition: Two segments and are said to be congruent (we write ) if and only if AB = XY. Two angles pABC and pXYZ are said to be congruent (and we write pABC pXYZ) if and only if mpABC = mpXYZ. Definition: A correspondence between vertices of two triangles is a one-to-one, onto mapping from the set of vertices of the first triangle to the second. Intuitively, a correspondence is a matching of vertices between two triangles. This matching also establishes a correspondence between sides and angles. Shorthand: ABC : XYZ iff A : X, B : Y, and C : Z. This also establishes : , : , : , as well as pA : pX, pB : pY, pC : pZ. Definition: If, under a certain correspondence between the vertices of two triangles, corresponding sides and corresponding angles are congruent, the triangles are said to be congruent. Recall that a definition is really an “if and only if” statement. We could reword this as Two triangles are said to be congruent if and only if there is a correspondence between the vertices such that corresponding sides and corresponding angles are congruent. We abbreviate this definition by saying, “Corresponding parts of congruent figures are congruent,” and further abbreviate this to CPCF. Notation: If ªABC is congruent to ªXYZ, we write ªABC ªXYZ. Note: This notation not only says that the two triangles ªABC and ªXYZ are congruent, but also establishes the correspondence under which they are congruent. (The correspondence is ABC : XYZ). Thus, ªABC ªXYZ if, and only if, , , pA pX, pB pY, pC pZ Properties of Congruence for Triangles: ªABC ªABC (Symmetric) If ªABC ªXYZ, then ªXYZ ªABC (Transitive) If ªABC ªXYZ, and ªXYZ ªUVW, then ªABC ªUVW 1. (Reflexive) 2. 3. Note: Because the statement ªABC ªXYZ is a statement about a particular correspondence, the statements ªABC ªCBA says something very different from ªABC ªABC. Among other things, ªABC ªCBA implies that pApC, which is not implied by ªABC ªABC The SAS Hypothesis: Under the correspondence ABC : XYZ, let two sides and the included angle of ªABC be congruent, respectively, to the corresponding two sides and the included angle of ªXYZ (that is, for example, , , and pA pX). If this hypothesis is satisfied, we want to be able to conclude ªABC ªXYZ We cannot do it from the current axioms. We will eventually adopt this as our penultimate axiom. First, however, we show that it is independent of our current axiom set.
