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Applying Parallel Lines to Polygons Lesson 3.4 Pre-AP Geometry.

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Presentation on theme: "Applying Parallel Lines to Polygons Lesson 3.4 Pre-AP Geometry."— Presentation transcript:

1 Applying Parallel Lines to Polygons Lesson 3.4 Pre-AP Geometry

2 Objectives 1.Classify triangles according to sides and to angles. 2.State and apply the theorem and the corollaries about the sum of the measure of the angles of a triangle. 3.State and apply the theorem about the measure of an exterior angle of a triangle.

3 Triangle A figure formed by three segments joining three non-collinear points. Each of the three points is called a vertex of the triangle. The segments are the sides of the triangle. A B C

4 Classifying Triangles There are two ways of classifying triangles by their sides by their angles

5 Equilateral Triangle All sides are the same length.

6 Isosceles Triangles At least two sides are the same length

7 Scalene Triangles No sides are the same length

8 Acute Triangles Acute triangles have three acute angles

9 Right Triangles Right triangles have one right angle

10 Obtuse Triangles Obtuse triangles have one obtuse angle

11 Equiangular Triangle Equiangular triangles have all congruent angles.

12 Auxiliary Line A line, not originally a part of a diagram, that is added to more clearly show a relationship. Auxiliary lines are usually shown as dashed lines.

13 Theorem 3-11 The sum of the measures of the angles of a triangle is 180º.

14 Definition: Corollary A corollary is a statement which follows readily from a previously proven statement, typically a mathematical theorem.

15 Corollary 1 If two angles of one triangle are congruent to two angles of another triangle, then the third angles are congruent.

16 Corollary 2 Each angle of an equiangular triangle has a measure of 60º.

17 Corollary 3 In a triangle, there can be at most one right angle or obtuse angle.

18 Corollary 4 The acute angles of a right triangle are complementary.

19 Definitions Exterior Angle An angle that forms a linear pair with one of the interior angles of the triangle. Remote Interior Angles In a triangle, the two angles that are non- adjacent to the exterior angle of interest.

20 Theorem 3-12 The measure of an exterior angle of a triangle equals the sum of the measures of the two remote interior angles. A B C

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