Classifying Triangles

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Presentation transcript:

Classifying Triangles 4.1 Triangles and Angles Classifying Triangles

Triangle Classification by Sides Equilateral 3 congruent sides Isosceles At least 2 congruent sides Scalene No congruent sides

Triangle Classification by Angles Equilangular 3 congruent angles Acute 3 acute angles Obtuse 1 obtuse angle Right 1 right angle

Vocabulary Vertex: the point where two sides of a triangle meet Adjacent Sides: two sides of a triangle sharing a common vertex Hypotenuse: side of the triangle across from the right angle Legs: sides of the right triangle that form the right angle Base: the non-congruent sides of an isosceles triangle

Label the following on the right triangle: Labeling Exercise Label the following on the right triangle: Vertices Hypotenuse Legs Vertex Hypotenuse Leg Vertex Vertex Leg

Label the following on the isosceles triangle: Labeling Exercise Label the following on the isosceles triangle: Base Congruent adjacent sides Legs m<1 = m<A + m<B Adjacent side Adjacent Side Leg Leg Base

More Definitions Interior Angles: angles inside the triangle (angles A, B, and C) 2 B Exterior Angles: angles adjacent to the interior angles (angles 1, 2, and 3) 1 A C 3

Triangle Sum Theorem (4.1) The sum of the measures of the interior angles of a triangle is 180o. B C A <A + <B + <C = 180o

Exterior Angles Theorem (4.2) The measure of an exterior angle of a triangle is equal to the sum of the measures of two nonadjacent interior angles. B A 1 m<1 = m <A + m <B

The acute angles of a right triangle are complementary. Corollary (a statement that can be proved easily using the theorem) to the Triangle Sum Theorem The acute angles of a right triangle are complementary. B A m<A + m<B = 90o