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Published byChristian Davidson Modified over 9 years ago
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TRIANGLE SUM PROPERTIES 4.1
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TO CLARIFY******* A triangle is a polygon with three sides. A triangle with vertices A, B, and C is called triangle ABC
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TRIANGLES ON A PLANE We can find the side lengths √(-1 – 0) 2 + (2 – 0) 2 = √5 ≈ 2.2 √(6 – 0) 2 + (3 – 0) 2 = √45 ≈ 6.7 √(6 – -1) 2 + (3 – 2) 2 = √50 ≈ 7.1 This is a scalene triangle We can also determine if it is a right triangle. (hint, look for perpendicular angles) Slope of OP = (2-0)/(-1-0) = -2 Slope of OQ = (3-0)/(6-0) = ½ The lines are perpendicular and form a right angle so this is a right scalene triangle
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TRY IT OUT Triangle ABC has the vertices A(0,0), B(3,3) and C (-3,3). Classify it by its sides. Then determine if it is a right triangle.
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EXTENDING SIDES When you extend the sides of a polygon there are new angles formed. The original angles (on the inside) are called interior* angles. The new angles formed are called exterior* angles.
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TRIANGLE SUM THEOREM 4.1: The sum of the measures of the interior angles of a triangle is 180°
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PROVE IT Given: Triangle ABC Prove: m<1 + m<2 + m<3 = 180° StatementsReasons 1.Draw BD parallel to AC 2.M<4 + m<2 + m<5 1.<1 c= <4, <3 c= <5 2.m<1 = m<4, m<3 = m<5 3.m<1 + m<2 + m<3 = 180° 1.Parallel Postulate 2.Addition Angle Postulate and def of a straight < 3.Alternate Interior Angles 4.Definition of congruent angles 5.Substitution property a b c 1 2 3 45
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EXTERIOR ANGLE THEOREM 4.2: The measure of an exterior angle of a triangle is equal to the sum of the measures of the two nonadjacent interior angles
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APPLY THEOREM 4.2 Find m<JKM Step 1: Write an equation Step 2: Plug in x (2x – 5) = 70 + x 2(75) -5 = 145
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COROLLARY* A corollary to a theorem is a statement that can be proved easily by using the theorem. Corollary to the triangle sum theorem: The acute angles of a right triangle are complementary
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APPLY CONGRUENCE 4.2
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CONGRUENT FIGURES Two figures are congruent if they have exactly the same size and shape. All of the parts of one figure are congruent to the corresponding parts* of the other figure.
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USE PROPERTIES OF CONGRUENT FIGURES DEFG c= SPQR Find x Find y 8 10
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THIRD ANGLES THEOREM 4.3: If two angles of one triangle are congruent to two angles of another triangle, then the third angles are also congruent.
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PROPERTIES OF CONGRUENT TRIANGLES THEOREM Reflexive property: ABC is congruent to ABC Symmetric property: if ABC is congruent to DEF then DEF is congruent to ABC Transitive Property: If ABC is congruent to DEF and DEF is congruent to JKL, then ABC is congruent to JKL
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