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Transcript
Angle Relationships in Triangles Geometry (Holt 4-3) K. Santos Triangle Sum Theorem (4-3-1) The sum of the angle measures of a triangle is 180°. m< A + m<B + m<C =180°. A B C Corollary A corollary is a theorem whose proof follows directly from another theorem. “Mini-theorem” For example—there are two corollaries to the Triangle Sum Theorem Corollary 1 (4-3-2) The acute angles of a right triangle are complementary. E m< D and m< E are complementary m< D + m< E = 90° D F Example One of the acute angles in a right triangle measures 27°. What is the measure of the other acute angle? 27 + x = 90 x = 63° Example Find x, y and z yx 54° 62° Z + 90 =180 Z = 90 Z + 62 + x = 180 90 + 62 + x = 180 152 + x = 180 x = 28° y + 54 + 90 = 180 y + 144 = 180 y = 36° Corollary 2 (4-3-3) The measure of each angle of an equiangular triangle is 60°. A B m< A = m< B = m< C = 60° 180 3 = 60° C Interior vs Exterior 2 Exterior Interior 1 3 4 Exterior angle <4 Interior angles <1, < 2, < 3 Remote interior angles to <4 <1 and < 2 Exterior Angle Theorem (4-3-4) The measure of an exterior angle of a triangle is equal to the sum of the measures of its remote interior angles. 2 1 3 4 Exterior angle = sum of remote interior angles m< 4 = m< 1 + m< 2 Example 1 (exterior angle) Find x. 53° x 90 + 53 = x 143° = x Example 2 (remote interior angle) Find x. x 110 x + 110 = 145 x = 35° 145 Example 3 (algebraic) H Find m< J and m< H. F m< H + m< J= m< FGH 4x + 18 + 5x + 2 = 128 9x + 20 = 128 9x = 108 x= 12 m< H = 4(12) + 18 m< J = 5(12) + 2 m< H = 66° m< J = 62° (check 66 + 62 = 128) 128° G 4x + 18 5x + 2 J Third Angles Theorem (4-3-5) If two angles of one triangle are congruent to two angles of another triangle, then the third pair of angles are congruent. L R N If: < L ≅ <R <M≅<S Then: < N ≅ <T M S T Example—Third angles Find m< C and m< F. m< C = 4y - 8 m< F = 2y +10 <C ≅ <F 4y – 8 = 2y +10 2y – 8 = 10 2y = 18 y=9 m< C = 4y – 8 m< C = 4(9) - 8 m< C = 28° F A B C m< F = 2y +10 m< F = 2(9) +10 m< F = 28° D E
