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Transcript
Chapter 5 Triangles and Congruence Section 5.1 Triangles and Congruence Triangle – a three sided polygon Classification of Triangles By Sides Scalene – not two sides are congruent Isosceles – two sides are congruent Equilateral – all sides are congruent By Angles Acute – all angles are acute Obtuse – one obtuse angle Right – one right angle Can you have a triangle with 2 obtuse angles, or two right Theorem 5.1 Angle-Sum Theorem for Triangles The sum of the interior angles of a triangle is 180 degrees Auxiliary Figure – a point, line, ray or segment that is added to a figure to aid in a proof Theorem 5.2 Exterior Angle Theorem for Triangles The measure of an exterior angle of a triangle is equal to the sum of the measures of the two remote interior angles Section 5.2 Angles of Polygons Divide the polygon into triangles; each triangle has 180 degrees, multiply number of triangles by 180 Theorem 5.3 Angle Sum Theorem for Polygons The sum of the measures of the angles of a convex polygon with n sides is (n-2)*180 Corollary to a theorem is a theorem that follows easily from a previously proved theorem Corollary 5.4 The measure of each angle of a regular n-gon is (n 2)180 n Theorem 5.3 Exterior angle Theorem for a Polygon The sum of the measures of the exterior angles of a convex polygon, one angle at each vertex of the polygon is 360 Corollary 5.6 The measure of each exterior angle of a regular n-ogon is 360 n Section 5.3 Tessellations Go over ideas from section 4 about transformations in the plane Talk about Tesselations This depends on time otherwise wait until Christmas Chapter 5 Start of Proofs What does congruent and similar mean Congruent Triangles - idea of same shape and size - More specifically corresponding sides are congruent and corresponding angles are congruent We are going to compare correspond sides and angles to try and prove the triangles congruent Corresponding Parts - Sides and angles located in the same part of the polygon, triangle in this chapter - Could be congruent, this is what we are trying to prove Naming congruent triangles Make sure the congruent vertices are in the same order for the two triangles Look for a similar way to go around the triangle to be able to name them in the same order Postulate 17 Side Side Side Congruence Postulate SSS If 3 sides of one triangle are congruent to 3 sides of another triangle then the 2 triangles are congruent Look for the markings to show that they are congruent When angles are congruent Vertical angles The two triangles will form a bowtie Angel bisector – cuts an angle into 2 congruent angles Perpendicular – forms 4 congruent segments Segments congruent Midpoint – this is a point that divides a segment into 2 congruent segments Segment Bisector – cuts a segment into 2 congruent segments Reflexive segments – side of one triangle shared with the side of another triangle Postulate 18 Side Angle Side Postulate SAS If two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle then the two triangles are congruent - Included angle is the angle formed by the two consecutive sides Postulate 19 Angle Side Angle Postulate ASA If two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, then the two triangles are congruent Proofs These are used to prove objects congruent, triangles Has a statement and a reason Draw a large T statements are on the left and reasons are on the right Statements 1. The given is always written first 2. These are stating sides or angles congruent or even supplementary 3. Final statement is stating the triangles congruent Reasons 1. First reason is always the give 2. Reason should be no longer than 3 words, if you are starting to explain something stop and see if you can sum it up int 2 to 3 words a. Theorems b. Postulates c. Definitions d. Properties 3. Ask yourself 3 questions to help come up with the reason a. Why are these sides congruent b. Why are the angles congruent c. Why can I write this 4. Last reason is always one of the three postulates so far discussed, may be more added later When writing a proof Try and mark either on the picture or the proof itself when you have sides and angles congruent It doesn’t matter the order in the proof that you prove the sides and angles congruent In the picture when you mark the sides and angles congruent the result needs to be one of the 3 postulates so far discussed In order to use sides or angles as congruent they must be stated congruent someplace in the postulate Corresponding Parts of Congruent Triangles are Congruent CPCTC This is used to prove other parts of the triangles congruent once the triangles are proven congruent themselves This would then be the last part of the proof, always after the triangles are stated congruent Word problems and proofs Setting up congruent triangles to help calculate measurements or distances Use the idea of CPCTC to find the missing length you need Give answers and state why that is the answer Angle Angle Side Theorem If 2 angles and a non-included side of one triangle are congruent to 2 angles and a non-included side of another triangle, then the two triangles are congruent. Prove this theorem Why does this work If you know two angles of a triangle can you figure out the third, so if 2 angles are congruent then the third angle must be congruent as well Right Triangles Right Triangles have many special properties all because of the right angle We will discuss some of the properties in this chapter and discuss more as the year goes on hypotenuse leg leg Hypotenuse is always the longest side and is always the side across from the right angle Two other legs of triangle, not necessarily congruent just shorter than hypotenuse The other two angles are smaller than 90 degrees Other proofs we can use if they tell use it is a right triangle We still need to state the angle is a right angle in the proof in order to use these ideas Not all theorems but can be proven Hypotenuse Angle (HA) – if the hypotenuse and one angle or one triangle are congruent to the hypotenuse and one angle of another triangle then the triangles are congruent Hypotenuse Leg (HL) – if the hypotenuse and one leg of one triangle are congruent to the hypotenuse and one leg of another triangle then the two triangles are congruent Pythagoreans Theorem - a 2 b 2 c 2 , add the square of the two legs and it should equal the square of the hypotenuse Leg Leg (LL) – If the two legs of one triangle are congruent to the two legs of another triangle then the two triangles are congruent Leg Angle LA) – if one leg and one angle of one triangle are congruent to one leg and one angle of another triangle then the two triangles are congruent Overlapping Triangles Overlapping triangles Now we will have reflexive angles as well as reflexive sides Make sure you know what two triangles you are trying to probe congruent Maybe even draw them separately and label them again
