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Similarity Chapter 8
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Similar Polygons I can find corresponding lengths, perimeters, and areas in similar polygons.
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Similar Polygons Vocabulary (page 223 in Student Journal)
similar figures (~): figures with the same shape, but different size
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Similar Polygons Core Concepts (page 223 and 224 in Student Journal)
Corresponding Parts of Similar Polygons corresponding angles are congruent corresponding sides are proportional (the ratio of any 2 corresponding sides is equal to the scale factor) Perimeters of Similar Polygons Theorem (Theorem 8.1) If 2 polygons are similar, then the ratio of their perimeters is equal to the ratios of their corresponding side lengths.
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Similar Polygons Areas of Similar Polygons Theorem (Theorem 8.2)
If 2 polygons are similar, then the ratio of their areas is equal to the square of the ratios of their corresponding side lengths.
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Similar Polygons Examples (page 225 in Student Journal)
#2) The polygons are similar. Find the value of x.
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Similar Polygons Solution #2) x = 10
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Similar Polygons ABCDE ~ KLMNP #3) Find the scale factor from
KLMNP to ABCDE. #7) Find the ratio of the perimeters from ABCDE to KLMNP. #8) Find the ratio of the areas from ABCDE to KLMNP.
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Similar Polygons Solutions #3) 3/2 #7) 2/3 #8) 4/9
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Similar Polygons Additional Example (space on pages 223 and 224 in Student Journal) a) Determine if GNMH is similar to MLKH. Explain.
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Similar Polygons Solution
a) yes, all corresponding angles are congruent and all corresponding side lengths are proportional with a scale factor of 2.5
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Proving Triangle Similarity by AA
I can use the Angle-Angle Similarity Theorem.
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Proving Triangle Similarity by AA
Core Concepts (page 228 in Student Journal) Angle-Angle Similarity Theorem (AA~) (Theorem 8.3) If 2 angles in 1 triangle are congruent to 2 angles in another triangle, then the triangles are similar.
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Proving Triangle Similarity by AA
Examples (pages 229 and 230 in Student Journal) Determine if the triangles are similar. If so, write a similarity statement. If not, explain. #1)
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Proving Triangle Similarity by AA
Solution #1) yes, by AA~ triangle ABC is similar to triangle EFD
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Proving Triangle Similarity by AA
Show (prove) that the 2 triangles are similar. #3)
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Proving Triangle Similarity by AA
Solution #3) angle C is congruent to angle C (reflexive), angle E is congruent to angle BDC (corresponding angles), triangle ACE is similar to triangle BCD (AA~)
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Proving Triangle Similarity by AA
Additional Example (space on page 228 in Student Journal) a) A flag pole casts a shadow 45 feet long. At the same time a boy, who is 5’8” tall casts a shadow that is 51 inches long. How tall is the flag pole?
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Proving Triangle Similarity by AA
Solution a) 60 feet
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Proving Triangle Similarity by SSS and SAS
I can use the Side-Side-Side Similarity Theorem and the Side-Angle-Side Similarity Theorem.
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Proving Triangle Similarity by SSS and SAS
Core Concepts (pages 233 and 234 in Student Journal) Side-Side-Side Similarity Theorem (SSS~) (Theorem 8.4) If the corresponding sides of 2 triangles are proportional, then the triangles are similar. Side-Angle-Side Similarity Theorem (SAS~) (Theorem 8.5) If an angle in 1 triangle is congruent to an angle in another triangle and the sides that include the 2 angles are proportional, then the triangles are similar.
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Proving Triangle Similarity by SSS and SAS
Examples (pages 234 and 235 in Student Journal) #1) Determine whether triangle RST is similar to triangle ABC.
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Proving Triangle Similarity by SSS and SAS
Solution #1) no, the corresponding sides are not proportional
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Proving Triangle Similarity by SSS and SAS
#3) Find the value of x that makes triangle RST similar to triangle HGK.
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Proving Triangle Similarity by SSS and SAS
Solution #3) x = -3
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Proving Triangle Similarity by SSS and SAS
Additional Example (spaces on pages 233 and 234 in Student Journal) a) The drawing represents a scale drawing of a triangular roof truss. The actual lengths of the 2 upper sides are 18 feet and 40 feet, with an included angle of 110 degrees. Is the scale drawing similar to the actual truss?
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Proving Triangle Similarity by SSS and SAS
Solution a) no, the sides are not proportional
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Proportionality Theorems
I can use the Triangle Proportionality Theorem and its converse.
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Proportions in Triangles
Core Concepts (pages 238 and 239 in Student Journal) Triangle Proportionality Theorem (Theorem 8.6) If a line parallel to 1 side of a triangle intersects the other 2 sides, then it divides the 2 sides proportionally. Converse of the Triangle Proportionality Theorem (Theorem 8.7) If a line divides 2 sides of a triangle proportionally, then it is parallel to the 3rd side.
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Proportions in Triangles
Three Parallel Lines Theorem (Theorem 8.8) If 3 parallel lines intersect 2 transversals, then they divide the transversals proportionally. Triangle Angle Bisector Theorem (Theorem 8.9) If a ray bisects an angle of a triangle, then it divides the opposite side into 2 segments that are proportional to the other 2 sides of the triangle.
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Proportions in Triangles
Examples (pages 239 and 240 in Student Journal) #2) Find the length of segment AB.
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Proportions in Triangles
Solution #2) 14/9
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Proportions in Triangles
Determine if segment AB is parallel to segment XY. #4)
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Proportions in Triangles
Solution #4) The ratios of corresponding lengths are proportional, so by the Converse of the Triangle Proportionality Theorem the segments are parallel.
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Proportions in Triangles
#5) Use the diagram to complete the proportion.
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Proportions in Triangles
Solution #5) XZ
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Proportions in Triangles
#8) Find the value of x.
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Proportions in Triangles
Solution #8) x = 3
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