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Transcript
Math 3 Honors Name: ________________________ Similarity and Proportion Notes Example 1: x 3 14 4 7 7(x+3) = 4(14) 7x + 21 = 56 7x = 35 x=5 3 12 x 8 2 6 x 2(1) = 6x 2 = 6x 2/6 =x = 1/3 Example 2: 3(8) = 12x 24 = 12x x=2 7 x 4: Solve for x: 12 36 5: Solve for y: Example 3: 8 12 y2 9 2z 2 8 6: Solve for z: 9 SIMILAR SHAPES: If two shapes are similar, then the ratio of their corresponding sides are equal 18 z x 21 10 y 6 20 15 27 x 9 18 y 8 z x = _____ y = ____ z = ______ x = ____ y = ______, z = ________ 16 15 y 12 x z 10 14 x = ___________, y = ______________, z = _________________ 25 x+5 10 X 4 35 Find x = ____________ 11 17 34 Y y = _________________ Find x = __________________ y+7 18 27 30 x – 12 V 9 25 2x + 3 42 129.5 147 18 5y – 2 Find x = _____________ Find x = _____________ y = _____________ y = _____________ v = _____________ Scale Factor of Sides Scale factor of Perimeter Scale factor of Area Scale factor of Volume a:b a:b a2:b2 a3:b3 2:7 4:25 1:8 1:3 85% of the original Example 5: Two triangles are similar. The length of corresponding sides are 3:5. The perimeter of the smaller triangle is 12cm. What is the perimeter of the larger triangle? The area of the larger triangle is 100cm2. What is the area of the of the smaller triangle? Example 10: Two triangles are similar. The triangles have areas of 36cm2 and 25cm2. Two sides of the larger triangle is 12 cm and 18cm. The side of the smaller triangle that isn’t corresponding to the two given sides of the larger triangle is 5cm. Find the missing sides and the perimeter of the triangles Methods for Proving Triangles Similar: 1. Angle-Angle (AA) Similarity Postulate If two angles of one triangle are congruent to two ________________________ of another triangle, then the triangles are ___________________________. 2. Side-Side-Side (SSS) Similarity Theorem If the lengths of the corresponding sides of two triangles are ________________________, then the triangles are similar. 3. Side-Angle-Side (SAS) Similarity Theorem If an angle of one triangle is _________________________________ to an angle of another triangle and the sides that include these angles are _________________________________, then the triangles are similar. What is the distance across the river? Using Similar Triangles: How tall is the building?
