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Transcript
Use Similar () Polygons (6.3) Same Shape Different Size! Definition: Two Polygons are Similar Polygons if: 1. corresponding angles are congruent and 2. corresponding side lengths are proportional. (ratios are ) In the diagram below ABCD EFGH F B C A Ex. Ex. G D E H List the corresponding angles: A _________ C _________ B _________ D _________ Write the ratio of corresponding sides: AB BC CD AD Definition: If two polygons are similar, the Scale Factor is the ratio of the lengths of any two corresponding sides. Ex. Find the scale factor of the similar polygons below 1 Determine whether the polygons below are similar. If they are write a similarity statement and find the scale factor. Remember: 1. corresponding angles must be congruent & 2. ratios of corresponding sides must reduce to the same fraction. Ex. Ex. In the diagram, DEF MNP N E Ex. Find the value of x x 9 D 12 20 12 F M 16 P Ex. Find the scale factor of DEF to MNP Ex. Perimeter of DEF = ___________ and Perimeter of MNP = __________ Ex. Find the ratio of the perimeter of DEF to the perimeter of MNP. 2 Theorem 6.1 Perimeters of Similar Polygons If two polygons are similar, then the ratio of their perimeters is equal to the ratios of their corresponding side lengths (which is the scale factor). If CDEF ~ MJKL, then In the diagram, WXYZ MNOP. Ex. Find the value z. Ex. Find the values of x & y. Find x Find y Ex. Find the scale factor of WXYZ to MNOP. Ex. Find the perimeter of WXYZ and the perimeter of MNOP. Ex. Find the ratio of the perimeter WXYZ of to the perimeter of MNOP. Note: Should be the same answer as the scale factor! 3 Corresponding Lengths in Similar Polygons If two polygons are similar, then the ratio of any two corresponding lengths in the polygon is equal to the scale factor of the similar polygons The altitude of one triangle is in proportion to the corresponding altitude of the other triangle. The median of one triangle is in proportion to the corresponding median of the other triangle. The perpendicular bisector of one triangle is in proportion to the corresponding perpendicular bisector of the other triangle In the diagram below, ABC EC A D G F C E B Ex. CF and CG are _______________________ of the triangles Ex. Find m 4
