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6.3 – Use Similar Polygons

6.3 – Use Similar Polygons. Two polygons are similar polygons if corresponding angles are congruent and corresponding side lengths are proportional.

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6.3 – Use Similar Polygons

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  1. 6.3 – Use Similar Polygons Two polygons are similar polygons if corresponding angles are congruent and corresponding side lengths are proportional. In the diagram below, ABCD is similar to EFGH. You can write “ABCD is similar to EFGH” as ABCD ~ EFGH. Notice in the similarity statement that the corresponding vertices are listed in the same order

  2. 6.3 – Use Similar Polygons Example 1: In the diagram, Triangle RST ~ Triangle XYZ. List all pairs of congruent angles Check that the ratios of the corresponding side lengths are equal. Write the ratios of the corresponding side lengths in the statement of proportionality.

  3. 6.3 – Use Similar Polygons Scale Factor If two polygons are similar, then the ratio of the lengths of two corresponding sides is called the scale factor. In Example 1, the common ratio is 5/3 is the scale factor of Triangle RST to Triangle XYZ

  4. 6.3 – Use Similar Polygons Example 2: Determine whether the polygons are similar. If they are, write a similarity statement and find the scale factor of the big quadrilateral to the small quadrilateral.

  5. 6.3 – Use Similar Polygons Example 3: In the diagram, Triangle DEF ~ Triangle MNP. Find the value of x.

  6. 6.3 – Use Similar Polygons Perimeters The ratio of lengths in similar polygons is the same as the scale factor.

  7. 6.3 – Use Similar Polygons Example 4: A town is building a new swimming pool. An Olympic pool is rectangular with length 50 meters and width 25 meters. The new pool will be similar in shape, but only 40 meters long. Find the scale factor of the new pool to an Olympic pool. Find the perimeter of an Olympic pool and the new pool.

  8. 6.3 – Use Similar Polygons SIMILARITY and CONGRUENCE Notice that any two congruent figures are also similar. Their scale factor is 1:1. CORRESPONDING LENGTHS

  9. 6.3 – Use Similar Polygons EXAMPLE 5: In the diagram, Triangle TPR ~ Triangle XPZ Find the length of the altitude PS.

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