Similarity Solve for x X=6 X=-3, -3 X=16.5

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Presentation transcript:

Similarity Solve for x. 4. 5. 6. X=6 X=-3, -3 X=16.5 Determine if the following pairs of ratios are equivalent (try using a different method on each one). Solve for x. 4. 5. 6. X=6 X=-3, -3 X=16.5

What does it mean for a set of figures to be SIMILAR ?

What You Will Learn Use similarity statements. Find corresponding lengths in similar polygons. Find perimeters and areas of similar polygons. Decide whether polygons are similar.

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Each face of the four presidents displayed on Mount Rushmore is 60 feet high.

How do they know what dimensions to use for each face?

Similarity can be used to reduce something into a smaller, more manageable size, or enlarge something into a larger size so that it can be viewed more easily. This is done using the properties of dilation or proportion. enlarging a cell blueprints for a house looking at a globe

SIMILAR FIGURES HAVE… Proportional sides - corresponding sides are dilated by the same scale factor or have the same similarity ratio. Congruent angles – corresponding sides have equal measures The Scale Factor is

Similar Polygons Corresponding Parts: ∆ABC ~ ∆DEF is read “triangle ABC is __________________ to triangle DEF”. Corresponding angles: Ratios of corresponding side lengths: In the diagram, △RST ∼ △XYZ. a. Find the scale factor from △RST to △XYZ. b. List all pairs of congruent angles. c. Write the ratios of the corresponding side lengths in a statement of proportionality.

SIMILAR -Proportional Sides Find the missing side using proportion.

SIMILAR -Proportional Sides Find the missing side using proportion SIMILAR -Proportional Sides Find the missing side using proportion. Find y.

Find the Scale Factor given ∆LMN ~ ∆ RST M S 7 6 7.5 L 8 N T R 10 What is the scale factor if ∆LMN is dilated to ∆RST? A 16/15 B 4/5 C 5/4 D 1.5

Similar – Perimeter The triangles are similar. Find the perimeter of ∆ HNK. A 24unit B 40units C 30 units D 17.5 units Can you find the answer more than one way?

Theorem 8.1: If two polygons are similar, then the ratio of their perimeters is equal to the ratios of their corresponding side lengths. Practice

What properties should these figures have to be considered similar?

Similar or Not Similar that is the question? Really?