ML # 1: Similar Figures and Scale Drawings (Unit 7 Math 7 PLUS) SCALE FACTOR: SIMILAR FIGURES:

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ML # 1: Similar Figures and Scale Drawings (Unit 7 Math 7 PLUS) SCALE FACTOR: SIMILAR FIGURES:

Corresponding Sides and Angles Corresponding Sides and Angles: Sides or angles that lie in the same location on different similar figures A Ratio of Sides 9 : 12 : 15 Ratio of Sides3 : 4 : 5 D 9 15 5 3 F B 12 C E 4 CORRESPONDING SIDES CORRESPONDING ANGLES SIMILAR FIGURES Part II What must occur in order for two figures to be similar? a) Corresponding angles all have the same measure. b) The ratios of the lengths of corresponding sides are proportional. *Would the following rectangles be similar? Why or why not? 1) 4 in by 12 in and 12 in by 24 in 2) 6 in by 2 in and 3 in by 1 in 3) Compare the sides below and prove or disprove if these triangles are similar using the side relationships. 8 cm 20 cm 6 cm 2 cm 15 cm 5 cm

Using proportions to find missing lengths of similar figures: **Figures are NOT drawn to scale!! 2) 3) 1) 12 21 13 11 26 3 4.5 28.8 17.5 4) 21 X 9.2 4.2 5) 70 36 1 1 14 22 X 6) If you enlarge the rectangle by a scale factor of 3 how does the perimeter and area of the new rectangle compare to the perimeter and area of the original rectangle? 5 in 9 in Original Rectangle Perimeter: Area: New Rectangle Perimeter: Area:

Shadow/ Mirror Method 1) Assume a street sign is 8 ft tall and casts a shadow 22 ft long. A nearby tree casts a shadow 58 ft. How tall is the tree? 8ft 58 ft 22ft 2) Imagine you are 6.5 feet tall and your younger sibling is 4.5 feet tall. Your sibling casts a shadow 21 feet long. How long would you cast a shadow? 3) Mirror Method: How tall is the building? 5.5 ft 6 ft 14 ft Scale Drawings mirror 1) Julie shows the scale drawing of her room below. If each 2 cm on the scale drawing equals 5 ft, what are the actual dimensions of Julie s room? 2) Mariko has an 80:1 scale-drawing of the floor plan of her house. On the floor plan the dimensions of her rectangular living room are inches by inches. What is the area of her real living room in square feet? 3) A scale on a map reads, 1 in: 40 miles. If the distance on a map from Raleigh to Greensboro is 1 ¾ inches, how far will you drive? 4) A scale drawing of a room has a 1 cm: 3 m scale. If the window is 3 cm from the door in the model, what is the actual distance between the window and the door?

DIRECTIONS for ML #1: Work through each section step by step. Scale Factor 1) Use the graph paper to draw a rectangle that has a width of 2 and a length of 4. 2) You are now going to take the 2 by 4 rectangle and enlarge it by a scale factor of 3. You will make the length and width 3 times the original and draw the new rectangle. 3) Make a ratio of the length to width for both rectangles. What do you notice about their ratios? 4) Find the perimeter and area of both rectangles. How does the enlarged rectangle s perimeter and area compare with the original rectangle s perimeter and area? 5) Make a new rectangle that is 8 by 16. 6) You are now going to take the 8 by 16 rectangle and reduce it by a scale factor of. You will make the length and width times the original, and draw the new rectangle. 7) Make a ratio of the length to width for both rectangles. What do you notice about their ratios? 8) Find the perimeter and area of both rectangles. How does the enlarged rectangle s perimeter and area compare with the original rectangle s perimeter and area? Similar Figures 1) The rectangles you made above are pairs of similar rectangles. 2) Based on the above activity, give a definition of similar figure. Corresponding Sides and Angles 1) Read the given definition of corresponding sides and angles 2) Label corresponding sides and angle 3) What do you notice about the corresponding angles measures in the similar triangles? 4) What do you notice about the ratios of the sides? Similar Figures Part II 1) Read the given information and see if you can decide if two shapes are similar 2) Continue and see if you can set up proportions to find missing sides in similar figures. Shadow Method and Scale Drawings 1) These are eamples of indirect measurement 2) Use what you know about proportions and similar figures to help find the missing lengths using the Shadow Method or Mirror Method

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