1. 7-9 Perimeter, Area, and Volume What You’ll Learn: To find the perimeter of polygons To find the perimeter of polygons To find the area of polygons/circles (circumference) To find the area of polygons/circles (circumference) To find the volume of shapes To find the volume of shapes To find the surface area of shapes To find the surface area of shapes

2. Perimeter Perimeter is the measurement around a figure Perimeter is the measurement around a figure When would you need to find the perimeter? When would you need to find the perimeter? How do you find the perimeter? How do you find the perimeter? To calculate the perimeter of a figure, add the lengths of all the sides of the figure. To calculate the perimeter of a figure, add the lengths of all the sides of the figure.

3. Finding the Perimeter Solution: Add all sides of the figure. P = 7 + 3 + 7 + 3 = 20 Answer: 20 inches

4. Finding the Perimeter

5. Area of Rectangle The area measurement of a figure refers to the number of square units needed to cover the surface of the figure. The area measurement of a figure refers to the number of square units needed to cover the surface of the figure. Some of the many real world applications for finding the area of figures include: Some of the many real world applications for finding the area of figures include: household projects household projects construction work construction work Sewing Sewing mowing the lawn. mowing the lawn.

6. Area of Rectangle The formula for calculating the area of a square or rectangle is: The formula for calculating the area of a square or rectangle is: Area = length x width Area = length x width

7. Example 1: A figure has a width of 3 inches and a length of 7 inches. What is the area of the figure? Step 1: Multiply the width and the length. Area = 7 x 3 = 21 Answer: 21 square inches

8. Example 2: What is the value of x? Step 1: The area of a rectangle can be found using the following formula: Area = length x width. The area and width are known, so substitute them into the formula for area. Step 2: Divide each side of the equation by 20m to isolate the x on one side of the equal sign. Step 3: 500 divided by 20 equals 25. Answer: x = 25 m

9. Area of Parallelogram A parallelogram is a quadrilateral (a four-sided figure) with two pairs of parallel and congruent sides. A parallelogram is a quadrilateral (a four-sided figure) with two pairs of parallel and congruent sides. Area is the measure, in square units, of the interior region of a two-dimensional figure Area is the measure, in square units, of the interior region of a two-dimensional figure To find the area of a parallelogram, multiply the base(b) by the height(h) To find the area of a parallelogram, multiply the base(b) by the height(h)

10. The base is the length of either the top or bottom. The height is the length of a line going from the base at a right angle to the opposite side. Here is the formula: Area of a parallelogram = (base) x (height)

11. Example 1: Find the area of a parallelogram with a base equal to 5 feet and a height equal to 2 feet? Area = 5 feet x 2 feet = 10 square feet Answer: 10 square feet

12. Area of Triangle The area of a triangle is the number of square units needed to cover the surface of the figure. The area of a triangle is the number of square units needed to cover the surface of the figure. The following is the formula needed for calculating the area of a triangle: The following is the formula needed for calculating the area of a triangle:

13. Example 1: Solve for the area of a triangle with base equal to 6 meters and height equal to 4 meters. Step 1: Apply the amounts given in the problem to the formula. Step 2: Perform the calculations to find the answer.

14. Areas of Other Figures Investigation text p. 413 Investigation text p. 413 Area of a trapezoid Area of a trapezoid

15. Area of a trapezoid A = ½ h (b 1 + b 2 ) A = ½ h (b 1 + b 2 ) A = ½ 6 (10 + 6) A = ½ 6 (10 + 6) A = 3 (16) A = 3 (16) A = 54 A = 54 6 10 6

16. Area of Irregular Figures Separate the figures Separate the figures Purple, blue, green Purple, blue, green Find the area of the figures and add the sums Find the area of the figures and add the sums Purple Purple Length X Width Length X Width Blue Blue Length X Width Length X Width Green Green ½ b x h ½ b x h 2 4 16 6

17. What is the circumference of the earth? The circumference of the earth at the equator is 24,901.55 miles The circumference of the earth at the equator is 24,901.55 miles

18. Circumference Circumference is the distance around a circle Circumference is the distance around a circle Pi is equal to about 3.14. The symbol for pi is Pi is equal to about 3.14. The symbol for pi is

19. Circumference The diameter is a line segment from one point on the circle through the center of the circle to another point on the circle. The diameter is a line segment from one point on the circle through the center of the circle to another point on the circle. The radius is a line segment from the center of a circle to a point on the circle. The radius is a line segment from the center of a circle to a point on the circle. The length of the diameter of a circle is twice the length of the radius of the circle The length of the diameter of a circle is twice the length of the radius of the circle

20. Example 1: What is the circumference of a circle with a diameter of 12 meters? (1) Circumference = 3.14 x 12 (2) Circumference = 37.68m Step 1: Substitute the value of the diameter into the formula for the circumference of a circle. Remember, pi is equal to about 3.14. Step 2: Multiply 3.14 by 12 to get the circumference of the circle. The circumference of the circle is 37.68 m.

21. What is the Diameter of the Earth? What is the Radius of the Earth? The circumference of the earth at the equator is 24,901.55 miles The circumference of the earth at the equator is 24,901.55 miles What factors go into the circumference? What factors go into the circumference?

22. Example 2: Joshua Pine High School has an oval track. Use the diagram to find the length of the track.

23. Area of Circle The area of a circle is the number of square units needed to cover the surface of the figure The area of a circle is the number of square units needed to cover the surface of the figure The following is the formula needed for calculating the area of a circle: The following is the formula needed for calculating the area of a circle:

24. Example 1: Solve for the area of a circle with a radius equal to 4 meters. (1) Area = 3.14 x (4 x 4) (2) Area = 3.14 x 16 (3) Area = 50.24 Step 1: Apply the amounts given in the problem to the formula. Step 2: Multiply the numbers within the parentheses. Step 3: Perform calculations to find the answer.

25. Area of Semi-Circle A semicircle is half of a circle. A semicircle is half of a circle. The area of a semicircle is exactly half of the area of a circle with the same radius The area of a semicircle is exactly half of the area of a circle with the same radius

26. Example 2: What is the area of the following semicircle?

27. Solid Figures Review page 576 Review page 576 Assign page 577 Assign page 577

28. Surface Area The surface area of a solid figure is the sum of the areas of all the surfaces. The surface area of a solid figure is the sum of the areas of all the surfaces. A face is one side of a solid figure. A face is one side of a solid figure. When trying to find the surface area of a figure, first find the area of each face, then add those areas together. When trying to find the surface area of a figure, first find the area of each face, then add those areas together.

29. Example 1: Find the surface area of the figure.

31. Example 2: Find the surface area of the figure.

33. Example 3: Find the surface area of the figure.

35. Volume of Rectangular Prisms Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units The formula for calculating volume of a rectangular prism is: The formula for calculating volume of a rectangular prism is: Volume = length x width x height Volume = length x width x height

36. Example 1: Find the volume of a rectangular prism with length = 6 inches, width = 4 inches, height = 2 inches. (1) Volume = 2 x 4 x 6 (2) Volume = 48 cubic inches

37. Volume of Cylinders Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units. A cylinder is a solid with two bases that are congruent circles. Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units. A cylinder is a solid with two bases that are congruent circles. The formula for calculating volume of a cylinder: The formula for calculating volume of a cylinder:

38. Example 1: Solve for the volume of a cylinder with the radius equal to 4 meters and a cylinder height equal to 10 meters.

39. Volume of Cone Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units. Volume is the measurement of a three- dimensional figure's interior space. Volume is measured in cubic units. A cone is a pyramid-like figure; however, the base is a circle. A cone is a pyramid-like figure; however, the base is a circle. The formula for solving the volume of a cone: The formula for solving the volume of a cone:

40. Example: Find the volume of a cone with a radius of 3 cm and a height of 10 cm, using 3.14 for pi.

42. Test Time Complete all assignments Check all notes (which can be used on test) Complete Reteaching 8-2 to 8-4; 8-8 & 8-9 Take test