Surface Area of 3 – Dimensional Figures

1. Surface Area of 3 – Dimensional Figures Cubes and Rectangular Prisms

2. Definition • Surface area is the sum of the areas of all the surfaces of a 3 – Dimensional figure. • It is basically the outside layer or surface. • Example: When you paint a wall, you are painting the surface of the wall.

3. Surface Area of Cubes • Remember that a cube is made up of squares on all sides. There are 6 sides to a cube, just like dice. Therefore, there are 6 squares total. To find the surface area, find the area of one square and then multiply by 6. Simply use the following formula. • S.A. = 6s2

4. Example 4 cm • Find the surface area of the cube. • Recall that all of the sides of a square are the same length. So, all you have to do is multiply the sides. • Find the area first. The length and the width are both 4 cm. 4 x 4 = 16. Thus, the area of one square is 16 cm2. Now multiply by 6 and we see that the surface area is 96 cm2. 4 cm

5. YOUR TURN!!! 7 mm • Find the surface area of the following cube. • What is the length and width of the cube? 7 mm • Now, find the area of one square. 7 x 7 = 49. Thus, the area of one square is 49 mm2. • Take this and multiply by 6 and 49 x 6 = 294 mm2. So, the surface area of the cube is 294 mm2. 7 mm

6. Rectangular Prisms • To find the surface area of a prism, you have to find the areas of all the sides and add them up. • Understand that there are still 6 sides to a prism and that opposite sides are the same shape. • To find the surface area of a rectangular prism use the following formula. • S.A. = 2(wh + lh + lw)

7. Example • Find the surface area of the prism. 7 m 1 m 12 m S.A. = 2(1 x 7 + 12 x 7 + 12 x 1) S.A. = 2 (7 + 84 + 12) S.A. = 2 (103) S.A. = 206 The surface area is 206 m2. Surface area is just like finding the regular area. The unit of measurement is squared.

8. TAKE THE CHALLENGE! • You find the surface area of the following prism. 7 ft 4 ft 26 ft

9. CHALLENGE Cont. • S.A. = 2(4 x 7 + 26 x 7 + 26 x 4) • S.A. = 2(28 + 182 + 104) • S.A. = 2(314) • S.A. = 628 • The surface area is 628 ft2

10. SAMPLE ARMT QUESTION • David has two shapes he is painting for a project. For each of the two shapes, he will paint only the outside including the lid. • One shape is a cylindrical can with a radius of 4 inches and a height of 9 inches. • The other shape is a rectangular prism-shaped box. The box is 3 inches wide, 8 inches long, and 5 inches high. • Which shape has the greater surface area for David to paint?

11. Sample ARMT Question Cont. • First, find the surface area of the cylinder. • Formula: (2 x 3.14 x r x h) + (2 x 3.14 x r2) • Stick the numbers in directly. • (2 x 3.14 x 4 x 9) + (2 x 3.14 x 4 x 4) • This equals 226.08 + 100.48 • Add these together and the surface area of the cylinder is 326.56 square inches.

12. Sample ARMT Question Cont. • Next, find the surface area of the rectangular prism. • Formula: 2(wh + lh + lw) • Stick the numbers in directly. • 2(3·5 + 8·5 + 8·3) • This equals 2(15 + 40 + 24) • This equals 2(79) = 158 • The surface area of the rectangular prism is 158 square inches.

13. ANSWER • The cylinder has a surface area of 326.56 square inches. • The rectangular prism has a surface area of 158 square inches. • The cylindrical can has the greater surface area to paint.