A necklace comes in a jewelry box whose net is shown in this image. What is the surface area of the box?
Based on the dimensions you provided (8, 3, 6, 6, 3, 6, 6, 8), we can determine the surface area of the box.
The box consists of 6 faces:
- 2 faces with dimensions 8 x 3 = 24 square units each
- 2 faces with dimensions 6 x 3 = 18 square units each
- 2 faces with dimensions 6 x 8 = 48 square units each
To find the total surface area, add up the areas of all faces:
24 + 24 + 18 + 18 + 48 + 48 = 180 square units
Therefore, the surface area of the box is 180 square units.
A necklace comes in a jewelry box whose net is shown in this image. What is the surface area of the box?
I'm unable to view the image you are referring to, however, if the jewelry box net consists of 6 faces (4 rectangles and 2 squares), you can calculate the surface area by finding the area of each face and adding them up.
1. Identify the dimensions of each face from the net.
2. Calculate the area of each face.
3. Add all the areas together to get the total surface area of the box.
If you can provide me with the dimensions of the faces from the net, I can help you calculate the surface area of the jewelry box.
it includes 8 3 6 6 3 6 6 8
in2
To convert square units to square inches, we need to use the conversion factor that 1 square unit is equal to 1.55 square inches.
Therefore, the surface area of the box in square inches is:
180 square units * 1.55 square inches/square unit = 279 square inches
So, the surface area of the box is 279 square inches.
To find the surface area of the box, we need to determine the area of each face and add them up.
The necklace box has 6 faces:
- 4 rectangular faces with dimensions 5 cm x 8 cm = 4 * (5 cm * 8 cm) = 160 cm^2
- 1 rectangular face with dimensions 8 cm x 10 cm = 8 cm * 10 cm = 80 cm^2
- 1 rectangular face with dimensions 5 cm x 10 cm = 5 cm * 10 cm = 50 cm^2
Adding up the areas of all 6 faces, we get:
160 cm^2 + 160 cm^2 + 80 cm^2 + 80 cm^2 + 50 cm^2 + 50 cm^2 = 580 cm^2
Therefore, the surface area of the box is 580 cm^2.