Respuesta :
Answer:
[tex]92 inches^2[/tex]
Step-by-step explanation:
The top and bottom of the box is 8 inches by 3 inches .
The sides are both 3 inches by 2 inches.
The front and back are 8 inches by 2 inches.
Refer the attached graph
So, Length of cuboid box is 8 inches
Width of cuboid box is 3 inches
Height of cuboid box is 2 inches
Now we are supposed to find how much wrapping paper will be required to wrap the present.
Total surface area of cuboid box =[tex]2(lw+wh+hl)[/tex]
=[tex]2(8 \times 3+ 3 \times 2+ 2 \times 8)[/tex]
=[tex]92 inches^2[/tex]
Hence [tex]92 inches^2[/tex] of wrapping paper is required.
Chloe needs wrapping paper to wrap the present which looks like a cuboid is 92 square inches.
What is Geometry?
It deals with the size of geometry, region, and density of the different forms both 2D and 3D.
Chloe wants to wrap a present in a box for Sarah the top and bottom of the box is 8 inches by 3 inches the sides are both 3 inches by 2 inches and the front and back are 8 inches by 2 inches.
Length (L) = 8 inches
Width (W) = 3 inches
Height (H) = 2 inches
Then the surface area of the cuboid will be
Surface area = 2 × (LW + WH + HL)
Surface area = 2 × (8×3 + 3×2 + 2×8)
Surface area = 2 × (24 + 6 + 16)
Surface area = 2 × (46)
Surface area = 92
More about the geometry link is given below.
https://brainly.com/question/7558603
