Answer:
[tex]10\dfrac{1}{2}in^{2}[/tex]
Step-by-step explanation:
If we solve for the surface area for each of the 14 cubes, we will come up with a surface area larger than the shape. The best way to go around this is to solve for each face of the shape.
The shape has a total of 42 faces.
The volume of a cube is s³, each cube is [tex]\dfrac{1}{8}in^{3}[/tex]or can be converted to [tex](\dfrac{1}{2}in)^{3}[/tex]. So a single cube have edges that are [tex]\dfrac{1}{2}in[/tex].
The area of a single face of each cube is [tex](\dfrac{1}{2}in)^{2}[/tex]. We can also write this as [tex]\dfrac{1}{4}in^{2}[/tex].
Now that we have the area of a single face in the shape, we simply multiply the area by 42 faces.
Surface Area = [tex]\dfrac{1}{4}in^{2}[/tex] x 42
Surface Area = [tex]10\dfrac{1}{2}in^{2}[/tex]
