The surface area of a right rectangular prism is the total area of all the faces of the prism. To find the surface area, we need to calculate the area of each face and then add them together.
In the given question, the net of the right rectangular prism is shown, with three dimensions labeled as 2 in, 3 in, and 5 in.
To find the surface area, we need to consider each face of the prism. A right rectangular prism has 6 faces:
1. Top face: The top face of the prism has dimensions 2 in by 5 in. So, the area of the top face is 2 in × 5 in = 10 in².
2. Bottom face: The bottom face is identical to the top face, so it also has an area of 10 in².
3. Front face: The front face has dimensions 2 in by 3 in. Thus, the area of the front face is 2 in × 3 in = 6 in².
4. Back face: The back face is the same as the front face, so it also has an area of 6 in².
5. Left face: The left face has dimensions 3 in by 5 in, giving it an area of 3 in × 5 in = 15 in².
6. Right face: The right face is the same as the left face, so it also has an area of 15 in².
To find the total surface area, we add up the areas of all the faces:
10 in² (top) + 10 in² (bottom) + 6 in² (front) + 6 in² (back) + 15 in² (left) + 15 in² (right) = 62 in².
Therefore, the surface area of the given prism is 62 square inches.