What is the surface area of a right rectangular prism where each edge length measures 15.1c * m ^ 7 (1 point)
8, 208.36c * m ^ 2
900c * m ^ 2
1, 350c * m ^ 2
1, 368.06c * m ^ 2
To find the surface area of a right rectangular prism, we need to calculate the area of each side and add them together.
Since each edge length measures 15.1c * m^7, the length of one side of the prism is 15.1c * m^7.
1. The area of the top and bottom sides of the prism is given by length * width = 15.1c * m^7 * 15.1c * m^7 = (15.1c * m^7)^2 = 228.01c^2 * m^14.
2. The area of the front and back sides of the prism is given by length * height = 15.1c * m^7 * 15.1c * m^7 = (15.1c * m^7)^2 = 228.01c^2 * m^14.
3. The area of the left and right sides of the prism is given by width * height = 15.1c * m^7 * 15.1c * m^7 = (15.1c * m^7)^2 = 228.01c^2 * m^14.
To find the surface area, we need to add the areas of all six sides together.
Surface Area = 2(area of top and bottom) + 2(area of front and back) + 2(area of left and right)
Surface Area = 2(228.01c^2 * m^14) + 2(228.01c^2 * m^14) + 2(228.01c^2 * m^14)
Surface Area = 456.02c^2 * m^14 + 456.02c^2 * m^14 + 456.02c^2 * m^14
Surface Area = 1368.06c^2 * m^14
Therefore, the surface area of the right rectangular prism is 1,368.06c * m^2.