What is the surface area of a right prism that has these dimensions?
Base- 11" x 15 "
Back- 10" x 15"
Front-?
What is the surface area of a right prism that has these dimensions?
Base- 11" x 15 "
Back- 10" x 15"
Front-10" x 15"
Side-10" x 11"
Side-10" x 11"
Lateral surface area
A = 2(10x15) + 2(10x11)
Lateral surface area A =
what is the lateral area of a right cylinder if the radius of the base is 12 mm and the altitude of the cylinder is 5 times the base radius round your answer to the nearest whole number
To find the surface area of a right prism, you need to add up the areas of all its individual faces.
In this case, we know the dimensions of the base (11" x 15"), the back face (10" x 15"), and the front face. Since the base and the back face have the same dimensions, we know that the front face also has the dimensions of 10" x 15".
To calculate the surface area, we need to calculate the areas of each face and then add them together.
The formula to find the area of a rectangle is:
Area = Length x Width
We can now calculate each face:
Area of the base = 11" x 15" = 165 square inches
Area of the back face = 10" x 15" = 150 square inches
Area of the front face = 10" x 15" = 150 square inches
To find the total surface area, we add up the areas of all the faces:
Total surface area = Area of the base + Area of the back face + Area of the front face
= 165 square inches + 150 square inches + 150 square inches
= 465 square inches
Therefore, the surface area of the right prism with the given dimensions is 465 square inches.