length = (w*4)-4 area = 528ft2 W*L= area and since length is replaced with (w*4)-4 so W*((w*4)-4)=area so when you multiply w through you get 4w2 -4w -528 = 0 you can use the quadratic equation now to find the width then its easy to find length. Then you can test to find area.
Given the surface area of a rectangular prism, there are infinitely many rectangular prisms possible.
For the same base dimensions (base area) and the same height, the rectangular prism has more surface area.
To calculate the surface area of a rectangular prism, use the formula ( SA = 2(lw + lh + wh) ), where ( l ), ( w ), and ( h ) are the length, width, and height, respectively. If the dimensions are provided, substitute those values into the formula to find the surface area. If specific dimensions are not given, please provide them for a precise calculation.
False. If the dimensions of a rectangular prism are quadrupled, the surface area will increase by a factor of 16, not 8. This is because surface area is proportional to the square of the dimensions, so if each dimension is multiplied by 4, the surface area increases by (4^2 = 16).
To make two shapes have the same surface area but different volumes, you can manipulate their dimensions while maintaining the surface area constant. For instance, consider a cube and a rectangular prism; by adjusting the length, width, and height of the rectangular prism while keeping its surface area equal to that of the cube, you can achieve different volumes. The cube has equal dimensions, while the rectangular prism can have varied dimensions that lead to a different volume while ensuring the overall surface area remains unchanged.
Given the surface area of a rectangular prism, there are infinitely many rectangular prisms possible.
For the same base dimensions (base area) and the same height, the rectangular prism has more surface area.
Surface area = 2lw + 2wh + 2hl
136 in.
308 units cubed
To calculate the surface area of a rectangular prism, use the formula ( SA = 2(lw + lh + wh) ), where ( l ), ( w ), and ( h ) are the length, width, and height, respectively. If the dimensions are provided, substitute those values into the formula to find the surface area. If specific dimensions are not given, please provide them for a precise calculation.
False. If the dimensions of a rectangular prism are quadrupled, the surface area will increase by a factor of 16, not 8. This is because surface area is proportional to the square of the dimensions, so if each dimension is multiplied by 4, the surface area increases by (4^2 = 16).
To make two shapes have the same surface area but different volumes, you can manipulate their dimensions while maintaining the surface area constant. For instance, consider a cube and a rectangular prism; by adjusting the length, width, and height of the rectangular prism while keeping its surface area equal to that of the cube, you can achieve different volumes. The cube has equal dimensions, while the rectangular prism can have varied dimensions that lead to a different volume while ensuring the overall surface area remains unchanged.
136" sq
432cm3
262 cm^2
5x4x4 Volume=80 Surface Area=112