There isn't enough information in this description to come up with a surface area. More generally, the number you're looking for is the sum of the surface areas of each of the prisms minus the surface areas of where they join. Don't forget to subtract each joining surface once for each prism involved.
To find the volume of a composite solid formed by two or more prisms, first calculate the volume of each individual prism using the formula ( V = \text{Base Area} \times \text{Height} ). Then, sum the volumes of all the prisms together. Ensure to account for any overlapping sections, if applicable, by subtracting their volume from the total. The final result gives you the total volume of the composite solid.
The surface area of prisms or pyramids are simply the total area of the corresponding nets.
Given the surface area of a rectangular prism, there are infinitely many rectangular prisms possible.
You must be with K12 if you are it is The surface area of A is greater than the surface area of B.
There isn't enough information in this description to come up with a surface area. More generally, the number you're looking for is the sum of the surface areas of each of the prisms minus the surface areas of where they join. Don't forget to subtract each joining surface once for each prism involved.
To find the volume of a composite solid formed by two or more prisms, first calculate the volume of each individual prism using the formula ( V = \text{Base Area} \times \text{Height} ). Then, sum the volumes of all the prisms together. Ensure to account for any overlapping sections, if applicable, by subtracting their volume from the total. The final result gives you the total volume of the composite solid.
The surface area of prisms or pyramids are simply the total area of the corresponding nets.
Given the surface area of a rectangular prism, there are infinitely many rectangular prisms possible.
You must be with K12 if you are it is The surface area of A is greater than the surface area of B.
Given any rectangular prism, there are infinitely many other rectangular prisms with exactly the same surface area.
S=Ph+2B
Yes.
2lw + 2lh + 2wh
increase the surface area of a solid means to increase the area of solid
Yes, they can. They can also have the same surface area, but different volume.
Yes, they can. They can also have the same surface area, but different volume.