It may not have crossed your mind, but it might have helped to answer the question if there had been even a tiny bit of information about "these" prisms. But since that information has been kept from me, I regret that I cannot provide a more useful answer.
It may not have crossed your mind, but it might have helped to answer the question if there had been even a tiny bit of information about "these" prisms. But since that information has been kept from me, I regret that I cannot provide a more useful answer.
It may not have crossed your mind, but it might have helped to answer the question if there had been even a tiny bit of information about "these" prisms. But since that information has been kept from me, I regret that I cannot provide a more useful answer.
It may not have crossed your mind, but it might have helped to answer the question if there had been even a tiny bit of information about "these" prisms. But since that information has been kept from me, I regret that I cannot provide a more useful answer.
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
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.
Yes.
S=Ph+2B
2lw + 2lh + 2wh
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.
the question is the anwser
To find the surface area of a composite solid made up of prisms, first, calculate the surface area of each individual prism using the appropriate formulas for their shapes. Then, sum these surface areas together, while subtracting the areas of any faces that are not exposed (where the prisms connect). Finally, ensure to account for any overlapping sections to avoid double-counting. The result will give you the total surface area of the composite solid.
well, they can, but they dont have to be no. :)