Suppose that the area of the rectangular base is: lw then if the height is: h the surface area is: lw + lh + wh I believe that formula is for the surface area of a rectangular prism...
The first comprises one rectangular face and four triangular faces whereas the second has two triangular and three rectangular faces.
No the area is when you are dealing with a 2-dimensional figure. Surface area formulas vary depending on if the object is a rectangular prism, a pyramid, a cone, or a triangular prism. a.k.a. the object needs to be 3-D to have a surface area.
432 square units.
Find th elateral area of a rectangular pyramid having height 9 , base lenght 6 and base width 7
the question is the anwser
Figure it out stupid.
Suppose that the area of the rectangular base is: lw then if the height is: h the surface area is: lw + lh + wh I believe that formula is for the surface area of a rectangular prism...
For the same base dimensions (base area) and the same height, the rectangular prism has more surface area.
They are both 3 dimensional shapes having surface area and volume.
The answer will depend on what A and H are!
The first comprises one rectangular face and four triangular faces whereas the second has two triangular and three rectangular faces.
A rectangular pyramid you use 1/3 or divide 3 in the product but a triangular prism you use 1/2 or divide 2 on the product.
If they have the same height, then the rectangular prism will require more paint. (Having the same height the prism will have more surface area than the pyramid).
There is no rectangular prism below 8 8 19.
a rectangular pyramid has a rectangular base and two pairs of congruent triangle sides. Given the height of the pyramid as well as its length and width, the area equals (l * w) + (l * (sq. rt ((w/2)^2 + h^2)) + (w * (sq. rt ((l/2)^2 + h^2)).
No the area is when you are dealing with a 2-dimensional figure. Surface area formulas vary depending on if the object is a rectangular prism, a pyramid, a cone, or a triangular prism. a.k.a. the object needs to be 3-D to have a surface area.