When finding the surface area of a rectangular pyramid, what dimensions will be used to find the height of the triangle sides?
3 answers
To find the height of the triangle sides of a rectangular pyramid, you would need the height of the pyramid itself and the dimensions of the base of the pyramid. The height of the pyramid and the height of the triangle sides may or may not be the same, depending on the shape of the pyramid.
The width is 2 m the length is 6 L the sides of the link is 8.8 and 9 m.
To find the height of the triangle sides on a rectangular pyramid, you can use the Pythagorean theorem.
In this case, you have a rectangle with a width of 2m and a length of 6m. The sides of the pyramid are 8.8m and 9m.
The height of the triangle sides can be found by considering the right triangle formed by the height, half of the length (3m), and one of the sides of the rectangle (8.8m or 9m).
Let's use the side length of 8.8m:
h^2 + (3m)^2 = (8.8m)^2
h^2 + 9 = 77.44
h^2 = 77.44 - 9
h^2 = 68.44
h ≈ √68.44
h ≈ 8.27m
Therefore, the height of the triangle sides on the rectangular pyramid is approximately 8.27m when using the side length of 8.8m.
In this case, you have a rectangle with a width of 2m and a length of 6m. The sides of the pyramid are 8.8m and 9m.
The height of the triangle sides can be found by considering the right triangle formed by the height, half of the length (3m), and one of the sides of the rectangle (8.8m or 9m).
Let's use the side length of 8.8m:
h^2 + (3m)^2 = (8.8m)^2
h^2 + 9 = 77.44
h^2 = 77.44 - 9
h^2 = 68.44
h ≈ √68.44
h ≈ 8.27m
Therefore, the height of the triangle sides on the rectangular pyramid is approximately 8.27m when using the side length of 8.8m.