Swaggar
use formula bh/2. Substitute base with 15 and height with 13.75 and divide the product by two. That is the slant height.
If Claire's height is represented by ( n ), then Penny's height can be expressed as ( n + 6 ) inches. This expression accounts for the fact that Penny is 6 inches taller than Claire.
Hexagonal prisms and hexagonal pyramids are both polyhedra that feature hexagonal bases, which means they each have six sides in their base shape. They share similar geometric properties, including the ability to tessellate in certain arrangements. Additionally, both types of solids can be characterized by their vertical height and their volume can be calculated using base area and height formulas. However, they differ in that a prism has two parallel hexagonal bases, while a pyramid has one hexagonal base and converges to a single apex point.
The height of the Gateway Arch can be represented by the expression ( w + 75 ), where ( w ) is the height of the Washington Monument. This indicates that the Gateway Arch is 75 feet taller than the Washington Monument.
There is no formula for that. It can be any height. The fact that it is hexagonal has nothing to do with it.
use the formula: Volume=1/3 x(times) the area of the base x(times) height (V=1/3Bh) plug in the numbers
SA = 3as + 3sl a = apothem length (length from center of base to center of one of the edges). s = length of a side l = slant height
If the side of a hexagonal prism is of length s units, then its cross sectional height is s*sqrt(3) units.
The height of the triangular face of a pyramid is called the slant height.
To find the volume of a hexagonal prism, you can use the formula: Volume = Base Area × Height. First, ensure you have the area of the hexagonal base and the height of the prism. Multiply the area of the base by the height to obtain the volume. This formula applies to any prism, as long as you know the base area and height.
To find the perpendicular height of a square pyramid, first compute for the volume of the pyramid. Then divide the volume by the area of the base to find pyramid's height.
The volume ( V ) of a pyramid is given by the formula ( V = \frac{1}{3} \times \text{Base Area} \times \text{Height} ). For a pyramid with a square base of side length ( s ), the base area is ( s^2 ). Given that the height of the pyramid is also ( s ), the volume can be represented as ( V = \frac{1}{3} \times s^2 \times s = \frac{1}{3} s^3 ).