Cost = Base * Height (both measured in yards).
h square − 5h = 70
The height of the triangular face of a pyramid is called the slant height.
triangular prism- formula: Abh(area of the base * height)
The height of a triangular based pyramid is given by h=2V/(bxl). V is its volume, b its base and l its length.
Simple................ You can't!
When you say surface of a prism this means the total amount of space on the outside of the prism. You have specified it to be a triangular prism, but taking the surface area of all prisms is the same process for all prisms. When finding the surface area of a prism you always use this equation... S.A. = (2 x Area of Prism Base) + (Height x Perimeter of Prism Base) In a triangular prism the base would be a triangle. Therefore to find the area you have to do 0.5 x base of the triangle x height of the triangle. For the perimeter of the triangle just add the length of all the sides together. The height indicated in your S.A. = ... formula... is how tall the prism actually stands. So since this prism is a triangular prism take the general surface area equation and put the correct triangular measurements into the general equation and you have this... S.A. = [2 x 0.5 x (height) x (base)] + [Height x perimeter] Here is the formula in word form. The surface area of a triangular prism is equal to two multiplied by one half multiplied by the height of the traingular height multiplied by the triangular base compute this number and then add it to the product of the height of the prism times the perimeter of the triangular base.
h square − 5h = 70
The height of the triangular face of a pyramid is called the slant height.
1
If you triplied the height of a triangular prism, would that triple it volume
triangular prism- formula: Abh(area of the base * height)
A triangular prism can be thought of as a stack of triangles. Then the volume is equal to the area of the triangular base multiplied by the height of the prism, or 1/2 length * width * height.
The height of a triangular based pyramid is given by h=2V/(bxl). V is its volume, b its base and l its length.
The volume of a three-dimensional figure is the amount of space it encloses. The volume V of a triangular prism is the product of the area B of a base and the height h of the prism. (The bases are triangles. In a special case of a right triangular prism the bases are right triangles)
The height of the base is part of the triangle and the height of the prism is the height of the rectangle
All you have to do is find the area divide it by the base and then you get the height.
Simple................ You can't!