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What is the surface area of a triangular prism with a base that is an equilateral triangle with side lenght of 4.2 cm and a height of 6 cm?
47.88 cm2
What is the lateral area of the right equilateral triangle prism?
It is the perimeter of a triangle times the length of the prism (in square units).
What is equilateral triangle prism?
An equilateral triangle prism is a three-dimensional geometric shape with two parallel bases that are equilateral triangles, and three rectangular lateral faces connecting the corresponding sides of the triangles. The height of the prism is the perpendicular distance between the two triangular bases. This shape exhibits uniform cross-sections along its height, making it a type of polyhedron with specific properties related to symmetry and volume. Equilateral triangle prisms are often used in various fields, including architecture and engineering, for their structural stability and aesthetic appeal.
What is the formula for surface area of prism?
Assuming the cross-section is an equilateral triangle with sides of 'a' and the length is 'b' the surface area will be 3ab + SQRT(3).a2
What is the lateral area of a right prism with height 14 cm and equilateral triangle base with side 8 cm?
Using Pythagoras' theorem the height of the equilateral triangle works out as about 7 cm and so with the given dimensions it would appear to be quite difficult to work out the lateral area.
What is the formula for the surface area of a right prism?
Type your answer hereThe surface area of a prism is square root of 3* a 2 /4 + 3*a*h where a is edge of equilateral triangle and h is height of prism
What is the surface area of a triangular prism with a base that is an equilateral triangle with side lenght of 4.2 cm and a height of 6 cm?
47.88 cm2
How do you calculate the surface area of an equalaterial trinuglar based prism?
To calculate the surface area of the equilateral triangular-based prism, you need to calculate the area of the equilateral triangle and all the other sides of the prism. The total area of all the phases will give the total surface are of an equilateral triangular based prism.
Is regular prism an equilateral prism?
not necessarily... it can be any triangle.
How do you find the volume and surface area of a triangle or prism?
The Surface area of a triangle = 0.5*base*height The volume of a prism = area of its cross-section*length
What is the lateral area of the right equilateral triangle prism?
It is the perimeter of a triangle times the length of the prism (in square units).
What is equilateral triangle prism?
An equilateral triangle prism is a three-dimensional geometric shape with two parallel bases that are equilateral triangles, and three rectangular lateral faces connecting the corresponding sides of the triangles. The height of the prism is the perpendicular distance between the two triangular bases. This shape exhibits uniform cross-sections along its height, making it a type of polyhedron with specific properties related to symmetry and volume. Equilateral triangle prisms are often used in various fields, including architecture and engineering, for their structural stability and aesthetic appeal.
What is the formula for surface area of prism?
Assuming the cross-section is an equilateral triangle with sides of 'a' and the length is 'b' the surface area will be 3ab + SQRT(3).a2
What is the lateral area of a right prism with height 14 cm and equilateral triangle base with side 8 cm?
Using Pythagoras' theorem the height of the equilateral triangle works out as about 7 cm and so with the given dimensions it would appear to be quite difficult to work out the lateral area.
Does a triangular prism have two bases that are equilateral triangles?
A triangular prism has two bases that are congruent triangles, but they are not necessarily equilateral. The bases can be any type of triangle, including scalene or isosceles triangles, as long as they are congruent. Therefore, a triangular prism can have equilateral triangle bases, but it is not a requirement.
What is the triangular prism volume formula?
The Formula is Base*Height, or 1/2 Height (altitude of the triangle) * Base (of the Triangle) * height (Height of the prism)
In a triangular prism what is the difference between the height of the base and the height of the prism?
The height of the base is part of the triangle and the height of the prism is the height of the rectangle
