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A triangular prism has five faces consisting of two triangular bases and three rectangular lateral faces, and a base is also a face. The three rectangles are called lateral faces. Then What is the base of a triangular prism? The top and bottom, which are triangles, are bases. In a right triangular prism, the lateral faces must be perpendicular to the bases. Similar to a triangular prism, a right triangular prism is a prism with 2 parallel and congruent triangular faces and 3 rectangular faces, which are perpendicular to the triangular ones. … The triangular prism has nine distinct nets, as illustrated above. Secondly What is triangular prism net? A triangular prism is a prism composed of two triangular bases and three rectangular sides. The lateral area of a prism of height h where the dimensions of the triangular bases are a, b, and c is (a + b + c) h. What Is an Equilateral Triangular Prism?Īn equilateral triangular prism is a prism that has two parallel and congruent equilateral triangular faces and three rectangular faces perpendicular to the triangular faces.How do you find the lateral and surface area of a triangular prism? The lateral surface area of a triangular prism is the sum of the areas of all its side faces which are 3 rectangles. There are nine edges in an equilateral triangular prism. How Many Edges Are in an Equilateral Triangular Prism? The lateral surface of an equilateral triangular prism is calculated by adding the areas of the three rectangular faces. What Is the Lateral Surface of an Equilateral Triangular Prism? The volume of a triangular prism can be found by multiplying the base times the height i.e., 1/2 × height of a base triangle × length of a prism. The formula for the surface area of an equilateral triangular prism is calculated by adding up the area of all rectangular and triangular faces of a prism, which is = (√3a 2/2) + 3(a × h) What Is the Formula for the Volume and Surface Area of a Triangular Prism? How Do You Find the Area of the Base of an Equilateral Triangular Prism? The surface area of an equilateral triangular prism is defined as the area or region covered by all the faces of an equilateral triangular prism. Thus, total surface area of an equilateral triangular prism is (√3a 2/2) + 3(a × h) Lateral surface area of an equilateral triangular prism = 3(a × h), where, 'h' is height of a prism and 'a' is side length of the triangular baseįAQs on the Surface Area of an Equilateral Triangular Prism What Is Meant By the Surface Area of an Equilateral Triangular Prism?.Since all the sides of an equilateral triangle are the same the area of the three rectangular side faces is 3(height of the prism × any side length).Calculate the area of the rectangular faces: The area of the three rectangular side faces is the height of the prism × side1, the height of the prism × side2, and the height of the prism × side 3.Calculate the area of the top and base equilateral triangles: The area of the top and base equilateral triangles is 2 × (√3a 2/4).The following steps are used to calculate the surface area of an equilateral triangular prism : After expanding the 3-d figure into 2-d we will get two equilateral triangles and three rectangles. The surface area of an equilateral triangular prism can be calculated by representing the 3-d figure into a 2-d net, to make the shapes easier to see. How to Calculate the Surface Area of an Equilateral Triangular Prism? Lateral surface area of an equilateral triangular prism = 3(a × h) The lateral surface area of an equilateral triangular prism can be calculated by adding the areas of the three rectangular faces. The lateral surface area of any object is calculated by removing the base area or the lateral surface area is the area of the non-base faces only. Lateral Surface Area of an Equilateral Triangular Prism 'h' = Height of the equilateral triangular prism.'a' = Side length of the equilateral triangle.Total surface area of an equilateral prism = (√3a 2/2) + 3(a × h) When 'a' is the side length of the equilateral triangle and 'h' is the height of the equilateral triangular prism, the surface area of the three rectangular faces is 3(a × h) whereas the total area of the two equilateral triangular faces is 2 × (√3a 2/4). The formulas for LSA and TSA are given as: Total Surface Area of an Equilateral Triangular Prism The formula for the surface area of an equilateral triangular prism is calculated by adding up the area of all rectangular and triangular faces of a prism. Surface Area of an Equilateral Triangular Prism Formula
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