![]() A triangular prism is a polyhedron with parallel bases and congruent.A line segment is created known as an edge when two faces of a triangular prism connect.Its five faces include three rectangular sides and two triangular bases or it can be said as rectangular lateral faces.Triangular Prism comprises a total of five faces, six vertices, nine sides that are together joined by rectangular sides.The properties of Triangular Prism are mentioned in the below points: Surface Area of any Triangular Prism = (bh + (a + b + c)H) Thus, from this, we will find out the equation of the area of a triangular prism, i.e Surface Area of the triangular prism (SA) = 2(½ x b x h) + ( a + b + c)H Now, if we put the value of area and perimeter in the above formula, i.e surface area of a triangular prism, we will find: Now, If we consider the sides of the triangular bases as a, b, c. The formula of the surface area is given below: Surface Area can be measured in square units. The surface area of a triangular prism is equivalent to the sum of the lateral surface area and two times the base area of a triangular prism. Thus, the volume of a triangular prism= ½ x b x h x l We know that the triangular prism base is in a triangular shape, the area of the base is similar to that of a triangle. To calculate the volume of a prism, the formula is given below: The volume of a triangular prism is equivalent to the triangular base area and the height of the prism. Triangular Prism and Net of Triangular Prism The rectangle shape is the lateral face and the triangle shape is the basis of the prism. Triangular Prism Net comprises two triangles and three rectangles. In a triangular prism net, we will get a net, if we open each of the faces of a triangular prism. ![]() ![]() The shape of the right triangular prism has 9 edges, 6 vertices, and 5 faces. The rectangular sides are either oblique or in the shape of a rectangle because prisms are not only just restricted to triangles. In the right triangular prism, the three rectangular faces are perpendicular to the triangular bases. It has three rectangular sides congruent. You need just two measurements: the diameter of the base and it's height, but the calculus is more involved than most of the other simple bodies.The video below explains this: Triangular Prism Detailed Video Explanation:Ī right triangular prism has two triangular faces that are congruent and parallel to each other. The surface area of a cone is one of the most complicated and it is where the need for a calculator becomes more apparent. The surface area formula for a cone, given its diameter (or radius) and height is π x (diameter / 2) 2 + π x (diameter / 2) x √ ((diameter / 2) 2 + (height 2)), where (diameter / 2) is the radius of the base (d = 2 x r), so another way to write it is π x radius 2 + π x radius x √ (radius 2 + (height 2)), as seen in the figure below: To find the SA simply multiply 4 times 3.14159 times the radius square. π is, of course, the well-known mathematical constant, about equal to 3.14159. Visual on the figure below:Ī sphere's surface area can be calculated just by knowing its diameter, or radius (diameter = 2 x radius). The surface area formula for a sphere is 4 x π x (diameter / 2) 2, where (diameter / 2) is the radius of the sphere (d = 2 x r), so another way to write it is 4 x π x radius 2. to find the surface area of a cube with a side of 3 inches is to multiply 3 x 6 = 18 square inches. side 2 is the surface of one of the sides, and since the cube has 6 equal sides, multiplying by 6 gives us the total cube surface area. This calculation requires only one measurement, due to the symmetricity of the cube. The surface area formula for a cube is 6 x side 2, as seen in the figure below: The result from our surface area calculator will always be a square of the same unit: square feet, square inches, square meters, square cm, square mm. In all surface area calculations, make sure that all lengths are measured in the same unit, e.g. Below are the formulas for calculating surface area of the most common body types. ![]() How to calculate the surface area of a body?ĭepending on the type of body, there are different formulas and different required information you need to calculate surface area (a.k.a. How to calculate the surface area of a body?.
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