![]() ![]() Therefore, 84 square feet of cloth is required for a tent. Since the kaleidoscope is in the shape of a triangular prism, we can use the formula for the surface area to find its height.ĥ76 = 9 \(\times\) 7.8 + (9 + 9 + 9)H ĥ76 – 70.2 = (27)H It is mentioned that the surface area of the kaleidoscope is 576 \(cm^2\) and the base height is 7.8 cm. Find the height of the kaleidoscope.Īs stated, the length of each side of the kaleidoscope is 7.8 cm. The surface area of the kaleidoscope is 576 \(cm^2\), and its base height is 7.8 cm. Hence, the surface area of a triangular prism is 264 square centimeters.Ĭathy recently purchased a new triangular kaleidoscope in which the sides are 9 cm long. The surface area of a right triangular prism formula is: Surface area (Length × Perimeter) + (2 × Base Area) ( (S)1 + (S)2 + h)L + bh. = 6 \(\times\) 4 + (5 + 6 + 5) \(\times\) 15 The formula for the surface area of a right triangular prism is calculated by adding up the area of all rectangular and triangular faces of a prism. Surface area of a triangular prism = bh + (a + b + c)H We can find the surface area of the triangular prism by applying the formula, The height of the triangular prism is H = 15 cm Surface area of triangular prism 2 (½ × b × h) + (a + b + c)H. The base and height of the triangular faces are b = 6 cm and h = 4 cm. The total surface area formula for a hexagonal prism is given as:Ĭalculate the total surface area of an isosceles trapezoid whose parallel sides of the base are 50 mm and 120 mm and legs of the base are 45 mm each, the height of the base is 40 mm, and the height of the prism is 150 mm.Find the surface area of the triangular prism with the measurements seen in the image.įrom the image, we can observe that the side lengths of the triangle are a = 5 cm, b = 6 cm and c = 5 cm. Thus, the cost of painting the rectangular prism is $3,600įind the total surface area of a hexagonal prism whose apothem length, base length, and height are given as 7 m, 11 m, and 16 m, respectively. The total cost of painting the prism = TSA x cost of painting Surface area of a rectangular prism = 2h (l +b) If the painting cost is $50 per square inch, find the total cost of painting all faces of the prism.įirst, calculate the total surface area of the prism Thus, the total surface area of the pentagonal prism is 1885 cm 2Ī rectangular prism of dimensions, length = 7 in, width = 5 in and height = 3 in is to be painted. The formula for the total surface area of a pentagonal prism is given by Find the total surface area of the pentagonal prism. The apothem length, base length, and height of a pentagonal prism are 10 cm. Hence, the total surface area of the prism is 343.44 cm 2. Thus, the apothem length of the prism is 6.93 cm The base is an equilateral triangle of side 8 cm.īy Pythagorean theorem, the apothem length, a of the prism is calculated as: Therefore, the total surface area of the triangular prism is 240 cm 2.įind the total surface area of a prism whose base is an equilateral triangle of side 8 cm and height of the prism is 12 cm. Now substitute the base area, height, and perimeter in the formula. Since the base is a triangle, then the base area, B =1/2 ba TSA = 2 x area of the base + perimeter of the base x Height The other two sides of the triangular base are 7 cm each.įind the total surface area of the triangular prism. The dimensions of a triangular prism are given as follows: Let’s solve a few example problems involving the surface area of different types of prisms. Note: The formula to find the base area (B) of a prism depends on the base’s shape. Where TSA = Total surface area of a prism Total surface area of a prism = 2 x area of the base + perimeter of the base x Height Therefore, the surface area of a prism formula is given as: ![]() Since we know the total surface area of a prism is equal to the sum of all its faces, i.e., the floor, walls, and roof of a prism. Add up the area of the two bases and the area of the lateral faces to get the total surface area of a prism.And then calculate the area of lateral faces connecting the bases.To find the total surface area of a prism, you need to calculate the area of two polygonal bases, i.e., the top face and bottom face.In a prism, the lateral faces, which are parallelograms, are perpendicular to the polygonal bases. To calculate the surface area of a prism, you should divide the prism first then calculate the surface area accordingly. A prism is named according to the shape of the polygonal bases. To recall, a prism is a 3-dimensional polyhedron with two parallel and congruent bases, which are connected by lateral faces. ![]() In this article, you will learn how to find the total surface area of a prism by using the surface area of a prism formula. The total surface area of a prism is the sum of areas of its lateral faces and its two bases. Surface Area of a Prism – Explanation & Examples ![]()
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