Now, find the base area B using the formula, (b1 + b2) h/2 Step 4: Identify b1, b2 and h of the trapezoid. Step 3: Find the lateral area of a trapezoidal prism. The addition of these 4 values will give the perimeter P. These represent the widths of the four rectangles. Step 1: Spot the four sides of the trapezium – a, b, c, and d. Here are the steps on how to find the surface area of a trapezoidal prism. How to Find the Surface Area of a Trapezoidal Prism? Thus, TSA of a trapezoidal prism = h (b + d) + l ( a + b + c + d) unit square Total surface area of a trapezoidal prism = h (b + d) + l (a + b + c + d) On substituting the values from equation (2) and equation (3) in equation 1 i.e., TSA formula, we get: The lateral area of a trapezoidal prism (LSA) = sum of the areas of each rectangular surface So, area of trapezoidal base = h (b + d)/2 - (2) So, the total surface area of a trapezoidal prism (TSA) = 2 × areas of base + lateral surface area - (1)Īrea of a trapezoid = ½ (base 1 + base 2) height Here,ī and d are parallel sides of the trapezoid The base of a trapezoidal prism is trapezoid in shape. Area of a trapezoid = ½ (a + b) h where h = 4 cm, a =10 cm b = 16 cm On substituting values we get: Area = ½ (10 + 16) × 4 Area = ½ × 26 × 4 Area = 52 cm 2 We can calculate by adding area of the rectangle and two triangles Area of trapezoid = Area of ABPQ + Area of ADP + Area of BQC Area of trapezoid = (l × b) + 2( ab/2) Area of trapezoid = (10 × 4) + 2(3 ×4/2) A = 40 + 12 A = 52 cm 2 We can calculate the area using the formula. Step 4: Now we know all the dimensions of the trapezoid. In the right-angled triangle ADP AP = √(AD 2 – DP 2) AP = √(5 2 – 3 2) AP = √(25 – 9) = √16 = 4 cm Since ABQP is a rectangle, the opposite sides will be equal. Since ABQP is a rectangle, AB = PQ DC = 16 cm (Given) So, PQ = AB We can find the combined length of DP + QC as follows DC – PQ = 16 – 10 = 6 cmSo, DP + QC = 6 6 ÷ 2 = DP = QC 3 cm = DP = QC Step 3: AP = BQ (opposite and equal sides of a rectangle) AD = BC = 5 cm (Given) So, we can calculate the height AP and BQ using Pythagoras theorem. Step 2: Now, we have to find the length of DP and QC. Now we can see that the trapezoid consists of a rectangle ABQP and 2 right-angled triangles, APD and BQC. Given: a =10 cm b =16 cm non-parallel sides = 5 cm each Step 1: To find the height of the trapezoid, we will first draw the height of the trapezoid on both sides. Solution: Since in this question, we don’t have the height of the trapezium, we will follow the following steps to calculate the area of the trapezoid. The area of the trapezoid = A = ½ (a + b) h A = ½ (22 + 10) × (5) A = ½ (32) × (5) A = ½ × 160 A = 80 cm 2Įxample 2: Find the area of a trapezoid whose parallel sides are given as 10cm and 16cm, respectively, and the non-parallel sides are 5cm each. Solution: Given: The bases are : a = 22 cm b = 10 cm the height is h = 5 cm. Example 1: Find the area of a trapezoid given the length of parallel sides 22 cm and 12 cm, respectively. Here is an area of a trapezoid example using the direct formula and an area of a trapezoid example with the alternative method. ‘h’ is the height, i.e., the perpendicular distance between the parallel sides. We can calculate the area of a trapezoid if we know the length of its parallel sides and the distance (height) between the parallel sides. What is the Formula To Calculate the Area of Trapezoids? (see example 2 for a more precise understanding) Finally, we will add the area of the polygons to get the total area of the trapezoid. Next, we will find the area of the triangles and rectangles separately. For the second method, firstly, if we are given the length of all the sides, we split the trapezoid into smaller polygons such as triangles and rectangles.The first method is a direct method that uses a direct formula to find the area of a trapezoid with the known dimensions (see example 1).There are two approaches to finding the area of trapezoids. The area of a trapezoid is the complete space enclosed by its four sides. Real-life examples where you can see the area of trapezoids are handbags, popcorn tins, and the guitar-like dulcimer. When the other two sides are non-parallel, they are called legs or lateral sides. In the formula for volume, we have considered the parallel sides, a and b.What is a trapezoid? A trapezoid or trapezium is a quadrilateral with at least one pair of parallel sides. We can write the volume of the trapezoidal prism as base area multiplied by length. From the figure, we can see that the length of the prism is denoted by l, the height of its base is denoted as h and the parallel sides of the base are a and b.
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