![]() ![]() 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.
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