Math, asked by noor5422, 1 year ago

The parallel sides of a Trapezium are 20 and 10 cm and its non parallel sides are equal in 13 cm find the area of trapezium

Answers

Answered by Anonymous
5


Draw CF ⊥ AB. 

Now, EB = (AB - AE) = (AB - DC) 

EB = (20- 10) cm = 10 cm; 

CE = AD = 13 cm; AE = DC = 13 cm. 

Now, in ∆EBC, we have CE = BC = 13 cm. 

It is an isosceles triangle. 

Also, CF ⊥ AB

So, F is the midpoint of EB. 

Therefore, EF = ¹/₂ × EB = 1/2× 10= 5cm. 

Thus, in right-angled ∆CFE, we have CE = 13 cm, EF = 5 cm. 

By Pythagoras’ theorem, we have 

CF = [√CE² - EF²] 

CF = √(13² - 5²) 

CF= √169-25= √144 = √12×12

CF= 12cm

Thus, the distance between the parallel sides is 12 cm. 

Area of trapezium ABCD = ¹/₂ × (sum of parallel sides) × (distance between them) 

Area of trapezium ABCD = ¹/₂ × (20 + 10) × 12 cm² 

Area of trapezium ABCD = 1/2×(30)× 12

Area of trapezium ABCD= 30×6 = 180 cm² 
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