Math, asked by Anonymous, 8 months ago

in triangle ABC, if DE║BC and DE:BC = 5:8 , Then find the ratios of areas trapezium BCED and triangle ABC

Answers

Answered by aera31
7

Answer:

In △ABC, DE∥BC

⇒ ∠B=∠D [ Corresponding angles ]

⇒ ∠C=∠E [ Corresponding angles ]

⇒ ∠A=∠A [ Common angle]

∴ 4△ABC∼△ADE [ By AAA criteria ]

(i)

area(△ADE)

area(△ABC)

=(

DE

BC

)

2

[ Ratio of areas of two similar triangles is equal the ratio of squares of their corresponding sides. ]

16

area(△ABC)

=(

4

6

)

2

∴ area(△ABC)=

16

36×16

∴ area(△ABC)=36cm

2

(ii)

area(△ADE)

area(△ABC)

=(

DE

BC

)

2

[ Ratio of areas of two similar triangles is equal the ratio of squares of their corresponding sides. ]

25

area(△ABC)

=(

4

8

)

2

∴ area(△ABC)=

16

64×25

∴ area(△ABC)=100cm

2

(iii)

area(△ABC)

area(△ADE)

=(

BC

DE

)

2

[Ratio of areas of two similar triangles is equal the ratio of squares of their corresponding sides. ]

area(△ABC)

area(△ADE)

=(

5

3

)

2

area(△ABC)

area(△ADE)

=(

25

9

)

9

25

×area(△ADE)=area(△ABC)

⇒ AreaoftrapeziumBCED=area(△ABC)−area(△ADE)

AreaofBCED

area(△ADE)

=

area(△ABC)−area(△ADE)

area(△ADE)

AreaofBCED =

(

9

25

−1)area(△ADE)

area(△ADE)

=

9

16

1

=

16

9

Step-by-step explanation:

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