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9. From the given diagram, in which ABCD is a parallelogram, ABL is a line segment and \( \mathrm { E } \) is mid point of \( \mathrm { BC } \) . Prove that: (i) \( \Delta \mathrm { DCE } \cong \Delta \mathrm { LBE } \) (ii) \( \mathrm { AB } = \mathrm { BL } \) (iii) \( \mathrm { AL } = 2 \mathrm { DC } \)

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Similar Questions

Q1

From the given diagram, in which ABCD is a parallelogram, ABL is a line segment and E is mid point of BC.

Prove that :

(i) $Δ$ DCE $≅ Δ$ LBE

(ii) AB = BL.

(iii) AL = 2DC

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Q2

From the given diagram, in which ABCD is a parallelogram, ABL is a line segment and E is mid point of BC.

Hence, $Δ D C E ≅ Δ L B E$

State true or false.

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Q3

From the give diagram in which

A B C D

is a parallelogram,

A B L

is a line segment and

E

is midpoint of

B C

. Then

A L = 2 D C

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Q4

From the given diagram, in which $A B C D$ is a parallelogram, $A B L$ is a line segment and E is mid point of BC. Hence, $AB = BL.$

If the above statement is true then mention answer as 1, else mention 0 if false

View Solution

Q5

From the given diagram, in which ABCD is a parallelogram, ABL is a line segment and E is mid point of BC.

Hence, AL = 2DC

If the above statement is true then mention answer as 1, else mention 0 if false

View Solution