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Question
In the given figure \( : \mathrm { AB } / / \mathrm { FD } , \mathrm { AC } / / \mathrm { GE } \) and \( \mathrm { BD } = \mathrm { CE } ; \) prove that \( : \) (1) \( \mathrm { BG } = \mathrm { D } \mathrm { F } \) (ii) \( \mathrm { CF } = \mathrm { EG } \) \( B \quad D \quad E \)
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Similar Questions
Q1
In the given figure $$AB / FD , AC/GE$$ and $$BD = CE$$ : prove that :
$$CF = EG$$
View Solution
Q2
In the given figure alongside ,
B
A
∥
D
F
,
C
A
∥
E
G
&
B
D
∥
E
C
.
prove that
i)
B
G
=
D
F
ii)
E
G
=
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View Solution
Q3
In the figure alongside,
B
A
|
|
D
F
,
C
A
|
|
E
G
and
B
D
=
E
C
Prove that
(i)
B
G
=
D
F
(ii)
E
G
=
C
F
View Solution
Q4
In the given fig,
A
B
∥
F
D
,
A
C
∥
G
E
at
B
D
=
C
E
. Then prove that :
B
G
=
2
D
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View Solution
Q5
In the figure given below,
B
A
∥
D
F
and
C
A
∥
E
G
and
B
D
=
E
C
, then
B
G
=
D
F
.
View Solution