Given : ∠MLN≅∠FGH,∠NML≅∠GFH,ML = FG,So, ΔLMN≅ΔGFH
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ASA congruence rule :
Two triangles are congruent , if two
angles and the included side of one
triangle are equal to two angles and
the included side of the other triangle.
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According to the problem given ,
In ∆LMN and ∆GFH,
<MLN = <FGH ( angle )
ML = FG ( side )
<NML = <GFH ( angle )
Therefore ,
∆LMN congruent to ∆GFH
[ By ASA Congruence rule ]
I hope this helps you .
: )
ASA congruence rule :
Two triangles are congruent , if two
angles and the included side of one
triangle are equal to two angles and
the included side of the other triangle.
*************************************************
According to the problem given ,
In ∆LMN and ∆GFH,
<MLN = <FGH ( angle )
ML = FG ( side )
<NML = <GFH ( angle )
Therefore ,
∆LMN congruent to ∆GFH
[ By ASA Congruence rule ]
I hope this helps you .
: )
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5
Answer:
By ASA congruence rule
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