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HGiven: DF || EH, DH || EG, and DF EHProve: H is the midpoint of FGStatementsDF || EH, DH || EG1)ZDFH ZEHG and ZDHF LEGHADFH AEHGFH HGH is the midpoint of FGReasonsGivenGiven2)4)5)Which statement belongs in space number 3?HLThe triangles are not congruent.ASAOAAS

HGiven DF EH DH EG And DF EHProve H Is The Midpoint Of FGStatementsDF EH DH EG1ZDFH ZEHG And ZDHF LEGHADFH AEHGFH HGH Is The Midpoint Of FGReasonsGivenGiven245W class=

Answer :

We are given that the segments:

[tex]DF\cong EH[/tex]

And also:

[tex]\begin{gathered} \angle\text{DFH}\cong\angle EHG \\ \angle DHF\cong\angle EGH \end{gathered}[/tex]

This means that we can use the Angle Angle Side (AAS) theorem to prove congruency between the triangles DFH and EHG.

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