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Which postulate or theorem proves that these two triangles are congruent?


ASA Congruence Postulate

SAS Congruence Postulate

AAS Congruence Theorem

HL Congruence Theorem

Which postulate or theorem proves that these two triangles are congruent ASA Congruence Postulate SAS Congruence Postulate AAS Congruence Theorem HL Congruence class=

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AAS congruence theorem.


We know that <H is congruent to <F and <GJH is congruent to <JGF.

We also know that JG is congruent to JG, which gives us a side and two angles, so AAS would prove them congruent.

apocritia

Answer:

ASA Congrence Postulate

Step-by-step explanation:

Let us consider the Triangle FGJ and triangle GJH

1) angle GFJ =angle GHJ (given in the figure )

2) GJ=GJ (common side for both the triangles)

3)angle FGJ =angle GJH (alternate interior angles )

So, from  the points (1),(2) and (3) we can say that both the triangle are congruent by ASA congruency .

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