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Given: MQ = NQ; Q is the midpoint of LP; LM ≅ PN Which congruence theorem can be used to prove △MLQ ≅ △NPQ? AAS SSS ASA SAS
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Given: MQ = NQ; Q is the midpoint of LP; LM ≅ PN Which congruence theorem can be used to prove △MLQ ≅ △NPQ? AAS SSS ASA SAS

User Geoffrey Wiseman
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2 Answers

4 votes
its the SSS theorem, I took the test and got it right
User Wazani
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Answer: congruence theorem SSS will be used.

Explanation:

Since, in the
\triangle MLQ and
\triangle NPQ

MQ=NQ (given)

LM=PN (given)

LQ=QP ( Because it is given that Q is the mid point of line LP)

Here, three sides are equal, so, by SSS congruence theorem.

Thus,
\triangle MLQ\cong \triangle NPQ

Therefore, second option is correct.





User Lbrendanl
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7.3k points
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