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3 years ago

The Transitive Property of Congruence allows you to say that if ∠PQR ≅ ∠RQS, and ∠RQS ≅ ∠SQT, then _____.

Mathematics

2 answers:

katovenus [111]3 years ago

6 0

Answer:

The Transitive Property of Congruence allows you to say that if ∠PQR ≅ ∠RQS, and ∠RQS ≅ ∠SQT, then ∠PQR ≅ ∠SQT .

Step-by-step explanation:

Definition of Transitive Property of Congruence

The meaning of Congruence is figure has the same size and shape .

Let us three figures A , B and C .

If A is congurent in terms of shape and size to B and B is congurent in terms of shape and size to C than A is congurent in terms of shape and size to C .

This is called Transitive Property of Congruence .

As given

∠PQR ≅ ∠RQS

∠RQS ≅ ∠SQT

Then

∠PQR ≅ ∠SQT

Therefore The Transitive Property of Congruence allows you to say that if ∠PQR ≅ ∠RQS, and ∠RQS ≅ ∠SQT, then ∠PQR ≅ ∠SQT .

Alika [10]3 years ago

3 0

Pqr is congruent to sqt

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