OpenStudy (anonymous):
tyrell is going to use asa to prove that triangle pqr is congruent to triangle sqr. which of these statements would prove there is a necessary step in tyrell's proof A prove that pq is congruent to sq by the reflexive property B prove that qr is congruent to qr by reflexive property C prove that qpr is congruent to qsr by the symmetric property
OpenStudy (anonymous):
OpenStudy (unklerhaukus):
ASA Angle is PRQ, SRQ these are both 90° (given) S side is QR this side is common the other angle is PQR, SQR
OpenStudy (anonymous):
is it a pq is congruent to sq by the reflexive property
OpenStudy (unklerhaukus):
to prove congruence using ASA, you need to prove two angels are equal and the included side is equal
OpenStudy (anonymous):
ok
OpenStudy (unklerhaukus):
pq is congruent to sq, but we already have a common side, we need to prove the two angles are be equal
OpenStudy (anonymous):
is it b qr is congruent to qr by the reflexive property
OpenStudy (unklerhaukus):
no
OpenStudy (anonymous):
i need help
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