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OpenStudy (braydonlevi99):
Justify the last two steps of the proof. Give: RS = UT and RT = US Prove: RST = UTS
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OpenStudy (braydonlevi99):
|dw:1450067152195:dw| |dw:1450067205622:dw|
OpenStudy (anonymous):
ST=TS because it is the same line
OpenStudy (braydonlevi99):
It has to be a geometry VOCAB i think.
OpenStudy (anonymous):
Well, I only use my common sense, so idk
OpenStudy (braydonlevi99):
Ugh... Okay.
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OpenStudy (anonymous):
Sorry man
OpenStudy (jchick):
reflexive is identity symmetric is commutative and transitive is .... self explanatory
OpenStudy (jchick):
st = ts , and st and ts are sides of triangles
OpenStudy (jchick):
they give 2 other equal sides, and the third side is equal to itself
OpenStudy (jchick):
which option is commutative and deals with 3 sides?
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OpenStudy (jchick):
Symmetric Property of ; SAS
OpenStudy (jchick):
st = st is reflexive .... as in its an identity
OpenStudy (jchick):
@BraydonLevi99
OpenStudy (mathstudent55):
Reflexive property of equality SSS
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